Impatience never commanded success.
Volume - 7 Issue - 5 November, 2011 (Monthly Magazine) Editorial / Mailing Office : 112-B, Shakti Nagar, Kota (Raj.) Tel. : 0744-2500492, 2500692, 3040000 e-mail : xtraedge@gmail.com
Editorial
Editor : Pramod Maheshwari [B.Tech. IIT-Delhi]
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Editor : Pramod Maheshwari XtraEdge for IIT-JEE
Dear Students, Everyone wants success. Some people spend their every waking moment pursuing it, to the detriment of all else. For others, attaining success seems impossible. They conclude that it is destined for a select few. The rest of us are to remain "content with such things as we have". Having it all is not "in our stars". When you strive for success with the wrong assumptions, you will never reach it. It's like traveling somewhere with the wrong map. Zig Ziglar says that, "Success is a process, not an event," "a journey, not a destination." Jim Rohn describes it as " .... a condition that must be attracted not pursued." Success is something you must work hard and long to earn, for yourself. It has a price, sometimes a very high one. And most people aren't really and truly ready to pay that price, to do what success demands. If success has eluded you so far, perhaps you should try changing your assumptions. You need to accept that : • You must go through a growing process, which will require time and patience, in order to achieve success. There are no short cuts. Anything else is a temporary illusion. Success that will remain with you, and bring you joy rather than sorrow, requires a learning process, a time to grow out of old habits and into new ones, a time to learn what works and what doesn't. And you must pay your dues, in full, in advance! so don't be in a hurry. • You will need to acquire traits and skills that attract it. What does success mean to you ? Identify, in specific terms, what you regard as success. What traits or skills will you need to achieve this goal? Find 2 or 3 people who have what you want. Write down the habits that have made them successuf and resolve to copy them. This is called mentoring learning from others who have arrived where you want to go. Once you learn to do what it takes, you qualify. And when you qualify, success comes looking for you. You just can't be denied! Remember, when parents try to teach their children to crawl, what they do? They put their favorite toy in front of them and teased them forward, inch by inch. They were after the toy, which kept them motivated. When they became good at reaching the toy, they had learned to crawl. After that, they could reach any destination they wanted. The DESTINATION was less important. They became champion crawlers in the PROCESS! When you are ready for success you attract it, with little effort. When you are not, it runs from you, no matter how hard you chase. In other words, you repel it! Most likely, this is the reason that success eludes people. Now that you know how to attract success, why not get started on the journey that will take you where you want to go. Any one can succeed, but unfortunately not every one will. Fate does not foist it upon you. You can have anything you want in life, if you're ready to pay the price. But if you consider the process too hard, too slow, or too long and lonely, you have qualified your self as a looser; painful but true. So don't short change yourself with short-cuts. Go out there today and start attracting success. It's literally yours for the taking! Presenting forever positive ideas to your success.
Yours truly
Pramod Maheshwari, B.Tech., IIT Delhi
1
NOVEMBER 2011
Volume-7 Issue-5 November, 2011 (Monthly Magazine) NEXT MONTHS ATTRACTIONS Much more IIT-JEE News. Know IIT-JEE With 15 Best Questions of IIT-JEE Challenging Problems in Physics, Chemistry & Maths Key Concepts & Problem Solving strategy for IIT-JEE. Xtra Edge Test Series for JEE- 2012 & 2013
CONTENTS INDEX
PAGE
Regulars .......... NEWS ARTICLE
3
• Government plans to recover costs from IIT students • HRD to hand over 10,000 low-cost laptops to IIT Rajasthan
IITian ON THE PATH OF SUCCESS
5
Mr. Subrah S. Iyer
KNOW IIT-JEE
6
Previous IIT-JEE Question
Study Time........ DYNAMIC PHYSICS
S
Success Tips for the Months • " Always bear in mind that your own resolution to succeed is more important than any other thing." • "God gave us two ends. One to sit on and one to think with. Success depends on which one you use; head you win -- tails, you lose." • "The ladder of success is best climbed by stepping on the rungs of opportunity." • "Success is getting what you want. Happiness is wanting what you get." • "The secret of success in life is for a man to be ready for his opportunity when it comes." • "I don't know the key to success, but the key to failure is trying to please everybody." • "The secret of success is to be in harmony with existence, to be always calm… to let each wave of life wash us a little farther up the shore."
XtraEdge for IIT-JEE
14
8-Challenging Problems [Set # 7] Students’ Forum Physics Fundamentals • E.M.I. & A.C. • S.H.M.
CATALYSE CHEMISTRY
27
Key Concept • Nitrogen Compound • Nitrogen Family Understanding :Physical Chemistry
DICEY MATHS
38
Mathematical Challenges Students’ Forum Key Concept • Differentiation • Straight Line & Circle
Test Time .......... XTRAEDGE TEST SERIES
47
Class XII – IIT-JEE 2012 Paper Class XI – IIT-JEE 2013 Paper
2
NOVEMBER 2011
Government plans to recover costs from IIT students Students of the Indian Institutes of Technology (IITs) are set to be under a debt burden from their first day in class. According to a new proposal, general category IIT graduates may soon have to pay back the money that the government incurs on their education as soon as they find a job after passing out. The 15 premier engineering institutes and the human resource development ministry gave their "in principle" nod to the proposal, which has been touted as a workable alternative to hiking tuition fees of the IITs. The reimbursed amount will go to the IIT from where a student graduates. The step is believed to be in line with the government's efforts to give more administrative and financial autonomy to the IITs.The landmark decision, taken at Wednesday's meeting of the IIT Council, the highest decisionmaking body of these institutes, will not apply to students from SC, ST and OBC (noncreamy layer) categories. Nor will it apply to those going in for higher studies at the IITs. HRD minister Kapil Sibal said the idea of giving back to the institute was agreed upon during a discussion on the Kakodkar Committee recommendation which had proposed that the IITs increase their annual tuition fee four times from Rs 50,000 each year to anything between Rs 2 lakh to Rs 2.5 lakh per annum. "We have shot down that proposition as we do not want to burden the students' families. Students will continue to pay Rs 50,000 as their annual fee, but they will be expected to pay the difference between the tuition fee and the actual expenditure incurred by the institute once they start working," he said. XtraEdge for IIT-JEE
Sources said the payback proposal is "reasonable". IIT graduates are in great demand and command high salaries. Roughly half the students of an IIT are from the general category because 49.5 per cent of the seats are reserved. A rough estimate pegs the total expenditure on an IIT BTech graduate over four years at Rs 6 lakh to Rs 8 lakh. The student will not be liable to pay the difference between the tuition fee and the actual expenditure in case he studies further like pursue MTech, PhD and so on. But the moment a student gets a job, irrespective of whether it is in the government or the private sector, the loan meter will start ticking. It was decided at the meeting that students will only need to return the amount in installments. "A student who eventually becomes a researcher or joins an IIT as a faculty member will also be exempted as we want to encourage research and students to become teachers. In case the student remains unemployed, we won't expect him to pay," Sibal added. It is, anyway, rare for an IIT graduate to remain unemployed. Even though the ministry and the IITs have agreed upon this proposal "in principle", it can only be implemented if Sibal can get the finance ministry on board. Obviously then, as of now, there is no deadline for implementation of this decision. Another hurdle would be to ensure that students do not shirk their responsibility of paying back. Sibal said the shift to "demat" degrees and certificates will take care of this problem. Last year, the minister had announced the start of a process for the establishment of a national database of academic qualifications (degrees or certificates from school to graduate and postgraduate levels, including professional degrees), which will be 3
created and maintained in a digital format by an identified, registered depository. For this purpose, the HRD ministry had constituted a task force under the supervision of IITKanpur director Sanjay Dhande. "The degree eventually goes to the employer. Once the demat system is in place, an IIT graduate's degree will reflect the obligation to pay the institute back and the money will come via the employer," said Sibal, adding that the details will be worked out in consultation with the IITs
HRD to hand over 10,000 lowcost laptops to IIT Rajasthan Jaipur: The much awaited low-cost laptops in India will be introduced through the IIT-Rajasthan. The Union HRD ministry announced that the first batch of low-cost laptops, designed for use by students, will be handed over to IIT Rajasthan. "We would deliver the first lot of 10,000 laptops to IIT-Rajasthan in June," a ministry official said. The laptops would come for Rs 2,200 per unit. The original price band for these laptops was kept between Rs1,000-1,500 per unit. "One lakh laptops have been ordered for students across the country. The remaining 90,000 units would be distributed in remaining states over the next four months," the official said. The HRD ministry announced its plans of rolling out low-cost computing devices during a conference of education ministers from different states in New Delhi two days ago. The project had been in the pipeline for six years. The conference, presided over by Union HRD minister Kapil Sibbal, was attended by school education minister Bhanwar Lal Meghwal and NOVEMBER 2011
higher education minister Jitendra Singh. Officials at the IIT Rajasthan in Jodhpur said the project of low-cost laptops was underway. But, they said they were not aware of the price band at which it would be available or the mode of distribution that would be adopted. "It's a Union government decision, an official of the institute said. Officials said the government would subsidise 50 per cent of the cost and a student would pay only around Rs 1,000 for the device. On the basis of the feedback of the field trial, the computers will be made available for distribution among students under the National Mission On Education through Information and Communication Technology. The computers will be equipped with WiFi connectivity, PDF Reader, Office applications, a web browser with remote device management capability and video streaming. They will come with 2 USB ports, built-in keyboard, a 7-inch touch-screen and 2 GB RAM.
IIT-Bombay Geomat12
announces
IIT-B going to conduct Geomatrix’12, an International Conference on Geospatial Technologies and Applications to be held from 26th to 29th February 2012 at Indian Institute of Technology Bombay (IITB).
with fellow researchers, professionals and students from India and abroad. We are looking forward to your enthusiastic participation in Geomatrix’12. The focus of the conference would be on: (a) tools and techniques of GIS, remote Sensing, satellite image processing and GPS, and (b) applications of GIS and remote sensing to exploration, assessment and management of natural resources (including minerals, water resources, forests, snow and glaciers, etc.), agriculture, natural hazard assessment and disaster management, environmental impact assessment including climate change studies, atmospheric studies, terrain studies, land-use planning, and related fields of earth sciences. The specific themes include: 1.
Advances in Tools and techniques of GIS
2.
Recent advances in microwave remote sensing
3.
State-of-the-art in satellite image processing
4.
Global positioning systems and wireless sensor networks
5.
Geospatial technology in mineral system studies and mineral exploration
6.
Agroinformatics applications
7.
Geoinformatics for coastal, marine, and urban environments
8.
Geospatial technology for prediction and management of natural hazards and disasters
9.
Monitoring and managing our glaciers and water resources using remote sensing
–
tools
and
Geomatrix’12 is the third in a series of conferences on geoinformatics tools, techniques and applications being organized by the Centre of Studies in Resources Engineering (CSRE), IITB since 2009. The first two conferences were national level conferences; Geomatrix’12 is envisaged to be an international event with strong participation from national and international researchers and institutes of repute at both organization and delegate level.
Get a reality check: IITs well behind Chinese peers, says PM
We are expecting participation of delegates from various academic institutes, research organizations and industries to share their research findings and professional experiences
If you think that our Indian Institutes of Technology are producing the best brains of the world, think again. In a recent speech at IIT-Kharagpur, Prime Minister Manmohan Singh said the IITs
XtraEdge for IIT-JEE
10. Education and educational technology in geoinformatics
4
were well behind technology counterparts in China when it came to research and PhDs. "The Kakodkar committee report noted the number of PhDs is very small in comparison to similar technology institutions in the USA and China," he said. It was important as it emphasised the challenge in creating an advanced research-based innovation ecosystem, with the involvement of industry and national technology programmes. Talking about how Kakodkar panel was set up last year to come up with a report card of the progress of IITs in the country, Singh said that the recommendations of the committee will soon be considered by the Council of the IITs and then by the Government of India. Of many suggestions given by Kakodkar panel, the most significant one is about giving more autonomy to these institutions. The PM also stressed on the fact that IITs need to take on a leadership role on innovations to stimulate long-term growth and development. He emphasises the need for a second Green Revolution. He said, "We have to usher in a soft revolution in our academic business and administrative culture…our scientific and entrepreneurial energies should be channeled to spark the second Green Revolution, find new pathways for sustainable growth and living and make green growth a profitable business proposition." PM Manmohan Singh was addressing the 60th anniversary and the 57th convocation of IIT-Kgp. At the event, 1,966 degrees were awarded, of which 235 were PhDs, 29 MS, 692 M Tech, 84 MBAs, 380 B. Tech and 216 MSc, among others. Several personalities, including Bharti Airtel chairman Sunil Mittal were awarded honourary doctorates.
NOVEMBER 2011
Success Story This article contains story/interviews of persons who succeed after graduation from different IITs
SUBRAH S. IYER Born :
1957, Mumbai, Maharashtra, India
Occupation :
CEO, WebEx
Net worth :
US$129 million (2000)
Subrah S. Iyer (b.1957) is a leading technocrat, entrepreneur and Web conferencing pioneer of Indian origin. He is the founder and CEO of WebEx which has recently merged with Cisco Systems.
Faced with a win or lose situation, the management of WebEx accepted the challenge with a brave heart. As a result of the new ideas propounded by Subrah Iyer, 2000 became a honeymoon year for WebEx. The revenues crossed the million mark and Subrah Iyar's own net worth rocketed from a paltry $450,000 in January 2000 to $129 million in November 2000. When enquired about it in an interview at a later stage, Subrah Iyar remarked, "It didn't get too scary, because I knew we had done everything based on fundamentals. You always have a feeling of uncertainty. But it was never a feeling of terror."
Early life Subrah S. Iyer was born and brought up in Mumbai. He had descended from Tamil immigrants who had migrated to Mumbai. He did his schooling in Mumbai and graduated from the Indian Institute of Technology. On completion of his graduation he moved to the US in the year 1982. He worked with Intel, Apple Inc., Quarterdeck, and Teleos Research prior to the establishment of WebEx.
In 2003, when Microsoft purchased conferencing company Place ware it was thought to be the end of the road for Subrah Iyar and WebEx. However, WebEx survived and completed a $45 million acquisition of Intranets.com in 2005. As per the company website, more than 3.5 million people use Cisco’s WebEx products every month to communicate and collaborate online.
Founding of WebEx In his childhood days, his father had sternly warned him against dreaming of becoming an entrepreneur. However, he overruled him when in 1996; he founded WebEx in partnership with Min Zhu.
How WebEx went the Cisco route
The founding of the company by Subrah Iyar was fuelled by a new-found interest in Web Conferencing. Min Zhu, a Stanford-trained System Engineer had been struggling to develop a web-conferencing tool. Coincidentally, during this time, he befriended Subrah Iyar who was running Quarterdeck's research lab and the two formed a partnership.
In Silicon Valley, being at the top of your game in a hot market means you can pretty much name your price. At least that's what seems to have happened to Web conferencing company WebEx. In March 2007, Cisco Systems said it would pay $3.2 billion for the company. Cisco plans to integrate WebEx's online collaboration and meeting services into its unified communications business. Subrah Iyar, chairman and chief executive officer, has been with WebEx since the beginning as a co-founder. And through the years, he has established the company as a leader in the Web collaboration market, fending off tough competitors such as Microsoft.
Growth of WebEx WebEx struggled to make a profit in its early days, low bandwidth being one of the main reasons. Slowly, with the advancement of technology and the shift to broadband technology, WebEx began to emerge as a potent competitor with clients such as Hoover's Online, Oracle and Tibco Software. However, despite the below performance of Webex in its early days, it was generally a boom time for digital conferencing technology with the emergence of standards such as ISDN and Switched Digital Service. WebEx received its first funding of $25 million in December 1999.
XtraEdge for IIT-JEE
WebEx had already been partnering with Cisco to integrate voice over IP capabilities into its Web conferencing services. So when potential suitors came knocking on WebEx's door, it made perfect sense for the company to talk to Cisco about a deal. 5
NOVEMBER 2011
KNOW IIT-JEE By Previous Exam Questions
We know that q = CV dq dV =V dt dt ε ⇒ I = V 0 (k – 1)v d From (i) and (ii)
PHYSICS 1.
Two square metal plates of side 1 m are kept 0.01 m apart like a parallel plate capacitor in air in such a way that one of their edges is perpendicular to an oil surface in a tank filled with an insulating oil. The plates are connected to a battery of emf 500 V. The plates are then lowered vertically into the oil at a speed of 0.001 ms–1. Calculate the current drawn from the battery during the process. (Dielectric constant of oil = 11, ε0 = 8.85 × 10–12C2N–1m–1) [IIT-1994] Sol. The adjacent figure is a case of parallel plate capacitor, The combined capacitance will be V +
500 × 8.85 × 10 –12 (11 – 1) × 0.001 0.01 Ans. = 4.425 × 10–9 Amp. Alternatively We can differentiate eq. (i) w.r.t. 't', we get ε dC dx = 0 (K –1) and then proceed further. dt d dt
I=
2.
–
1–x x
...(iv)
An electrons gun G emits electrons of energy 2keV travelling in the positive x-direction. The electrons are required to hit the spot S where GS = 0.1m, and the line GS make an angle of 60º with the x-axis as shown in the figure. A uniform magnetic field →
B parallel to GS in the region outside the electron →
1m d
gun. Find B parallel to GS exists in the region outside the electron gun. Find the minimum value of B needed to make the electrons hit S. [IIT-1993] S
C = C1 + C2 kε 0 ( x × 1) ε [(1 – x ) × 1] + 0 = d d ε0 C= [kx + 1 – x] ...(i) d After time dt, the dielectric rises by dx. The new equivalent capacitance will be C + dC = C1' + C2' ε ε [(1 – x – dx ) × 1] = 0 [(x + dx) × 1] + 0 d d ε = 0 [kx + kdx + 1 – x – dx] d Change of capacitance in time dt ε dC = 0 [kx + kdx + 1 – x – dx – kx – 1 + x] d ε0 = (k – 1)dx ...(ii) d ε ε dC dx ...(iii) = 0 (k – 1) = 0 (k – 1)v dt d dt d dx where v = dt XtraEdge for IIT-JEE
→
B
90º v
x
G
Sol. Let us resolve the velocity two rectangular components V1(= V cos θ) and V2(Vsin 60º), V1 component of velocity is responsible to move the charge particle in the direction of the magnetic field whereas V2 component is responsible for rotating the charged particle in circular motion. The overall path is helical. The condition for he charged particle to strike S with minimum value of B is Pitch of Helix = GS 2πm T × V1 = GS ⇒ × v cos 60º = 0.1 qB 1 mv2 = E 2
6
⇒
V=
2E m
NOVEMBER 2011
The equation for growth of current in L-R circuit is →
S
B
I = I0 [1 – e
v
G
V2 = v sin 60º
4.
⇒ B=
2πm × q × 0.1
2E × cos 60º m
=
2π × q × 0.1
2mE × cos 60º
=
=
]
⇒ 2.5 = 5 [1 – e
–19
–31
3
× 2 × 10 × 1.6 × 10
–19
10 = 4.737 × 10–3 T
D
60º
60º
A
60º C
E
(a) the angle of incidence, so that the emergent ray from the first prism has minimum deviation. (b) through what angle the prism DCE should be rotated about C so that the final emergent ray also has minimum deviation. Sol. (a) For minimum deviation of emergent ray from the first prism MN is parallel to AC ∴ ∠ BMN = 90º ⇒ ∠ r = 30º Applying Snell's law at M sin i µ= sin r sin i = µ sin r
Ans.
A solenoid has an inductance of 10 henry and a resistance or 2 ohm. It is connected to a 10 volt battery. How long will it take for the magnetic energy [IIT-1996] to reach ¼ of its maximum value? Sol. Let I0 be the current at steady state. The magnetic energy stored in the inductor at this state will be 3.
L = 10H
B
60º
1 × 2
× 0.316 × 10–23 = 47.37 × 10–4
R = 2Ω
sin i = 3 × sin 30º =
10V
3 2
⇒ i = 60º
1 LI02 ...(i) 2 This is the maximum energy stored in the inductor. The current in the circuit for one fourth of this energy can be found as 1 1 ×E= LI02 ...(ii) 2 2 Dividing equation (i) and (ii) 1 2 LI 0 I E = 2 ⇒I= 0 1 2 E/4 2 LI 2 V 10 ⇒ I0 = = = 5 Amp. Also, V = I0R R 2 I 5 ∴ I= 0 = = 2.5 Amp. 2 2
E=
XtraEdge for IIT-JEE
]
Two identical prisms of refractive index 3 are kept as shown in the figure. A light ray strikes the [IIT-2005] first prism at face AB. Find,
1.6 × 10 –19 × 0.1
149.8
2t 10
1 ⇒ e–t/5 = ⇒ et/5 = 2 2
2 × 3.14
2 × 9.1× 10
–
⇒ t = 5 loge2 = 2 × 2.303 × 0.3010 = 3.466 sec. Ans.
2πmV cos 60º ⇒ B= q × 0.1
=
RT L
1 ⇒ = 1 – e–t/5 2 t ⇒ = loge2 5
r = 0.1 m
V1 = v cos 60º
–
B
P
i
60º r M Q
N
60º A
C
(b) When the prism DCE is rotated about C in anticlockwise direction, as shown in the figure, then the final emergent ray SR becomes parallel to the incident ray TM. Thus, the angle of deviation becomes zero.
7
NOVEMBER 2011
5.
∆E3 = – 3.4 – (–54.4eV) = 51.1 eV ⇒ K1 + K2 = 14 eV Solving with (3), we get K2 = 15.8 eV; K1 = – 1.8 eV But K.E. can never be negative therefore case (3) is not possible. Therefore the allowed values of kinetic energies are only that of case (1) and case (2) and electron can jump upto n = 3 only. n=4 –3.4eV n=3 –6.04eV
A neutron of kinetic energy 65eV collides inelastically with a singly ionized helium atom at rest. It is scattered at an angle of 90º with respect [IIT-1993] of its original direction. (i) Find the allowed values of the energy of the neutron and that of the atom after the collision. (ii) If the atom get de-excited subsequently by emitting radiation, find the frequencies of the emitted radiation. [Given: mass of He atom –4×(mass of neutron), Ionization energy of H atom = 13.6eV]
n=2
–13.6eV
Sol. m
K2 y θ
m 4m
4m
–54.4eV
n=1 For He+ (ii) Thus when electron jumps back there are three possibilities n3 → n1 or n3 → n2 and n2 → n1 The frequencies will be E − E2 E − E1 E − E1 ν1 = 3 ν2 = 3 ν3 = 2 h h h = 1.82×1015 Hz = 11.67×1015 Hz = 9.84×1015 Hz Ans.
x
K1 Applying conservation of linear momentum in horizontal direction (Initial Momentum)x = (Final Momentum)x pix = pfx
⇒
2Km = 2(4m)K1 cos θ
...(i)
Now applying conservation of linear momentum in Y-direction piy = pfy
CHEMISTRY
0 = 2K 2 m – 2(4m)K 1 sin θ ⇒
2K 2 m = 2(4m)K 1 sin θ
6.
...(ii)
Squaring and adding (i) and (ii) 2Km + 2K2m = 2(4m)K1 + 2(4m)K1 K1 + K2 = 4K1 ⇒ K = 4K1 – K2 ⇒ 4K1 – K2 = 65 ...(iii) When collision takes place, the electron gains energy and jumps to higher orbit. Applying energy conservation K = K1 + K2 + ∆E ⇒ 65 = K1 + K2 + ∆E ...(iv) + Possible value of ∆E For He Case (1) ∆E1 = – 13.6 – (54.4eV) = 40.8 eV ⇒ K1 + K2 = 24.2 eV from (4) Solving with (3), we get K2 = 6.36 eV; K1 = 17.84 eV Case (2) ∆E2 = – 6.04 – (–54.4 eV) = 48.36 eV ⇒ K1 + K2 = 16.64 eV from (4) Solving with (3), we get K2 = 0.312 eV; K1 = 16.328 eV Case (3) XtraEdge for IIT-JEE
An organic compound CxH2yOy was burnt with twice the amount of oxygen needed for complete combustion to CO2 and H2O. The hot gases when cooled to 0 ºC and 1 atm pressure, measure 2.24 L. The water collected during cooling weighed 0.9 g. The vapour pressure of pure water at 20ºC is 17.5 mm of Hg and is lowered by 0.104 mm when 50 g of the organic compound are dissolved in 1000 g of water. Give the molecular formula of the organic compound. [IIT-1983]
Sol. According to the question, an organic compound CxH2yOy was burnt with twice the amount of oxygen. Hence,
CxH2yOy + 2x O2 → xCO2 + yH2O + xO2 Volume of gases after combustion = 2.24 L (given) Volume of gases left after combustion = xCO2 + xO2 ∴
x + x = 2.24
or
x = 1.12 L 22.4 L CO2 = 1 mol CO2
8
1.12 = 0.05 mol CO2 22.4
∴
1.12 L CO2 =
and
18 g H2O = 1 mol H2O NOVEMBER 2011
∴
0.9 g H2O =
At room temperature, For NO, P = 1.053 atm, V = 250 ml = 0.250 L 1.053 × 0.250 ∴ Number of moles of NO = 0.0821× 300 = 0.01069 mol For O2, P = 0.789 atm, V = 100 ml = 0.1L 0.789 × 0.1 ∴ Number of moles of O2 = 0.0821× 300 = 0.00320 mol According to the given reaction, 2NO + O2 → 2NO2 → N2O4 Composition of gas after completion of reaction, Number of moles of O2 = 0 1 mol of O2 react with = 2 mol of NO ∴ 0.00320 mol of O2 react with = 2 × 0.00320 = 0.0064 mol of NO Number of moles of NO left = 0.01069 – 0.0064 = 0.00429 mol Also, 1 mol of O2 yields = 1 mol of N2O4 ∴ Number of moles of N2O4 formed = 0.00320 mol N2O4 condenses on cooling, ∴ 0.350 L (0.1 + 0.250) contains only 0.00429 mol of NO At T = 220 K, Pressure of the gas, nRT 0.00429 × 0.0821× 220 = = 0.221 atm P= V 0.350
0.9 = 0.05 mol H2O 18
Thus, the empirical formula of the organic compound is CH2O. Empirical formula mass = 12 + 2 + 16 = 30 Vapour pressure of the pure liquid, PA0 = 17.5 mm of Hg
Lowering in vapour pressure PA0 –PA =0.104mm of Hg Mass of organic compound = 50 g Mass of water = 1000 g ∴ Mole fraction of organic compound =
50 / M 50 1000 + M 18
where M is the molecular mass of the organic compound, the molecular mass of water being 18. We know, PA0 − PA PA0
∴
or Solving,
= Mole fraction of organic compound 0.104 50 / M = 50 1000 17.5 + M 18 17.5 1000 × M =1+ 0.104 18 × 50
M = 150.5 ≈ 150 n=
One gram of an alloy of aluminium and magnesium when treated with excess of dil. HCl forms magnesium chloride, aluminium chloride and hydrogen. The evolved hydrogen collected over mercury at 0ºC has a volume of 1.20 litres at 0.92 atm pressure. Calculate the composition of the alloy. [IIT-1978] [At wt. Mg = 24, Al = 27] Sol. Let the alloy contains, Al = x g then Mg = (1 – x)g Step 1. 2Al + 6HCl → 2AlCl3 + 3H2 2 × 27 = 54 g 3 × 22.4 = 67.2 L At STP, 54 g of Al with HCl yields H2 = 67.2 L 67.2 xL ∴ x g of Al with HCl yields H2 = 54 Step 2. Mg + 2HCl → MgCl2 + H2 24 g 22.4 L At STP, 24 g of Mg with HCl yields H2 = 22.4 L ∴ (1 – x)g of Mg with HCl yields H2 22.4 = × (1 – x)L 24 8.
150 Molecular mass = =5 30 Empirical formula mass
∴ Molecular formula or organic compound
= 5(CH2O) = C5H10O5 At room temperature, the following reactions proceed nearly to completion : 2NO + O2 → 2NO2 → N2O4 The dimer, N2O4, solidified at 262 K. A 250 ml flask and a 100 ml flask are separated by a stopcock. At 300 K, the nitric oxide in the larger flask exerts a pressure of 1.053 atm and the smaller one contains oxygen at 0.789 atm. The gases are mixed by opening the stopcock and after the end of the reaction the flasks are cooled to 200 K. Neglecting the vapour pressure of the dimer, find out the pressure and composition of the gas remaining at 220 K. (Assume [IIT-1992] the gases to behave ideally) Sol. According to the gas equation, PV = nRT PV or n= RT 7.
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9
NOVEMBER 2011
HC≡C –C2H4 – CH2OH (X) It is given that 0.42 g of the compound (which is 0.005 mol) produces 22.4 ml of CH4 at STP (which is 0.01 mol) with excess of CH3MgBr. This shows that the compound (X) contains two active H atoms (H atom attached to O, S, N and –C≡CH is called active). Of these, one is due to the p-alcoholic group (–CH2OH) and the other is due to the –C≡CH bond, since both these groups are present in (X), hence it evolves two moles of CH4 on reaction with CH3MgBr. H – C≡C. C 2 H 4 – CH2OH + 2CH3MgBr →
Step 3. Also given that, P1 = 0.92 atm P2 = 1 atm V2 = ? V1 = 1.20 L T2 = 273 K T1 = 0ºC = 273 K Total volume V2 of hydrogen collected over mercury at STP is given by, P1V1 PV = 2 2 T1 T2
or V2 =
P1V1 T 0.92 × 1.20 273 × 2 = × = 1.104 L 273 T1 P2 1
Now, Volume of H2 evolved by Al + Volume of H2 evolved by Mg = Total volume of H2 67.2 22.4 x+ (1 – x) = 1.104 or 54 24 or 67.2 × 24x + 22.4 × 54 × 1 – 22.4 × 54 × x = 1.104 × 24 × 54 or 1612.8x + 1209.6 – 1209.6x = 1430.78 or 403.2 x = 21.18 or x = 0.5486 ∴ Mass of Al = 0.5486 g and Mass of Mg = 1 – 0.5486 = 0.4514 g Step 4. % composition of Al in 1 g alloy Mass of Al = × 100 Mass of alloy
(X)
BrMgC≡C–C2H4 – CH2OMgBr + 2CH4 Moreover, the treatment of (X) with H2/Pt followed by boiling with excess of HI gives n-pentane (remember that 2HI are required to convert one –CH2OH into CH3). This shows that the compound (X) contains a straight chain of five carbon atoms. 2 H / Pt
H – C≡C–C2H4 – CH2OH 2 → CH3CH2.C2H4 – CH2OH HI 2 → CH3CH2CH2CH2CH3 + H2O + I2 ∆
n-pentane On the basis of abvoe analytical facts (X) has the structure : 5
0.5486 × 100 = 54.86% Al 1 % composition of Mg in 1 g alloy Mass of Mg × 100 = Mass of alloy
1
The different equations of (X) are : ZnCl + HCl
2 Room → No reaction H − C ≡ C − CH 2 CH 2 CH 2 OH temp.
(X)
AgNO3
0.4514 × 100 = 45.14 % Mg 1
NH3
An organic compound (X), C5H8O, does not react appreciably with Lucas reagent at room temperatures but gives a precipitate with ammonical AgNO3 solution. With excess CH3MgBr; 0.42 g of (X) gives 224 ml of CH4 at STP. Treatment of (X) with H2 in the presence of Pt catalyst followed by boiling with excess HI gives n-pentane. Suggest structure of (X) and write the equations involved. [IIT-1992] Sol. Lucas test sensitive test for the distinction of p, s, and t-alcohol. A t-alcohol gives cloudiness immediately, while s-alcohol within 5 minutes. A p-alcohol does not react with the reagent at room temperature. Thus, the present compound (X) does not react with this reagent, hence it is a p-alcohol. (X) = C4H6.CH2OH(p-alcohol) Since the compound gives a ppt. with ammonical AgNO3, hence it is an alkyne containing one –C≡ CH, thus (X) may be written as :
Ag – C≡C – CH2CH2CH2OH + NH4NO3 White ppt.
9.
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2
4-pentyne-1-ol
=
=
4 3
HC≡C.CH2 CH2 – CH2OH (X)
2CH3MgBr 2H2/Pt
Br MgC≡C.CH2CH2CH2OMgBr + 2CH4
CH3CH2CH2CH2CH2OH Pentanol-1 2 HI ∆, –H2O; –I2
CH3CH2CH2CH2CH3 n-pentane
The production of 2 moles of CH4 is confirmed as the reactions give 224 ml of CH4. Q 84 g(X) gives = 2 × 22.4 litre CH4 2 × 22.4 × 0.42 ∴ 0.42 g (X) gives = 84 = 224 ml of CH4 10
NOVEMBER 2011
ZnCl2 + S2– → ZnS ↓ + 2Cl–
10. A white amorphous powder A when heated gives a colourless gas B, which turns lime water milky and the residue C which is yellow when hot but white when cold. The residue C dissolves in dilute HCl and the resulting solution gives a white precipitate on addition of potassium ferrocyanide solution. A dissolves in dilute HCl with the evolution of a gas which is identical in all respects with B. The solution of A as obtained above gives a white precipitate D on addition of excess of NH4OH and on passing H2S. Another portion of this solution gives initially a white precipitate E on addition of NaOH solution, which dissolves on further addition of the base. Identify the [IIT-1979] compound A to E. Sol. The given information is as follows.
(a)
A
white powder
heat →
B
colourless gas turns lime water milky
+
(D)
2+
Zn + 2OH → Zn(OH)2 (E)
Zn(OH)2 + 2OH → ZnO 22- + 2H2O –
dissolves
MATHEMATICS 11. Let f [(x + y)/2] = {f (x) + f (y)} / 2 for all real x and y, If f ´(0) exists and equals –1 and f (0) = 1, find f (2). [IIT- 1995] f ( x) + f ( y ) x+ y ∀ x, y ∈ R (given) Sol. f = 2 2
C
residue yellow when hot white when cold
Putting y = 0, we get f ( x ) + f ( 0) 1 x f = = [1 + f (x)] [Q f (0) = 1] 2 2 2
dilute HCl
(b)C→ solution K Fe( CN )
4 6 → white precipitate dilute HCl
(c) A
⇒ 2f (x/2) = f (x) + 1 ⇒ f (x) = 2f (x/2) – 1 ∀x, y ∈ R ...(1) Since f ´(0) = –1, we get f (0 + h ) − f ( 0 ) f ( h) − 1 lim = – 1 ⇒ lim = –1 h →0 h →0 h h Now, let x ∈ R then applying formula of differentiability.
Solution + B (i) NaOH
(i) NH4OH (ii) H2S
E white precipitate
D
NaOH
white precipitate
dissolves
2 x + 2h f − f ( x) f ( x + h) − f ( x ) 2 f ´(x)= lim = lim h →0 h →0 h h f ( 2 x ) + f ( 2h) − f ( x) 2 = lim h →0 h
From part (a), we conclude that B is CO2 as it turns lime water milky : Ca(OH2) + CO2 → CaCO 3 + H2O milky due to this
and C is ZnO as it becomes yellow on heating and is white in cold. Hence, the salt A must be ZnCO3. From part (b), it is confirmed that C is a salt of zinc (II) which dissolves in dilute HCl and white precipitate obtained after adding K4[Fe(CN)6 is due to Zn2[Fe(CN)6]. From part (c), it is again confirmed that A is ZnCO3 as on adding dilute HCl, we get CO2 and zinc (II) goes into solution. White precipitate is of ZnS which is precipitated in ammonical medium as its solubility product is not very low. White precipitate E is of Zn(OH)2 which dissolves as zincate, in excess of NaOH. Hence the given information is explained as follows.
= lim
⇒
K 4 Fe( CN ) 6
dil HCl
→ Zn 2 [Fe(CN ) 6 ] (b) ZnO→ ZnCl 2 (C)
solution
∫ f ´(x) dx = ∫ − 1 dx
⇒ f (x) = – x + k where k is a constant. But f (0) = 1, therefore f (0) = – 0 + k ⇒ f (x) = 1 – x ∀ x ∈ R ⇒ f (2) = – 1
White precipitate
(c) ZnCO3 dil HCl → ZnCl 2 + CO2 + H2O Solution
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h
[Using equations (1)] 1 {2 f ( x) − 1 + 2 f (h) − 1} − f ( x) = lim 2 h →0 h f ( x ) + f ( h) − 1 − f ( x ) = lim h→0 h f ( h) − 1 = lim = –1 h →0 h Therefore f ´(x) = – 1 ∀ x ∈ R
(C)
(B)
1 2x 2h 2 f − 1 + 2 f − 1 − f ( x) 2 2 2
h →0
→ CO 2 + ZnO (a) ZnCO 3 heat (A)
–
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NOVEMBER 2011
12. Find all the solutions of : 4 cos2x sin x – 2 sin2x = 3 sin x [IIT-1983] Sol. 4 cos2x sin x – 2 sin2x = 3 sin x ⇒ 4(1 – sin2x) sin x – 2 sin2x – 3 sin x = 0 ⇒ 4 sin x – 4 sin3x – 2 sin2x – 3 sin x = 0 ⇒ – 4 sin3x – 2 sin2x + sin x = 0 ⇒ – sin x (4 sin2x + 2 sin x – 1) = 0 ⇒ sin x = 0 or 4 sin2x + 2 sin x – 1 = 0
⇒ sin x = sin 0 or sin x =
π ⇒ p sin x = 2nπ ± − p cos x , n ∈ I 2
− 2 ± 4 + 16 2( 4)
⇒ x = nπ or sin x =
− 1± 5 4
x = nπ or sin x = sin
π 3π or sin x = sin − 10 10
⇒ x = nπ + (–1)n
14. Find the smallest positive number p for which the equation cos (p sin x) = sin(p cos x) has a solution x ∈ [0, 2π] [IIT-1995] Sol. cos (p sin x) = sin (p cos x) (given) ∀ x ∈[0, 2π] π ⇒ cos (p sin x) = cos − p cos x 2
[Q cos θ = cos α ⇒ θ = 2nπ ± α, n ∈ I] ⇒ p sin x + p cos x = 2nπ + π/2 or p sin x – p cos x = 2nπ – π/2, n∈ I 1 1 sin x + cos x = 2nπ + π/2 ⇒ p. 2 2 2 1 1 or p 2 sin x − cos x = 2nπ – π/2, n ∈ I 2 2
π 3π , nπ + (–1)n − 10 10
π π π ⇒ p 2 cos sin x + sin cos x = 2nπ + 4 4 2
∴ General solution set π ⇒ (x : x = nπ} ∪ x : x = nπ + (−1) n 10
π π π or p 2 cos sin x − sin cos x = 2nπ – , n ∈ I 4 4 2
− 3π ∪ x : x = nπ + (−1) n 10
π π ⇒ p 2 sin x + = (4n + 1) , n ∈ I 4 2
13. Let C1 and C2 be two circles with C2 lying inside C1. A circle C lying inside C1 touches C1 internally and C2 externally. Identify the locus of the centre to C. [IIT-2001] Sol. Let the given circles C1 and C2 have centres O1 and O2 and radii r1 and r2 respectively. Let the variable circle C touching C1 internally, C2 externally have a radius r and centre at O. C2 O2 r2
π π or p 2 sin x − = (4n – 1) , n ∈ I 4 2 Now, –1 ≤ sin (x ± π/4) ≤ 1 ⇒ – p 2 ≤ p 2 sin (x ± π/4) ≤ p 2 (4n + 1).π ⇒–p 2 ≤ ≤p 2 ,n∈I 2 (4n − 1)π or – p 2 ≤ ≤p 2 ,n∈I 2 Second inequality is always a subset of first, therefore, we have to consider only first. It is sufficient to consider n ≥ 0, because for n > 0, the solution will be same for n ≥ 0.
C1 r
O1
O
If n ≥ 0, – 2 p ≤ (4n + 1) π/2
C
⇒ (4n + 1) π/2 ≤ 2 p For p to be least, n should be least ⇒ n=0 π ⇒ 2 p ≥ π/2 ⇒ p ≥ 2 2
r1
Now, OO2 = r + r2 and OO1 = r1 – r ⇒ OO1 + OO2 = r1 + r2 which is greater than O1O2 as O1O2 < r1 + r2
Therefore least value of p =
(Q C2 lies inside C1) ⇒ locus of O is an ellipse with foci O1 and O2.
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12
π 2 2
NOVEMBER 2011
15. Find the range of values of t for which
2 sin t =
2
π π , t ∈ − , [IIT-2005] 3x − 2 x − 1 2 2
1 − 2 x + 5x
1 − 2 x + 5x 2
π π , t ∈ − , 2 3x − 2 x − 1 2 2 Put, 2sin t = y ⇒ – 2 ≤ y ≤ 2 ∴ (3y – 5)x2 – 2x(y – 1) – (y + 1) = 0 Since x ∈ R – {1, –1/3} {as, 3x2 – 2x – 1 ≠ 0} ∴ D≥0 ⇒ 4(y – 1)2 + 4(3y – 5) (y + 1) ≥ 0 ⇒ y2 – y – 1 ≥ 0
The speed of all types of electromagnetic waves is 3.0 x 108 m/sec in a vacuum.
9.
The amplitude of a sound wave determines its energy.
11. At the critical angle a wave will be refracted to 90 degrees. 12. According to the Doppler effect a wave source moving toward you will generate waves with a shorter wavelength and higher frequency.
5 1 ⇒ y− – ≥0 2 4
13. Double slit diffraction works diffraction and interference.
1 5 1 5 ⇒ y− − y− + ≥0 2 2 2 2
because
of
14. Single slit diffraction produces a much wider central maximum than double slit.
1− 5 1+ 5 or y ≥ 2 2
15. Diffuse reflection occurs from dull surfaces while regular reflection occurs from mirror type surfaces.
1− 5 1+ 5 or sin t ≥ 2 2
16. As the frequency of a wave increases its energy increases and its wavelength decreases.
π 3π ⇒ sin t ≤ sin − or sin t ≥ sin 10 10 ⇒t≤–
8.
10. Constructive interference occurs when two waves are zero (0) degrees out of phase or a whole number of wavelengths (360 degrees.) out of phase.
2
or 2 sin t ≤
Light wave are transverse (they can be polarized).
2
Sol. Here, 2 sin t =
⇒ y≤
7.
17. Transverse wave particles vibrate back and forth perpendicular to the wave direction.
3π π or t ≥ 10 10
18. Wave behavior is proven by diffraction, interference and the polarization of light.
π π 3π π Thus, Range for t ∈ − , ∪ , 2 2 10 2
19. Shorter waves with higher frequencies have shorter periods. 20. Radiowaves are electromagnetic and travel at the speed of light (c).
Physics Facts
21. Monochromatic light has one frequency. 22. Coherent light waves are all in phase.
Wave Phenomena 1.
Sound waves are longitudinal and mechanical.
2.
Light slows down, bends toward the normal and has a shorter wavelength when it enters a higher (n) value medium.
23. Real images are always inverted.
3.
All angles in wave theory problems are measured to the normal.
25. Diverging lens (concave) produce only small virtual images.
4.
Blue light has more energy. A shorter wavelength and a higher frequency than red light (rememberROYGBIV).
26. Light rays bend away from the normal as they gain speed and a longer wavelength by entering a slower (n) medium {frequency remains constant}.
5.
The electromagnetic spectrum (radio, infrared, visible. Ultraviolet x-ray and gamma) are listed lowest energy to highest.
27. The focal length of a converging lens (convex) is shorter with a higher (n) value lens or if blue light replaces red.
6.
A prism produces a rainbow from white light by dispersion (red bends the least because it slows the least).
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Geometric Optics 24. Virtual images are always upright.
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NOVEMBER 2011
Physics Challenging Problems
Set # 7
This section is designed to give IIT JEE aspirants a thorough grinding & exposure to variety of possible twists and turns of problems in physics that would be very helpful in facing IIT JEE. Each and every problem is well thought of in order to strengthen the concepts and we hope that this section would prove a rich resource for practicing challenging problems and enhancing the preparation level of IIT JEE aspirants. By : Dev Sharma Director Academics, Jodhpur Branch
So lutions will b e p ub lished in nex t issue 1.
2.
A current I enters at A in a square D loop of uniform resistance and leaves at B. The ratio of magnetic field at the centre of square loop due to A segments AB and due to DC is I (A) 1 (B) 2 (C) 3 (D) 4
C
B I
A body is thrown from the surface of earth with gR (when R is radius of earth) at some velocity 2 angle from the vertical. If the maximum height reached by body is R/4 then angle of projection with vertical is 5 5 (A) sin −1 (B) cos −1 4 4 3 (C) sin −1 2
4.
(D) None of these
There is an infinite straight chain of alternating charges q and –q. The distance between the two neighbouring charges is equal to d. Then the interaction energy of any charge with all the other charges is
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− 2q 2 4π ∈0 d
(B)
(C)
− 2q 2 log e 2 4π ∈0 d
(D) None of these
Passage # (Q. No. 5 to Q. No. 7) A extension of Young’s double slit interference experiment its to increase the number of slits from two to a large number N. A three slit grating consists three slits of width a and separated by spacing d. Intensity due to single slit is I0. 5. The intensity pattern for a three-slit grating is given 2πd sin θ by (assume a << λ and φ = ) θ = angle of λ diffraction (A) Iθ = Iθ(1 + 4 cosφ + 4cos2φ) (B) Iθ = I0(1 + 4 cosφ) (D) Iθ = I0 (1 + 4 sin φ + 4 sin2 ) (C) Iθ = 0
The potential difference across a 2H inductor is as a function of time is shown. At t = 0 current is zero. Then (A) current at t = 2s is 5A (B) current at t = 2s is 10A (C) current versus time graph in inductor will be
(D) current versus time graph in inductor will be
3.
2q 2 log e 2 4π ∈0 d
(A)
14
6.
The maximum intensity for above three-slit grating is (A) I0 (B) 5I0 (C) 3I0 (D) 9I0
7.
The value of φ where intensity is half of the maximum intensity is (A) cos-1(0.56) (B) sin-1(0.56) (C) 30º (D) None of these
8.
A satellite is revolving around earth in a circular orbit of m radius r0 with velocity v0. A particle of mass is projected from satellite in forward direction 5 with relative velocity v = − 1 v 0 . During 4 subsequent motion of particle match the following (assume M = mass of earth) Column – I Column – II (A) Magnitude of total energy (P) 5GMm/8r0 of particle (B) Minimum distance of (Q) r0 particle from earth (C) Maximum distance of (R) 3/5r0 particle from earth (D) Minimum kinetic energy (S) 5GMm/8r0 of particle (T) None NOVEMBER 2011
1.
2.
8
Solution
Physics Challenging Problems Qu e s tio ns we r e Pub lis he d in Oc tobe r I ssu e
dQ = dW + dU as dQ = - dU ∴ dW = −2dU = 2CdT P.dV = 2CdT RT .dV = 2CdT ⇒ VT − 2C / R = constant. V Now, dQ = -dU C.dT = -Cv. dT ⇒ C = −C v Option [A] is correct
1
P = α .RT (T − T0 ) 2 ⇒
dP = 0 ⇒ T = 2T0 dT
∴ Pmin = α .R.2T0 (2T0 − T0 ) −1 / 2 [2]
8.
y=
0.8 2
2
(3x + 12xt + 12t + 4)
=
0.8 [4 + 3( x + 2 t ) 2 ]
[2]
As VT −2C / R = constant −R
Space Shuttle
⇒ T.V 2C = constant Option [B] is correct
3.
Set # 6
R ∆T where PVx = constant 1− x Option [B] is correct W=
4.
A → P, R ; B → Q, S; C → P, R ; D → S Conceptual.
5.
A → Q; B → R ; C → T; D → P 3 9 ×6 = V 3+ 7 5 2 9 1 VA − VB = × 6 = 2V ∴ VD − VB = 2 − = V 2+4 5 5 for no energy stored in capacitor VD = VB ∴ VA − VD = VA − VB VA − VD =
OK here is the deal with the space shuttle. It has three rocket engines in the back, but there's absolutely no room inside for all the fuel it needs to launch itself up into space. All of that fuel is stored outside the shuttle, in the big brown cylinder, called the external tank.
9 2 14 = ×6 ⇒ Y = Ω 5 2+Y 3
6.
The tank containing all the rocket fuel weighs seven times more than the space shuttle itself! That's a lot of really heavy fuel, and the space shuttle engines aren't quite strong enough to push the combined weight of the shuttle and the big bloated external tank up off the ground.
φ = at (T − t ) E=
dφ = a (T − 2 t ) dt T
H=
∫ 0
E2 .dt R
That's what the two long white solid rocket boosters strapped onto the sides of the external tank are for. They lift the tank! Fortunately, it was not necessary to strap an infinite series of smaller and smaller rockets to the sides of the solid rocket boosters.
Option [D] is correct 7.
T = T0 + αV 2
It is not widely known that just behind the main flight deck of the space shuttle is a small Starbucks adapted for use in zero gravity.
2
RT as PV = RT T = T0 + α P ⇒ T.P 2 = T0 P 2 + αR 2 T 2
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15
NOVEMBER 2011
Students' Forum Expert’s Solution for Question asked by IIT-JEE Aspirants
PHYSICS 1.
One end of an ideal spring is fixed to a wall at origin O and axis of spring is parallel to x-axis. A block of mass m = 1 kg is attached to free end of the spring and its is performing SHM. Equation of position of the block in co-ordinate system shown in figure is x = 10 + 3. sin (10.t),t is in second and x in cm. Another block of mass M = 3 kg, moving towards the origin with velocity 30 cm/sec collides with the block performing SHM at t = 0 and gets stuck to it Calculate 1 Kg
1 1 m(0.3)3 + M(0.3)2 = 0.18 joule 2 2 Kinetic energy of combined body (just after collision) 1 = (m + M) v2 = 0.045 Joule 2 ∴ Loss of energy, during collision = 0.18 – 0.045 joule Ans.(iii) = 0.135 joule
=
2.
3 Kg
x O (i) new amplitude of oscillations, (ii) new equation for position of the combined body and (iii) loss of energy during collision. Neglect friction. Sol. Natural length of the spring is 10 cm and force constant of the spring is K = 100 Nm–1 . Just before collision, velocities of 1 kg block and 3 kg block are (+ 0.30 ms–1) and (– 0.30 ms–1) respectively. Let velocity of combined body just after collision be v, then, according to law of conservation of momentum, (1 + 3) v = 1 (0.30) + 3 ( – 0.30) or v = – 0.15 ms–1. Negative sign indicates that combined body starts to move leftward. But at the instant of collision spring is in its natural length or combined body is in equilibrium position. Hence at t = 0, phase of combined body becomes equal to π. Now angular frequency of oscillations of combined body is
ω' =
K = m+M
m
m C
v0
A
m B
Sol. When block C collides with A and get stuck with it, combined body moves to the right, due to which spring is compressed. Therefore, the combined body retards and block B accelerates. In fact, deformation of spring varies with time and the system continues to move rightwards. In other words, centre of mass of the system moves rightwards and combined body and block B oscillate about the centre of mass of the system. Let just after the collision velocity of combined body formed by blocks C and A be v. Then, according to law of conservation of momentum, (m + m)v = mv0 v or v = 0 = 0.3 ms–1 2 ∴ Velocity of centre of mass of the system, 2m × v + m × 0 = 0.2 ms–1 vc = 2m + m Now the system is as shown in fig. 2m m
100 = 5 rad sec–1 . 1+ 3
∴ New amplitude of oscillations is |v| 0.15 = = 0.3 m or 3 cm Ans. (i) a' = ω' 5 ∴ Equation for position x of combined body is given by x = l0 + a' sin(ω't + π) or x = 10 + 3 sin (5t + π) cm Ans. (ii) or x = 10 – 3 sin (5t) cm Kinetic energy of two blocks (Just before collision) XtraEdge for IIT-JEE
Two identical blocks A and B of mass m = 3 kg are attached with ends of an ideal spring of force constant K = 2000 Nm–1 and rest over a smooth horizontal floor. Another identical block C moving with velocity v0 = 0.6 ms–1 as shown in fig. strikes the block A and gets stuck to it. Calculate for subsequent motion (i) velocity of centre of mass of the system, (ii) frequency of oscillations of the system, (iii) oscillation energy of the system, and (iv) maximum compression of the spring.
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NOVEMBER 2011
2m (2m)(m) = 3 2m + m ∴ Frequency of oscillations, 1 K 5 10 f= = Hz. 2π m 0 π
Its reduced mass,
A wire frame of area A = 4 × 10–4 m2 and resistance R = 20 Ω is suspended freely by a thread of length l = 0.40 m. A uniform horizontal magnetic field of induction B = 0.8 T exists in the space such that plane of the frame is perpendicular to the magnetic field. At time t = 0, the frame is made to oscillate under gravity by displacing it through a = 2 × 10–2 m from its initial position along the direction of the magnetic field. The plane of frame is always along the thread and does not rotate about wire frame as a function of time. Calculate also, maximum current in the frame. (g = 10 ms–2) Sol. Since, frame oscillates under gravity, therefore, it performs SHM with angular frequency 4.
m0 =
Ans.
Since, just after the collision, combined body has velocity v, therefore, energy of the system at that 1 instant, E = (2m)v2 = 0.27 joule 2 Due to velocity vC of centre of mass of the system, translational kinetic energy, 1 Et = (3m) v c2 = 0.18 joule 2 But total energy E of the system = its translational kinetic (Et) + oscillation energy (E0) ∴ E0 = E – Et = 0.09 joule At the instant of maximum compression, oscillation energy is stored in the spring in the form of its strain energy. Let maximum compression of spring be x0. 1 then Kx 02 = E0 2 ∴ x0 =
90 × 10–3 m or 3 10 mm
ω=
g / l = 5 rad/sec
Since the frame is released after displacing it through a distance a at t = 0, therefore, initial phase of its harmonic oscillations is π/2. Hence, at time t, displacement x of frame from its mean position is given by x = a sin (ωt + π/2) or x = 0.02 cos (5t) ...(i) Since, the frame always remains along the thread, therefore, at time t, its inclination with the vertical is equal that of the thread as shown in figure.
Ans.
Calculate the inductance of a closely wound solenoid of length l whose winding is made of copper wire of mass m. The winding resistance is equal to R. The solenoid diametre is considerably less than its length. Given, density of copper = d and resistivity = ρ. Sol. Let the radius of solenoid be a, total number of turns N and let cross-sectional area of wire be S. Then length of the wire of which the solenoid is made = 2π aN But its resistance is R 2πaN ∴ R = ρ S 3.
RS 2πρ Mass of the wire is given as m ∴ (2πaN) S d = m m or aN = 2πSd From equation (i) and (ii) mR (aN)2 = 4π 2ρd
or
l B x
This inclination θ is given by sin θ =
...(ii)
x ...(iii) l Since, magnetic field B is horizontal, therefore, its component normal to plane of the frame is equal to B cos θ. Hence, at time t flux linked with the frame, φ = AB cos θ since, inclination θ varies with time, therefore, flux φ also varies. Hence, an emf is induced in the frame. dφ dθ Induced emf, e=– = A B sin dt dt 1 dx or e = A B sin q . l dt
...(ii)
...(iii) µ 0 AN 2 l
x 1 e = AB ( – 02 × 5) sin (5t) l l Ans. or e = – 2 × 10–6 sin (10 t) volt e Current, i = = – 10–7 sin (10 t) amp R ∴ Maximum current (Imax) = 10–7 amp Ans. ∴
where A = πa2 µ πa 2 N 2 µ π mR ∴ L= 0 = 0 l l 4π 2ρd µ mR Ans. or L= 0 4πlρd XtraEdge for IIT-JEE
x l
Since, x << l, therefore, θ ≈ sin θ or θ =
...(i)
aN =
Self-Inductance of a solenoid is L =
θ
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NOVEMBER 2011
A rod of mass m and having resistance R can rotate freely about a horizontal axis O, sliding along a metallic circular ring of radius a as shown in figure. The ring is fixed in a vertical plane with axis coinciding with the axis of rotation of the rod. A uniform magnetic field of induction B exists in the space parallel to the axis of +E – rotation. A voltage source is connected across the ring and the axis. Neglecting self inductance of the circuit, calculate the law according to which emf of the × ωt i source must vary so that rod O rotates with constant angular velocity ω. Sol. When the rod rotates, it cuts magnetic lines of flux. Hence, an emf is induced in the rod. Magnitude of this induced emf is equal to flux cut per second by the rod. ∴ Induced emf, e = B × area traced per second by 1 the rod = Bωa2 2 According to Fleming's right hand rule, the induced emf tries to flow a radially outward current through the rod. It means that induced emf is in opposition to emf of the source. Assuming tht the magnitude of induced emf is greater than that of the source, net emf of the circuit becomes equal to (e – E). e–E ∴ Current through the rod is i = . R (radially outward) Due to the current, force experienced by the rod is equal to F = Bia. Direction of this force is such that it produces a retarding moment as shown in figure +E – 5.
F ωt
×
O mg
Physics Facts Modern Physics
XtraEdge for IIT-JEE
The particle behavior of light is proven by the photoelectric effect.
2.
A photon is a particle of light {wave packet}.
3.
Large objects have very short wavelengths when moving and thus can not be observed behaving as a wave. (DeBroglie Waves)
4.
All electromagnetic waves accelerating charged particles.
5.
The frequency of a light wave determines its energy (E = hf).
6.
The lowest energy state of a atom is called the ground state.
7.
Increasing light frequency increases the kinetic energy of the emitted photo-electrons.
8.
As the threshold frequency increase for a photocell (photo emissive material) the work function also increases.
9.
Increasing light intensity increases the number of emitted photo-electrons but not their KE.
originate
from
Internal Energy 10. Internal energy is the sum of temperature (ke) and phase (pe) conditions. 11. Steam and liquid water molecules at 100 degrees have equal kinetic energies. 12. Degrees Kelvin (absolute temp.) Is equal to zero (0) degrees Celsius. 13. Temperature measures the average kinetic energy of the molecules.
i
14. Phase changes are due to potential energy changes. 15. Internal energy always flows from an object at higher temperature to one of lower temperature.
a 2 Ba 2 or τ1 = (e – E) 2R Weight mg of the rod produces an accelerating moment a τ2 = mg sin (ωt) 2 Since, angular velocity ω of the rod remains constant, therefore, the resultant torque on the rod must be equal to zero. Hence, τ1 = τ2 mgR 1 or E = Bωa2 – sin (ωt) Ans. Ba 2
This retarding moment,
1.
τ1 = F
General 16. The most important formulas in the physics regents are:
17. Physics is fun. (Honest!)
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NOVEMBER 2011
P HYSICS F UNDAMENTAL F OR IIT-J EE
Electromagnetic Induction & A.C. KEY CONCEPTS & PROBLEM SOLVING STRATEGY
When an emf is induced by a changing magnetic flux through a stationary conductor, there is an induced r electric field E of non-electrostatic origin. This field is non conservative and cannot be associated with a potential. r r dΦ B E.d l = – dt
Electromagnetic Induction (E.M.I.) Faraday's law states that the induced emf in a closed loop equals the negative of time rate of change of magnetic flux through the loop. This relation is valid whether the flux change is caused by a changing magnetic field, motion of the loop, or both. dΦ B ε=– dt
∫
G
A
B
E
φ
I ε
E When a bulk piece of conducting material, such as a metal, is in a changing magnetic field or moves through a field, currents called eddy currents are induced in the volume of the material.
Change in B B (increasing)
B0
B´
Binduced If a conductor moves in a magnetic field, a motional emf is induced. ε = vBL r (conductor with length L moves in uniform B field, r r r L and v both perpendicular to B and to each other) r r r ε = ( v × B).d l r (all or part of a closed loop moves in a B field) ×B × × a × × × + a × × × × × × F=qvB × × × × × × q v × ×L × × × ×
A time-varying electric field generates a displacement current iD, which acts as a source of magnetic field in exactly the same way as conduction current. iD = ε
∫
×
×
×
×
×
×
×
×
XtraEdge for IIT-JEE
–
×
dΦ E (displacement current) dt
Alternating Current (A.C.)
An alternator or ac source produces an emf varies sinusoidally with time. A sinusoidal voltage or current can be represented of the by a phasor, a vector that rotates counterclockwise with constant angular velocity ω equals to the angular frequency of the sinusoidal quantity. Its projection on the horizontal axis at any instant represents the instantaneous value of the quantity.
× × × F = qE × × × ×
I´
I0
I
×
r
E
Lenz's law states that an induced current or emf always tends to oppose or cancel out the change that caused it. Lenz's law can be derived from Faraday's law, and is often easier to use.
ε
B
×
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angular frequency ω determine the impedance and the phase angle φ of the voltage relative to the current. V = IZ
ω I
Z = R 2 + (X L − X C ) 2 = R 2 + [ωL − (1 / ωC)]2
ωt
tan φ =
O i=I cos ωt For a sinusoidal current, the rectified average and rms (root-mean-square) currents are proportional to the current amplitude I. Similarly, the rms value of a sinusoidal voltage is proportional to the voltage amplitude V. 2 Irav = I = 0.637 I π I V ; Vrms = Irms = 2 2 In general, the instantaneous voltage between two points in an ac circuit is not in phase with the instantaneous current passing through points. The quantity φ is called the phase angle of the voltage relative to the current. i = I cos ωt v = V cos(ωt + φ)
ωL − 1 / ωC R VL = IXL
I
φ
R
Pav = ½ VIcosφ
p φ ω
b a L Capacitor connected to ac source
i
an angular frequency ω0 = 1/ LC called the resonance angular frequency. This phenomenon is called resonance. At resonance the voltage and current are in phase, and the impedance Z is equal to the resistance R. I(A) 0.5 0.4 0.3 0.2 0.1 0
b
200 Ω 500 Ω 2000 Ω
ω (rad/s) 1000 2000 A transformer is used to transform the voltage and current levels in an ac circuit. In an ideal transformer with no energy losses, if the primary winding has N1 turns and the secondary winding has N2 turns, the amplitudes (or rms values) of the two voltages are related by Eq. The amplitudes (or rms values) of the primary and secondary voltages and currents are related by Eq.
q –q i
a C b In a general ac circuit, the voltage and current amplitude are related by the circuit impedance Z. In an L-R-C series circuit, the values of L, R, C, and the
XtraEdge for IIT-JEE
t
p
In an L-R-C series circuit, the current becomes maximum and the impedance becomes minimum at
i
i
VC = IXC
The average power input Pav to an ac circuit depend on the voltage and current amplitudes (or, equivalently, their rms values) and the phase angle φ of the voltage relative to the current. The quantity cos φ is called the power factor. 1 Pav = VI cos φ = VrmsIrmscos φ 2 v, i, p
V cosφ ωt
i
ωt VR = IR
O
O The voltage across a resistor R is in phase with the current. The voltage across an inductor L leads the current by 90º (φ = + 90º), while the voltage across a capacitor C lags the current by 90º(φ = –90º). The voltage amplitude across each type of device is proportional to the current amplitude I. An inductor has inductive reactance XL = ωL and a capacitor has capacitive reactance XC = 1/ωC. VL = IXL; VC = IXC VR = IR; Resistor connected to Inductor connected to ac source ac source
a
φ
VL – VC
I V
V = IZ
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P.S.S. :: Inductors in Circuits : Step 1: Identify the relevant concepts : An inductor is just another circuit element, like a source of emf, a resistor, or a capacitor. One key difference is that when an inductor is included in a circuit, all the voltages, currents, and capacitor charges are in general functions of time, not constants as they have been in most of our previous circuit analysis. But Kirchhoff's rules, which we studied in section, are still valid. When the voltages and currents vary with time, Kirchhoff's rules hold at each instant of time. Step 2: Set up the problem using the following steps Draw a large circuit diagram and label all quantities known and unknown. Apply the junction rule immediately at any junction. Determine which quantities are the target variables. Step 3: Execute the solution as follows : Apply Kirchhoff's loop rule to each loop in the circuit. As in all circuit analysis, getting the correct sign for each potential difference is essential. To get the correct sign for the potential difference between the terminals of an inductor, remember Lenz's law and the sign rule described in section di in conjunction with eq. ε = –L (self-induced dt emf) and fig. In Kirchhoff's loop rule, when we go through an inductor in the same direction as the assumed current, we encounter a voltage drop equal to L di/dt, so the corresponding term in the loop equation is –L di/dt. When we go through an inductor in the opposite direction from the assumed current, the potential difference is reversed and the term to use in the loop equation is + L di/dt. a
V2 N = 2 ; V1I1 = V2I2 V1 N1
Problem Solving Strategy (P.S.S.) : Faraday' Law Step 1: Identify the relevant concepts: Faraday's law applies when there is a changing magnetic flux. To use the law, make sure you can identify an area through which there is a flux of magnetic field. This will usually be the area enclosed by a loop, usually made of a conducting material. As always, identify the target variable(s). Step 2: Set up the problems using the following steps Faraday's law relates the induced emf to the rate of change of magnetic flux. To calculate this rate of change, you first have to understand what is making the flux change. Is the conductor moving? Is it changing orientation? Is the magnetic field changing? Remember that it's not the flux itself that counts, but its rate of change. r r Choose a direction for the area vector A or dA . The direction must always be perpendicular to the plane of the area. Note that you always have two choice of direction. For instance, if the plane of r the area is horizontal, A could point straight up or straight down. It's like choosing which direction is the positive one in a problem involving motion in a straight line; it doesn't matter which direction you choose, just so you use it consistently throughout the problem. Step 3: Execute the solution as follows : Calculate the magnetic flux using Eq. r r r φB = B . A = BA cos φ if B is uniform over the r r area of the loop or eq. φB = B . dA = B dA cos φ
∫
∫
if it is not uniform, being mindful of the direction you chose for the area vector. Calculate the induced emf using Eq. ε = – (Faraday's law of induction) or ε = –N
b
dφ B . dt
Vab = L
If your conductor has N turns in a coil, do not forget multiply by N. Remember the sign rule for the positive direction of emf and use it consistently. If the circuit resistance is known, you can calculate the magnitude of the induced current I using ε = IR. Step 4: Evaluate your answer : Check your results for the proper units, and double-check that you have properly implemented the sign rules for calculating magnetic flux and induced emf.
XtraEdge for IIT-JEE
L
i
dφ B dt
di dt
Inductor with current i following from a to b: If di/dt > 0 : potential drops from a to b If di/dt < 0: potential increases from a to b If i is constant (di/dt = 0): no potential difference As always, solve for the target variables. Step 4: Evaluate your answer : Check whether your answer is consistent with the way that inductors behave. If the current through an inductor is changing, your result should indicate that the potential difference across the inductor opposes the 21
NOVEMBER 2011
change. If not, you probably used an incorrect sign somewhere in your calculation.
VR = IR
I
P.S.S. :: Alternating –Current Circuits : Step 1: Identify the relevant concepts: All of the concepts that we used to analyze direct-current circuits also apply to alternating current circuits. However, we must be careful to distinguish between the amplitudes of alternating currents and voltages and their instantaneous values. We must also keep in mind the distinctions between resistance (for resistors), reactance (for inductors or capacitors), and impedance (for composite circuits). Step 2: Set up the problem using the following steps Draw a diagram of the circuit and label all known and unknown quantities. Determine the target variables. Step 3: Execute the solution as follows : In ac circuit problem it is nearly always easiest to work with angular frequency ω. If you are given the ordinary frequency f, expressed in Hz, convert it using the relation ω = 2πf. Keep in mind a few basic facts about phase relationships. For a resistor, voltage and current are always in phase, and the two corresponding phasor in a diagram always have the same direction. For an inductor, the voltage always leads the current by 90º (i.e., φ = + 90º), and the voltage phasor is always turned 90º counterclockwise from the current phasor. For a capacitor, the voltage always lags the current by 90º (i.e., φ = –90º), and the voltage phasor is always turned 90º clockwise from the current phasor. Remember that with ac circuits, all voltages and currents are sinusoidal functions of time instead of being constant, but Kirchhoff's rules hold nonetheless at each instant. Thus, in a series circuit, the instantaneous current is the same in all circuit elements; in a parallel circuit, the instantaneous potential difference is the same across all circuit elements. Inductive reactance, capacitive reactance, and impedance are analogous to resistance; each represents the ratio of voltage amplitude V to current amplitude I in a circuit element or combination of elements. Keep in mind, however, that phase relations play an essential role. The effect of resistance and reactance have to be combined by vector addition of the corresponding voltage phasors, as in fig(i) & (ii). When you have several circuit elements in series, for example, you can't just add all the numerical values of resistance and reactance to get the impedance; that would ignore the phase relations.
XtraEdge for IIT-JEE
V = IZ
VL = IXL
V L – VC
φ
ωt VR = IR
O
VC = IXC
Phasor diagram for the case XL> XC
φ
V = IZ I
VL = IXL ωt O
VL–VC VC=IXC Phasor diagram for the case XL< XC
Fig. (i) Fig. (ii) Evaluate your answer : When working with a series L-R-C circuit, you can check your results by comparing the values of the inductive reactance XL and the capacitive reactance XC. If XL > XC, then the voltage amplitude across the inductor is greater than that across the capacitor and the phase angle φ is positive (between 0 and 90º). If XL < XC , then the voltage amplitude across the inductor is less than that across the capacitor and the phase angle φ is negative between (0 and –90º).
Solved Examples 1.
A coil of 160 turns of cross-sectional area 250 cm2 rotates at an angular velocity of 300 rad/sec. about an axis parallel to the plane of the coil in a uniform magnetic field of 0.6 weber/metre2. What is the maximum e.m.f. induced in the coil. If the coil is connected to a resistance of 2 ohm, what is the maximum torque that has to be delivered to maintain its motion ?
Sol. We know that, emax = NABω = 160 × 0.6 × (250 × 10–4) × 300 = 720 volt.
Now imax =
e max 720 = = 360 amp R 2
τ(torque) = NiBA sin θ τmax = NiBA = 160 × 360 × 0.6 × (250 × 10–4) = 864 newton metre This torque opposes the rotation of the coil (Lenz's Law). Hence to maintain the rotation of the coil, an equal torque must be applied in opposite direction. So the torque required is = 864 newton metre. 2.
22
A closed coil having 50 turns, area 300 cm2, is rotated from a position where it plane makes an angle of 45º with a magnetic field of flux density 2.0 weber/metre2 to a position perpendicular to the field in a time 0.1 sec. What is the average e.m.f. induced in the coil ? NOVEMBER 2011
(a) the potential difference across R, L and C (b) the impedance of the circuit (c) the voltage of A.C. supply (d) phase angle Sol. (a) Potential difference across resistance VR = iR = 5 × 16 = 80 volt Potential difference across inductance
Sol. The flux linked initially with each turn of the coil is
Φ = B.A = BA cos θ = BA cos 45º Substituting the values, we get weber 4 –2 Φ = 2.0 × (300 × 10 metre )×(0.7071) 2 metre
= 4.24 × 10–2 weber The final flux linked with each turn of the coil
VL = i × (ωL) = 5 × 24 = 120 volt Potential difference across condenser
Φ´ = BA cos 0º = BA = 2.0 × (300 × 10–4) = 6.0 × 10–2 weber
VC = i × (1/ωC) = 5 × 12 = 60 volt
Change in flux = Φ´ – Φ = (6.0 × 10–2) – 4.24 × 10–2 = 1.76 × 10–2 Weber This change is carried out in 0.1 sec. The magnitude of the e.m.f. induced in the coil is given by
(b)
=
3.
1.76 × 10 −5 = 8.8 volt. 0.1
ωL − (1 / ωC) φ = tan–1 R
24 − 12 = tan–1 16
A vertical copper disc of diameter 20 cm makes 10 revolution per second about a horizontal axis passing through it centre. A uniform magnetic field 10–2 weber/m2 acts perpendicular to the plane of the disc. Calculate the potential difference between its centre and rim in volt.
= tan–1(0.75) = 36º46´ A 100 volt A.C. source of frequency 500 hertz is connected to a L-C-R circuit with L = 8.1 millinery, C = 12.5 microfarad and R = 10 ohm, all connected in series. Find the potential difference across the resistance. Sol. The impedance of L-C-R circuit is given by 5.
Sol. The magnetic flux Φ linked with the disc is given by
Φ = BA
The induced e.m.f. (potential difference) between rim and centre ∴ e=–
where ∴
dΦ d dA (numerically) = – (BA) = B dt dt dt
where XL = ωL = 2πfL = 2 × 3.14 × 500 × (8.1 × 10–3) = 25.4 ohm
dA = πr2 × number of revolutions per second dt
and XC =
= 3.14 × (0.1)2 × 10
=
= 0.314 ∴
2
2
e = (10 weber/m ) × (0.314 m /sec) ∴
A resistance R and inductance L and a capacitor C all are connected in series with an A.C. supply. The resistance of R is 16 ohm and for a given frequency, the inductive reactance of L is 24 ohm and capacitive reactance of C is 12 ohm, If the current in the circuit is 5 amp., find
XtraEdge for IIT-JEE
1 1 = ωC 2πfC 1 2 × 3.14 × 500 × (12.5 × 10 − 6 )
= 25.4 ohm
= 3.14 × 10–3 volt. 4.
[R 2 + (X L − X C ) 2 ]
Z=
dA is the area swept out by the disc in unit time. dt
–2
[(16) 2 + (24 − 12) 2 ] = 20 ohm
(c) The voltage of A.C. supply is given by E = iZ = 5 × 20 = 100 volt (d) Phase angle
d(Φ´−Φ) e=N dt
= 50 ×
Z =
2 2 1 R + ωL − ωC
Z =
∴ ir.m.s. =
[(10) 2 + (25.4 − 25.4) 2 ] = 10 ohm E r.m.s 100 volt = = 10 amp. Z 10 ohm
Potential difference across resistance VR = ir.m.s. × R = 10 amp × 10 ohm = 100 volt.
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P HYSICS F UNDAMENTAL F OR IIT-J EE
Simple Harmonic Motion KEY CONCEPTS & PROBLEM SOLVING STRATEGY
Periodic motion is motion that repeats itself in a definite cycle. It occurs whenever a body has a stable equilibrium position and a restoring force that acts when it is displaced from equilibrium. Period T is the time for one cycle. Frequency f is the number of cycles per unit time. Angular frequency ω is 2π times the frequency. 1 1 2π or T = ; ω = 2π f = f = T f T y y y a n n n a x x x mg F O O mg O F mg
In SHM, the displacement, velocity, and acceleration are sinusoidal functions of time. The angular frequency is ω = k / m ; the amplitude A and phase angle φ are determined by the initial position and velocity of the body. x = A cos(ωt + φ) x A O –A
If the net force is a restoring force F that is directly proportional to the displacement x, the motion is called simple harmonic motion (SHM). In many cases this condition is satisfied if the displacement from equilibrium is small. F k Fx = –kx; ax = x = – x m m Fx = – kx
Fx > 0
Displacement x 0
K –A
x A In angular simple harmonic motion, the frequency and angular frequency are related to the moment of inertia I and the torsion constant k.
x>0 Fx < 0
The circle of reference construction uses a rotating vector called a phasor, having a length equal to the amplitude of the motion. Its projection on the horizontal axis represents the actual motion of a body in simple harmonic motion. y Displacement
O
O
k 1 k and f = I 2π I A simple pendulum consists of a point mass m at the end of a massless string of length L. Its motion is approximately simple harmonic for sufficiently small amplitude; the angular frequency, frequency, and period depend only on g and L, not on the mass or amplitude.
ω=
Q
A
t
2T
Energy is conserved in SHM. The total energy can be expressed in terms of the force constant k and amplitude A. 1 1 1 E = mvx2 + kx2 = kA2 = constant 2 2 2 Energy E = K+U U
Restoring force Fx x<0
T
P
x x= A cos θ
θ T
The angular frequency, frequency, and period in SHM do not depend on the amplitude, but only on the mass m and force constant k. k 1 k m 1 ω = ω= ; f= ; T= = 2π m 2π m k 2π f
XtraEdge for IIT-JEE
L
x
mg sinθ
m θ mg cosθ
mg
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NOVEMBER 2011
ω=
g ; L
f=
ω 1 = 2π 2π
If you need to find the values of x, vx, and ax at various times, use Eqs.
g L
2π L 1 = = 2π ω g f
T=
f=
dv x d2x = 2 = –ω2A cos (ωt + φ). dt dt If the initial position x0 and initial velocity v0x are both given, you can determine the phase angle v and amplitude from Eqs. φ = arctan 0 x ωx 0 and ax =
A physical pendulum is a body suspended from an axis of rotation a distance d from its center of gravity. If the moment of inertia about the axis of rotation is I, the angular frequency and period for small-amplitude oscillations are independent of amplitude. ω=
mgd ; I
T = 2π O
d sinθ mg sinθ
I mgd
(phase angle in SHM) and A =
x 02 +
v 02 x
ω2 (amplitude in SHM). If the body is given an initial positive displacement x0 but zero initial velocity (v0x = 0), then the amplitude is A = x0 and the phase angle is φ = 0. If it has an initial positive velocity v0x but no initial displacement (x0 = 0), the amplitude is A = v0x / ω and the phase angle is φ = –π/2. Step 4: Evaluate your answer : Check your results to make sure that they're consistent. As an example, suppose you've used the initial position and velocity to find general expressions for x and vx at time t. If you substitute t = 0 into these expressions, you should get back the correct values of x0 and vvx. Simple Harmonic Motion II The energy equation
z
θ d cg mg cosθ
mg
Problem Solving Strategy : Simple Harmonic Motion I : Step 1: Identify the relevant concepts : An oscillating system under goes simple harmonic motion (SHM) only if the restoring force is directly proportional to the displacement. Be certain that this is the case for the problem at hand before attempting to use any of the results of this section. As always, identify the target variables. Step 2: Set up the problem using the following steps Identify the known and unknown quantities, and determine which are the target variables. It's useful to distinguish between two kinds of quantities. Basic properties of the system include the mass m and force constant k. (In some problems, m, k, or both can be determined from other information.) They also include quantities derived from m and k, such as the period T, frequency f, and angular frequency ω. Properties of the motion describe how the system behaves when it is set into motion in a particular way. They include the amplitude A, maximum velocity vmax, and phase angle φ, as well as the values of x,vx, and ax at the particular time. If necessary, define an x-axis as. Step 3: Execute the solution as follows :
1 1 1 mv 2x + kx2 = kA2 = constant ...(i) 2 2 2 is a useful alternative relation between velocity and position, especially when energy quantities are also required. If the problem involves a relation among position, velocity, and acceleration without reference to time, it is usually easier to use Eq.
E=
d2x
k =– x ...(ii) m dt 2 (from Newton's second law) or eq. (i) (from energy conservation) than to use the general expressions for x, vx, and ax as functions of time [Eqs.
ax =
x = A cos (ωt + φ) (displacement in SHM), vx =
dx = –ωA sin (ωt + φ) (velocity in SHM) and dt
dv x d2x = = – ω2A cos (ωt + φ) (acceleration 2 dt dt in SHM), respectively ]. Because the energy equation involves x2 and vx2, it cannot tell you the sign of x or vx, you have to infer the sign from the situation. For instance, if the body is moving from the equilibrium position towards the point of greatest positive displacement, then x is positive and vx is positive. ax =
Use the equations T = 1/f and ω = 2πf = 2π/T to solve for the target variables. If you need to calculate the phase angle, be certain to express it in radians. The quantity ωt in Eq. Fx = – kx is naturally in radians, so φ must be as well.
XtraEdge for IIT-JEE
1 k ω dx = = – ωA sin (ωt + φ) , vx = 2π m 2π dt
25
NOVEMBER 2011
A particle of mass m is located in a unidimensional potential field where the potential energy of the particle depends on the coordinate x as U(x) = U0(1 – cos C x); U0 and C are constants. Find the period of small oscillations that the particle performs about the equilibrium position. Sol. Given that U(x) = U0(1 – cos C x) dV( x ) We know that F = ma = – dx 1 dU( x ) 1 − ∴ a= = [– U0 C sin C] dx m m 4.
Solved Examples 1.
A body of mass 1 kg is executing simple harmonic motion which is given by x = 6.0 cos (100 t + π/4) cm. What is the (i) amplitude of displacement, (ii) frequency, (iii) initial phase, (iv) velocity, (v) acceleration, (vi) maximum kinetic energy ? Sol. The given equation of S.H.M. is x = 6.0 cos (100 t + π/4) cm Comparing it with the standard equation of S.H.M., x = a cos (ωt + φ), we have (i) amplitude a = 6.0 cm (ii) frequency ω = 100 /sec (iii) initial phase φ = π/4
U 0C U C2 [Cx] = – 0 x (Q sin Cx ≈ Cx) m m Here acceleration is directly proportional to the negative of displacement. So, the motion is S.H.M. Time period T is given by
or a = –
(iv) velocity v = ω (a 2 − x 2 ) = 100 (36 − x 2 ) (v) acceleration = –ω2 x = – (100)2x = – 104 x 1 1 (vi) kinetic energy = mv2 = mω2(a2 – x2) 2 2 When x = 0, the kinetic energy is maximum, i.e., 1 1 36 metre × 1 × 104 × (K.E.)max = mω2a2 = 2 2 100 = 18 joules 2.
T=
2π = ω
m = 2π U C2 ( U 0 C 2 / m) 0
2π
Find the period of small oscillations in a vertical plane performed by a ball of mass m = 40 g fixed at the middle of a horizontally stretched string l = 1.0 m in length. The tension of the string is assumed to be constant and equal to F = 10 N. Sol. The situation is showing in fig. The components of T in upwards direction are T cos θ and T cos θ. Hence the force acting on the ball = 2 T cos θ 5.
A particle of mass 0.8 kg is executing simple harmonic motion with an amplitude of 1.0 metre and periodic time 11/7 sec. Calculate the velocity and the kinetic energy of the particle at the moment when its displacement is 0.6 meter.
Sol. We know that, v = ω (a 2 − y 2 )
l/2
Further ω = 2π/T 2π 2 × 3.14 ∴ v= (a 2 − y 2 ) = [(1.0) 2 − (0.6) 2 ] T (11 / 7) = 3.2 m/sec Kinetic energy at this displacement is given by 1 1 K = mv2 = × 0.8 × (3.2)2 = 4.1 joule 2 2
l/2 x θ
T
∴ma = –
A person normally weighing 60 kg stands on a platform which oscillates up and down harmonically at a frequency 2.0 sec–1 and an amplitude 5.0 cm. If a machine on the platform gives the person's weight against time, deduce the maximum and minimum reading it will show, take g = 10 m/sec2. Sol. Acceleration of the platform a = ω2y Maximum acceleration amax = ω2A (A = Amplitude) ∴ amax = (2πν)2A (ν = frequency) = 4(3.14)2 (2)2 × 0.05 = 7.88 m/sec2 m(g + a max ) 60(10 + 7.88) Maximum reading = = g 10 = 107.3 kg M (g − a max ) 60(10 − 7.88) Minimum reading = = 10 g = 12.7 kg.
θ
T
2Fx 2
(l / 4 + x 2 )
Q T = F and cos θ =
3.
XtraEdge for IIT-JEE
2
x (l 2 / 4 + x 2 ) can be neglected from the
As x is small, x denominator. 2Fx 4F ∴ a=– =– x m(l / 2) ml or a = – ω2x where ω2 = (4 F/ml) Here acceleration is directly proportional to the negative of displacement x. Hence the motion is S.H.M. 2π = ω
2π
ml =π (4F / ml) F Substituting the given values, we get T=
T = 3.14 ×
26
(4 × 10 − 2 )(1.0) = 0.2 sec. 10
NOVEMBER 2011
Organic Chemistry Fundamentals
NITROGEN COMPOUND
Basicity of Amines : Amines are relatively weak bases. They are stronger bases than water but are far weaker bases than hydroxide ions, alkoxide ions, and alkanide anions. A convenient way to compare the base strengths of amines is to compare the acidity constants (or pKa values) of their conjugate acids, the corresponding alkylaminium ions. The expression for this acidity constant is as follows : +
RNH2 + H3O+
R N H 3 + H2O
Ka =
following amines increases with increasing methyl substitution : (CH3)3N > (CH3)2NH > CH3NH2 > NH3 This is not the order of basicity of these amines in aqueous solution, however. In aqueous solution the order is (CH3)2NH > CH3NH2 > (CH3)3N > NH3 The reason for this apparent anomaly is now known. In aqueous solution the aminium ions formed from secondary and primary amines are stabilized by salvation through hydrogen bonding much more effectively than are the aminium ions formed from tertiary amines. The aminium ion formed from a tertiary amine such as (CH3)3NH+ has only one hydrogen to use in hydrogen bonding to water molecules, whereas the aminium ions from secondary and primary amines have two and three hydrogens, respectively. Poorer solvation of the aminium ion formed from a tertiary amine more than counteracts the electron-releasing effect of the three methyl groups and makes the tertiary amine less basic than primary and secondary amines in aqueous solution. The electron-releasing effect does, however, make the tertiary amine more basic than ammonia. Basicity of Arylamines Aromatic amines (e.g., aniline and p- toluidine) are much weaker bases than the corresponding nonaromatic amine, cyclohexylamine : Cyclo-C6H11NH2 C6H5NH2 p-CH3C6H4NH2
[RNH 2 ][H 3 O + ] [RNH 3 + ]
pKa = – log Ka
The equilibrium for an amine that is relatively more basic will lie more toward the left in the above chemical equation than for an amine that is less basic. Consequently, the aminium ion from a more basic amine will have a smaller Ka (larger pKa) than the aminium ion of a less basic amine. When we compare aminium ion acidities in terms of this equilibrium, we see that most primary alkylaminium ions (RNH3+) are less acidic than ammonium ion (NH4+). In other words, primary alkylamines (RNH2) are more basic than ammonia (NH3): NH3 CH3NH2 CH3CH2NH2 CH3CH2CH2NH2 Conjugate 9.26 acid pKa
10.64
10.75
10.67
Conjugate acid pKa
We can account for this on the basis of the electronreleasing ability of an alkyl group. An alkyl group releases electrons, and it stabilizes the alkylaminium ion that results from the acid–base reaction by dispersing its positive charge. It stabilizes the alkylaminium ion to a greater extent than it stabilizes the amine : H R→– N – H + H – OH H
4.58
5.08
We can account for this effect, in part, on the basis of resonance contributions to the overall hybrid of an arylamine. For aniline, the following contributors are important : NH2
NH2
+
–
–
1
2
3
NH2 –
–
H
+
+
NH2
NH2
R →– N +– H + OH
By releasing electrons, R→– stabilizes the alkylaminium ion through dispersal of charge
4
5
Structures 1 and 2 are the Kekule structures that contribute to any benzene derivative. Structures 3-5, however, delocalize the unshared electron pair of the nitrogen over the ortho and para positions of the ring. This delocalization of the electron pair makes it less
This explanation is supported by measurements showing that in the gas phase the basicities of the XtraEdge for IIT-JEE
10.64
27
NOVEMBER 2011
available to a proton, and delocalization of the electron pair stabilizes aniline. When aniline accepts a proton it becomes an anilinium ion : +
⋅⋅
When primary, secondary and tertiary amines act as bases and react with acids, they form compounds called aminium salts. In an aminium salt the positively charged nitrogen atom is attached to at least one hydrogen atom :
–
C6H5 N H 3 + OH
C6H5 N H 2 + H2O
Anilinium ion Once the electron pair of the nitrogen atom accepts the proton, it is no longer available to participate in resonance, and hence we are only able to write two resonance structures for the anilinium ion – the two Kekule structures:
2
2
2
CH3CH2 – N+ – CH2CH3 Br– CH2CH3 Tetraethylammonium bromide (a quaternary ammonium salt)
Quaternary ammonium halides – because they do not have an unshared electron pair on the nitrogen atom – cannot act as bases : +
(CH 3 CH 2 ) 4 NBr−
Tetra ethyl ammonium bromide (does not undergo reaction with acid)
Quaternary ammonium hydroxides, however, are strong bases. As solids, or in solution, they consist entirely of quaternary ammonium cations (R4N+) and hydroxide ions (OH–); they are, therefore, strong bases – as strong as sodium or potassium hydroxide. Quaternary ammonium hydroxides react with acids to form quaternary ammonium salts : +
+
Enthalpy
+
NH3 + OH–
∆Hº1
Larger resonance stabilization of aniline
:NH2 (2)
Triethylaminium bromide
When the central nitrogen atom of a compound is positively charged but is not attached to a hydrogen atom, the compound is called a quaternary ammonium salt. For example CH2CH3
NH3 + OH–
+ H 2O
+
⋅⋅
Aniline + H2O → anilinium ion + OH– will be a larger positive quantity than that for the reaction Cyclohexylamine + H2O → cyclohexylaminium ion + OH– (See figure below) Aniline, as a result, is the weaker base. Another important effect in explaining the lower basicity of aromatic amines is the electronwithdrawing effect of a phenyl group. Because the carbon atoms of a phenyl group are sp2 hybridized, they are more electronegative (and therefore more electron withdrawing) than the sp3-hybridized carbon atoms of alkyl groups.
Smaller resonance stabilization of anilinium ion
Diethylaminium bromide
→ (CH 3CH 2 ) 3 N H I − (CH3CH2)3 N + HIH O
Structures corresponding to 3 – 5 are not possible for the anilinium ion, and, consequently, although resonance does stabilize the anilinium ion considerably, resonance does not stabilize the anilinium ion to as great an extent as it does aniline itself. This greater stabilization of the reactant (aniline) when compare to that of the product (anilinium ion) means that ∆Hº for the reaction
:NH2 (1)
+
⋅⋅
NH3
NH3
Ethylaminium chloride (an aminium salt)
→ (CH 3CH 2 ) 2 N H 2Br − (CH3CH2) NH + HBrH O
+
+
+
⋅⋅
CH3CH2 NH2 + HCl H → CH 3CH 2 N H 3Cl − O
+
(CH3)4 N OH– + HCl → (CH3)4 N Cl– + H2O Basicity of Aromatic Heterocyclic Amines In aqueous solution, aromatic heterocyclic amines such as pyridine, pyrimidine, and pyrrole are much weaker bases than nonaromatic amines or ammonia. In the gas phase, however, pyridine and pyrrole are more basic than ammonia, indicating that solvation has a very important effect on their relative basicities; N
∆Hº2
+ H 2O
∆Hº2 > ∆Hº1
N
N
N
H
Pyridine pKa = 5.23
Pyrimidine pKa = 2.70
Pyrrole pKa = 0.40
N Quinoline pKa = 4.5
(Conjugate acid pKa)
Aminium Salts and Quaternary Ammonium Salts XtraEdge for IIT-JEE
28
NOVEMBER 2011
KEY CONCEPT
Inorganic Chemistry Fundamentals
NITROGEN FAMILY
Reaction of HNO3 on Metals. (a) Metals lying below hydrogen in the electrochemical series : Metals such as Na, K, Ca, Mg, Al, Zn, etc., lying below hydrogen in the electrochemical series normally displace hydrogen from dilute acids. Nitric acid also primarily behaves in the same manner. But, since it is a strong oxidising agent and hydrogen is a reducing agent, secondary reactions take place resulting in the reduction of nitric acid to give NO, N2O, N2 or NH3, depending upon the nature of the metal, the temperature and the concentration of the acid. Thus, dilute nitric acid reacts with zinc in the cold giving N2O or N2 according to the following eq.: 4Zn + 10HNO3 → 4Zn(NO3)2 + N2O + 5H2O 5Zn + 12HNO3 → 5Zn(NO3)2 + N2 + 6H2O Very dilute nitric acid gives NH3 which, of course, is neutralised by nitric acid to form NH4NO3. 4Zn + 10HNO3 → 4Zn(NO3)2 + 3H2O + NH4NO3 Similarly, iron and tin also give NH4NO3 with dilute nitric acid. Lead gives nitric oxide with dilute nitric acid in cold. Magnesium and manganese give hydrogen. Concentrated nitric acid essentially behaves as an oxidising agent and metals like aluminium, iron, chromium, etc., are rendered 'passive' probably due to surface oxidation. (b) Metals lying above hydrogen in the electrochemical series. : Metals such as Cu, Bi, Hg, Ag, lying above hydrogen in the electrochemical series, do not liberate hydrogen from acids. In case of these metals, the action of nitric acid involves only the oxidation of the metals into the metallic oxides which dissolve in the acid to form nitrates accompained by evolution of NO or NO2 according as the acid is dilute or concentrated. For instance, concentrated acid attacks copper giving NO2. Cu + 4HNO3 → Cu(NO3)2 + 2H2O + 2NO2 Dilute nitric acid gives NO. 3Cu + 8HNO3 → 3Cu(NO3)2 + 4H2O + 2NO (c) Noble metals : like Au, Pt, Rh and Ir are not attacked by nitric acid. Gold and platinum, however, are atacked by aqua regia (3 parts conc. HCl and 1 part conc. HNO3) which contains free chlorine. HNO3 + 3HCl → 2H2O + 2Cl + NOCl This chlorine attacks gold and platinum forming soluble chlorides which form complexes with HCl, e.g., Au + 3Cl → AuCl3 XtraEdge for IIT-JEE
AuCl3 + HCl →
HAuCl 4 Aurochloric acid
Hydroxylamine, NH2OH : It may be regarded as derived from ammonia by the replacement of one H atom by an OH group. It is prepared by the reduction of nitrites with sulphur dioxide under carefully controlled conditions. A concentrated solution of sodium nitrite is mixed with a solution of sodium carbonate and sulphur dioxide at a temperature below 3ºC is passed till the solution becomes just acidic. The following reactions are supposed to take place : Na2CO3 + SO2 + H2O → NaHSO3 + NaHCO3 NaNO2 + 3NaHSO3 → HON(SO 3 Na ) 2 + Na2SO3 + H2O Hydroxylamine sodium sulphonate
The sulphonate can be easily hydrolysed to hydroxylamine. 2O HON(SO3Na)2 H → NH2OH Alternatively, it is prepared by the electrolytic reduction of nitric acid in 50% H2SO4 using amalgamated lead cathode. NO2 – OH + 6H+ + 6e– → NH2OH + 2H2O It is a colourless solid melting at 33ºC. It is freely soluble in water and lower alcohols. It is unstable and decomposes violently even at 20ºC. 3NH2OH → NH3 + N2 + 3H2O The aqueous solution of hydroxylamine is less basic than ammonia (Kb = 1.8 × 10–5). Thus, NH3OH+ + OH–; NH2OH(aq) + H2O Kb = 6.6 × 10–9 Like H2O2, it acts as an oxidising as well as a reducing agent depending upon circumstances. Nitrogen Trifluoride , NF3 : It is conveniently prepared by fluorinating ammonia.
4NH3 + 3F2 Cu catalyst → NF3 + 3NH4F It can also be prepared by the electrolysis of NH4F. It is a colourless gas (m.p. –207ºC; b.p. –129ºC) which is quite stable thermodynamically. The gas acts as a fluorinating agent. It thus converts Cu into CuF. 2NF3 + 2Cu → N2F4 + 2CuF As, Sb and Bi also get fluorinated by interaction with NF3. 29
NOVEMBER 2011
NF3 has a pyramidal structure with FNF angle = ~ 102º and dipole moment = 0.24 D, compared with HNH angle = ~ 107º and dipole moment = 1.48 D in case of NH3. The difference in the dipole moments of NF3 and NH3 (both of which have pyramidal structure though) is due to the fact that while the dipole moments due to N – F bonds in NF3 are in opposite direction to the direction of the dipole moment of the lone pair on N atom, the dipole moments of N – H bonds in NH3 are in the same direction as the direction of the dipole moment of the lone pair on N atom, an illustrated below. •• ••
Dinitrogen Tetrafluoride, N2F4 : N2F4 is prepared by reacting HNF2 with NaClO.
2HNF2 NaClO → N2F4 + H2O HNF2, in turn, is obtained by first fluorinating urea and then treating the fluorinated product with concentrated sulphuric acid. N2F4 exists both in the staggered and the gauche conformations : F F
F N
N
F H H F H Because of its lower dipole moment, NF3 is weaker ligand than NH3. NF3 is known to form complexes such as [NF4]+ and F3N→O. Thus,
Staggered form
KF + HNF2 temperatur low → e KF.HNF2 re Room temperatu → N2F2 + KHF2 The reaction yields both cis and trans isomers, viz.,
F N
Trisilylamine, N(SiH)3 : Trisilylamine is prepared by reacting monochlorosilane with ammonia. 2SiH3Cl + 4NH3 → N(SiH3)3 + 3NH4Cl Trisilyamine is a trigonal planar compound with N orbitals in sp2 hybrid state, unlike trimethyl or triethylamine which is pyramidal and has N orbitals in sp3 hybrid state. There is considerable π overlap between the p orbital (containing the lone pair) of N atom and the vacant dπ orbitals of Si atoms. The trigonal planar structure of N(SiH3)3 is, thus, strengthened due to pπ–dπ bonding. Since the lone pairs of electrons of N atom are engaged in pπ-dπ bonding between N and Si, they are no longer available for donation to Lewis acids. Trisilylamine, therefore, behaves as much weaker base compared to trimethylamine or triethylamine. Hence, trisilylamine does not form adducts with BH3 even at low temperature whereas trimethylamine or triethylamine does so readily. Due to the same reason, N(SiH3)3 acts as a much weaker ligand compared to N(CH3)3 and N(C2H5)3.
N
F Both the isomeric forms are gases at room temperature, cis form boiling at – 106ºC and trans form boiling at –112ºC. The cis form is thermodynamically more stable than the trans form. At above 70ºC, nearly 90% of N2F2 is present in the
cis form : trans N2F2
> 70ºC
cis N2F2 (~ 90%)
If, however, the isomeric mixture is treated with AlCl3 or the chlorides of bivalent Mn, Co, Ni and Fe, at low temperature, the major product is trans N2F2. The cis form reacts selectively with AsF5 to form [N2F]+[AsF6]– which when reacted with NaF – HF, regenerates the original compounds. The trans form does not react with AsF5. N 2 F2 + AsF6 → [N 2 F]+ [AsF6 ]− + N 2 F2 Mixture of cis and trans isomers
Formed by cis N 2 F2 only
trans
− HF [N2F]+[AsF6]– NaF → Na+[AsF6]– + N 2 F2 ( cis )
XtraEdge for IIT-JEE
Gauche Form
AsF5 + N2F4 → [N2F3]+ [AsF6]– N2F4 reacts with sulphur to give a number of fluorinated sulphur compounds such as SF4 and SF5.NF3. N2F4 easily yields, at room temperature, the free radical. NF2 which reacts readily with a number of compounds. For example, Cl2 2ClNF2 N2F4 2(.NF2)– 2NO 2ON.NF2
Dinitrogen Difluoride, N2F2 : Dinitrogen difluoride is best prepared by reacting NHF2 with KF.
F
F
(Side View)
F
10 Li + N2F4 → 4LiF + 2Li3N
discharge 2NF3 + O2 Electric → 2F3N→O low temperature
N
N
SiH4 + N2F4 → SiF4 + N2 + 2H2
High pressure
F
N
It is a colourless gas (b.p. – 73ºC; m.p. –164ºC). It is a strong fluorinating agent. Thus,
º → [NF4+] [SbF6]– NF3 + 2F2 + SbF3 200
N
F F
N
F
F
N
30
NOVEMBER 2011
UNDERSTANDING
Physical Chemistry
1.
A container whose volume is V contains an equilibrium mixture that consists of 2 mol each of PCl5, PCl3 and Cl2 (all as gases). The pressure is 3 bar and temperature is T. A certain amount of Cl2(g) is now introduced, keeping the pressure and temperature constant, until the equilibrium volume is 2V. Calculate the amount of Cl2 that was added and the value of K 0p .
2 mol − x (2) 4 mol (2 mol − x )(2) = =1 we get K ºp = (2 mol + x ) 2 mol + x 4 mol
(as K ºp = 1) or 4 – 2 (x/ mol) = 2 + (x/mol)
Sol. At equilibrium, we have
or 3(x/mol) = 2 ⇒ x/mol = 2/3 = 0.67 Therefore, the amount of Cl2 added y = 6 mol + x = 6.67 mol
PCl 3 + Cl 2
PCl 5 2 mol
2 mol
2 mol
Total amount = 6 mol 2
2.
2 p / pº (pPCl 3 / pº )(pCl 2 / p º ) 6 Thus K ºp = = (pPCl 5 / p º ) 2 p / pº 6 Substituting p = 3 bar, we get
K 0p = 1 Let x be the amount of PCl3 that combines when the amount y of chlorine is added keeping p and T constant. Thus, the amounts of PCl3, Cl2 and PCl5 become n(PCl3) = 2 mol – x n(Cl2) = y + 2 mol – x n(PCl5 = 2 mol + x Since the final volume after the addition of Cl2 is twice the initial volume, it follows that the total amount of gases in 2V is 2 × 6 mol = 12 mol. Since n(PCl3) + n(PCl5) is 4 mol, the total amount of chlorine is 8 mol. Total amount = y + 6 mol – x = 12 mol Their partial pressures are p PCl3 =
2 mol − x 2 mol − x p= × 3 bar 12 mol 12 mol
p Cl 2 =
8 mol 8 mol p= × 3 bar = 2 bar 12 mol 12 mol
p PCl5 =
2 mol + x 2 mol + x p= × 3 bar 12 mol 12 mol
Sol. The given data are :
n2 = 0.1 mol,
Tf*
Tb* = 353 K,
= 278.5 K,
p = 670 Torr,
∆fusH1,.m = 10.67 kJ mol–1 From the relative lowering of vapour pressure, we obtain the amount fraction of the solute (i.e. naphthalene). x2 =
760 Torr – 670 Torr p * −p = = 0.1185 760 Torr p*
Since x2 = n2/(n1 + n2), we get n 1 + n2 =
n2 0.1 mol = = 0.844 mol x2 0.1185
Since n2 = 0.1 mol, we get n1 = 0.844 mol – n2 = 0.844 mol – 0.1 mol = 0.744 mol Hence, the amount of benzene frozen out 0.9 mol – 0.744 mol = 0.156 mol The freezing point depression constant of benzene is
(pPCl 3 / pº )(pCl 2 / p º ) (where pº = 1 bar) (pPCl 5 / p º )
XtraEdge for IIT-JEE
n1 = 0.9 mol, p* = 760 Torr,
Substituting these in the expression K ºp =
A solution comprising 0.1 mol of naphthalene and 0.9 mol of benzene is cooled until some solid benzene freezes out. The solution is then decanted off from the solid, and warmed to 353 K, where its vapour pressure is found to be 670 Torr. The freezing and normal boiling points of benzene are 278.5 K and 353 K, respectively, and its enthalpy of fusion is 10.67 kJ mol–1. Calculate the temperature to which the solution was cooled originally and the amount of benzene that must have frozen out. Assume conditions of ideal solution.
31
NOVEMBER 2011
Kf = =
Sol. We have Tc(NO) = 177 K Tc(CCl4) = 550 K pc(NO) = 6.485 MPa pc(CCl4) = 4.56 MPa
M1RTf*2 ∆ fus H1,m (0.078 kg mol −1 )(8.314 J K −1mol −1 )(278.5 K ) 2
(i) Since
(10670 J mol −1 )
Thus,
= 4.714 K kg mol–1 Molality of the solution is m= =
b(NO) =
n2 n2 = m1 n 1M1
and
(0.1 mol) (0.744 mol) (0.078 kg mol −1 )
= 1.723 mol kg
–1
–1
b(CCl4) =
What is the solubility of AgCl in 0.20 M NH3 ? Given : Ksp(AgCl) = 1.7 × 10–10 M2 K1 = [Ag(NH3)+] / [Ag+] [NH3] = 2.33 × 103 M–1 and K2 = [Ag(NH3)2+]/[Ag(NH3)+][NH3] = 7.14 × 103 M–1
= 140827 MPa cm6mol–2 ≡ 140.827 kPa dm6 mol–2 a(CCl4) = (27) (4.56 MPa) (125.35 cm3 mol–1)2
Sol. If x be the concentration of AgCl in the solution, then [Cl–] = x From the Ksp for AgCl, we derive K sp [Cl − ]
=
= 1934538 MPa cm6 mol–2 ≡ 1934.538 KPa dm6mol–2 Hence a(NO) < a(CCl4) (iii) Since Vc = 3b therefore, Vc(NO) = 3 × (28.36 cm3 mol–1) = 85.08 cm3 mol–1 Vc(CCl4) = 3 × (125.35 cm3 mol–1) = 376.05 cm3 mol–1 Hence Vc(NO) < Vc(CCl4) (iv) NO is more ideal in behaviour at 300 K and 1.013 MPa, because its critical temperature is less than 300 K, whereas for CCl4 the corresponding critical temperature is greater than 300 K.
1.7 × 10 −10 M 2 x
If we assume that the majority of the dissolved Ag+ goes into solution as Ag(NH3)2+ then [Ag(NH3)2+] = x Since two molecules of NH3 are required for every Ag(NH3)2+ ion formed, we have [NH3] = 0.20 M – 2x Therefore, 1.7 × 10 −10 M 2 (0.20M − 2x ) 2 + 2 x [Ag ][ NH 3 ] Kinst = = + x [Ag( NH 3 ) 2 ]
5.
x2
=
6.0 × 10 −8 M 2 1.7 × 10 −10 M 2
= 3.5 × 102
which gives x = [Ag(NH3)2+] = 9.6 × 10–3 M, which is the solubility of AgCl in 0.20 M NH3 4.
∆vapH at 373 K, 101.325 kPa = 40.668 kJ mol–1 Sol. The changes in ∆rU, ∆rH and ∆rS can be calculated following the reversible paths given below.
The critical temperature and pressure for NO are 177 K and 6.485 MPa, respectively, and for CCl4 these are 550 K and 4.56 MPa, respectively. Which gas (i) has smaller value for the van der Walls constant b; (ii) has smaller value of constant a; (iii) has larger critical volume; and (iv) is most nearly ideal in behaviour at 300 K and 1.013 MPa.
XtraEdge for IIT-JEE
Calculate ∆rU, ∆rH and ∆rS for the process 1 mole H2O (1,293 K, 101.325 kPa) → 1 mol H2O (g, 523 K, 101.325 kPa) Given the following data : Cp,m (1) = 75.312 J K–1 mol–1 ; Cp,m(g) = 35.982 J K–1 mol–1
= 6.0 × 10–8 M2 From which we derive (0.20M − 2 x ) 2
550 K )(8.314 MPa cm 3 K −1mol −1 ) (8)(4.56 MPa )
= 125.35 cm3 mol–1 Hence b(NO) < b(CCl4) (ii) Since a = 27pcb2 therefore a(NO) = (27) (6.485 MPa) (28.36 cm3 mol–1)2
–1
= (4.714 K kg mol )(1.723 mol kg ) = 8.12 K
[Ag+] =
(177 K )(8.314 MPa cm 3 K –1mol −1 ) (8)(6.485 MPa )
= 28.36 cm3 mol–1
Finally – ∆Tf = Kfm
3.
pc TR a / 27 b 2 R = = therefore, b = c 8a / 27 Rb 8b Tc 8p c
Step I: 1 mole H2O(1,293 K, 101.325 kPa) → 1 mole H2O(1,373 K, 101.325 kPa)
qp = ∆rH = Cp,m(1) ∆T = (75.312 J K–1 mol–1 ) (80 K) = 6024.96 J mol–1
32
NOVEMBER 2011
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NOVEMBER 2011
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NOVEMBER 2011
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NOVEMBER 2011
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NOVEMBER 2011
∆rS = Cp,m ln
T2 T1
Modern depiction of benzene As is standard for resonance diagrams, a doubleheaded arrow is used to indicate that the two structures are not distinct entities, but merely hypothetical possibilities. Neither is an accurate representation of the actual compound, which is best represented by a hybrid (average) of these structures, which can be seen at right. A C=C bond is shorter than a C−C bond, but benzene is perfectly hexagonal—all six carbon-carbon bonds have the same length, intermediate between that of a single and that of a double bond.
373 K = (75.312 J K–1 mol–1) × 2.303 × log 293 K
= 18.184 J K–1 mol–1 ∆rU = ∆rH – p∆rV –~ ∆rH Step II: 1 mol H2O(1,373 K, 101.325 kPa) → 1 mol H2O (g, 373K, 101.325 kPa) qp = ∆vapH = 40.668 kJ mol–1 ∆rS =
40668 J mol –1 = 109.03 J K–1 mol–1 373 K
A better representation is that of the circular π bond (Armstrong's inner cycle), in which the electron density is evenly distributed through a π-bond above and below the ring. This model more correctly represents the location of electron density within the aromatic ring.
∆rU = ∆rH – p∆rV = 40668 J mol–1 – (101.325 kPa) 373 K (22.414 dm 3 mol –1 ) × 273 K
The single bonds are formed with electrons in line between the carbon nuclei—these are called σ-bonds. Double bonds consist of a σ-bond and a π-bond. The π-bonds are formed from overlap of atomic p-orbitals above and below the plane of the ring. The following diagram shows the positions of these p-orbitals:
= 40668 J mol–1 – 3 103 J mol–1 = 37565 J mol–1 Step III: 1 mol H2O(g, 373 K, 101.325 kPa) → 1 mol H2O(g, 523 K, 101.325 kPa) ∆rH = Cp,m (g) ∆T = (35.982 J K–1 mol–1) (150 K) = 5397.3 J mol–1 ∆rS = Cp,m (g) ln
Benzene electron orbitals :
T2 T1
523 K = (35.982 J K–1 mol–1) × 2.303 × log 373 K
= (35982 J K–1mol–1) × 2.303 × 0.1468 = 12.164 J K–1 mol–1
Since they are out of the plane of the atoms, these orbitals can interact with each other freely, and become delocalised. This means that instead of being tied to one atom of carbon, each electron is shared by all six in the ring. Thus, there are not enough electrons to form double bonds on all the carbon atoms, but the "extra" electrons strengthen all of the bonds on the ring equally. The resulting molecular orbital has π symmetry.
∆rU = ∆rH – R(∆T) = 5397.3 J mol–1 – (8.314 J K–1 mol–1) (150 K) = 5397.3 J mol–1 – 1247.1 J mol–1 = 4 150.2 J mol–1 Thus ∆Utotal = (6024.96 + 37565 + 4150.2) J mol–1 = 47740.16 J mol–1 ∆Htotal = (6024.96 + 40668 + 5397.3) J mol–1 = 52090.26 J mol–1 –1
Benzene orbital delocalisation : –1
∆Stotal = (18.184 + 109.03 + 12.164) J K mol = 139.378 J K–1 mol–1
XtraEdge for IIT-JEE
37
NOVEMBER 2011
Set
7
`tà{xÅtà|vtÄ V{tÄÄxÇzxá
This section is designed to give IIT JEE aspirants a thorough grinding & exposure to variety of possible twists and turns of problems in mathematics that would be very helpful in facing IIT JEE. Each and every problem is well thought of in order to strengthen the concepts and we hope that this section would prove a rich resource for practicing challenging problems and enhancing the preparation level of IIT JEE aspirants. By : Shailendra Maheshwari So lu t ion s wi l l b e p ub lished in nex t issue Joint Director Academics, Career Point, Kota 1.
Show that the lines 4x + y – 9 = 0, x – 2y + 3 = 0, 5x – y – 6 = 0 make equal intercepts on any line of gradient 2.
2.
ABC is a triangle with ∠A = 90°, AD is altitude. a acts along AB such that | a | =1/AB, b acts along 1 AC such that | b | = . Prove that a + b is a AC 1 vector along AD and | a + b | = . AD
3.
4.
n
ai
∑i
6.
Prove that area of the region bounded by the curve y = log2 (2 – x) and containing the points satisfying the inequality (x – |x|)2 + (y – |y|)2 ≤ 4 is 2 2 + π − log e e sq. units. 2 4 27
7.
r1, r2, r3 be the radii of the circles drawn on the altitudes respectively MD, ME and MF of the triangles respectively ∆MBC, ∆MCA, ∆MAB, as their diameters, where M be the circumcentre of the acute angled triangle ∆ABC. Prove that r12
b2 r22
+
c2 r32
r →1+
du
r →1−
10. Let a, b, c be real numbers such that the roots of the cubic equation x3 + ax2 + bx + c = 0 are all real. Prove that no one of these roots is greater than
(2 a 2 − 3b – a)/3.
Maths Funda 1.62 is the Golden Number, also called Phi. Golden Number property: ( + 1)/ = /1 The fraction 1/998999 contains Fibonacci numbers, i.e.: 1/998999=0.000001001002003005008013021034055 089... Radii at 0° and approximately 222.49° divide a circle in the golden ratio: B/A = /1 = ( 5 + 1)/2 = 1 + (1 / (1 + (1 / (1 + (1 / (1 + ... )))))) = ( 4 + (4! - 4))/4 = -2sin(666) ≈ Fn+1 / Fn (F = Fibonacci numbers) ≈ 1.61803 39887 49894 84820 45868 34365 63811... The 3184th Fibonacci number is an apocalypse number (Apocalpyse numbers are numbers having exactly 666 digits).
≥ 144.
XtraEdge for IIT-JEE
2
−a
i =1
Three digit numbers are formed. What is the probability that the middle digit is largest.
1 − r cos u
∫ 1 − 2r cos u + r
Prove that lim Tr ,T1, lim Tr form an A.P.
≤ 1.
5.
+
Let a be a fixed real number satisfying 0 < a < π,
x x + a3 tan +....+ an tan 2 3
|tan x| for ∀ x ∈ − π , π , prove that
a2
9.
a
x , where a1, a2, a3,...an ∈ R and n ∈ N. If |f (x)| ≤ n 2 2
Equilateral triangles are described externally on the sides BC, CA and AB of a given triangle ABC. Prove using complex numbers that their centroids form an equilateral triangle
such that Tr =
A circle passes through the origin O and cuts two lines x + y = 0 and x – y = 0 in P and Q respectively. If the straight line PQ always passes through a fixed point, find the locus of the centre of the circle. Let f (x) = a1 tan x + a2 tan
8.
38
NOVEMBER 2011
MATHEMATICAL CHALLENGES SOLUTION FOR OCTOBER ISSUE (SET # 6)
1.
Utilize the formula : If a1 + a2 + ....... + an = k (constant), then a1a2 ..... an has the greatest value k when a1 = a2 = ...... = an = , where a1, a2, ......, an n are all positive. (Using the concept of A.M. ≥ G.M.) Let E = (a – x) (b – y) (c – z) (ax + by + cz) Then abc E = (a2 – ax)(b2 – by)(c2 – cz)(ax + by + cz) Now we have (a2 – ax) + (b2 – by) + (c2 – cz) + (ax + by + cz) = a2 + b2 + c2 (constant) a2 – ax = b2 – by = c2 – cz = ax + by + cz =
4.
xg(x) < 3.
∫
x
0
x
0
where ∠AOB = θ θ = π – 2θ
⇒ θ = π/3 π 1 Hence a .b = |a|2 cos = |a|2 3 2 b .c = |b|2 cos
Let
→
and
⇒ ...(1)
So, &
135º
So,
O
⇒
(p, 0)
→
→
c = xa + yb
b .c = x a .b + y|b|2 3 2 1 2 |a| = |a| x + y|b|2 2 2
x + 2y = 3 y x=– 2 y x=– + 2y = 3 2 2 3y = 3 ⇒ y= 2 3
Hence x = – In the limiting condition the line (1) will touch the circle , Therefore p = 8, so as required |p| < 8 XtraEdge for IIT-JEE
π 3 2 3 2 = |b| = |a| & a .c = 0 6 2 2
y So a .c = x|a|2 + y a.b ⇒ x + |a|2 = 0 2 y ⇒ x=– 2
g ( x) dx ; for x > 0
32
b O
g ( x) dx use it is (2)
Let the eqn of chord be x+y= p
B C
a
xf ´(x) + f (x) = g(x) ...(1) xf ´(x) = g(x) – f (x) < 0; because f ´(x) < 0 & x > 0 So g(x) < f (x) x g(x) < x f (x); as x > 0 ...(2) d Now from (1) (xf (x)) = g(x) dx
∫
2 |a|θ = π 1 | a | − θ 2
A
a2 + b2 + c2 4
so xf (x) =
So,
2:1
(a 2 + b 2 + c 2 ) 4 ∴ the greatest value of abc E = 256 abc
2.
→
Let OC = c |a|2 = |b|2 = |c|2 AB 2 since = AC 1
So
39
→
c =
1 y =– 2 3 →
−a 3
+
2 3
→
b
NOVEMBER 2011
5.
Sum will be odd if 1 out of 4 chosen numbers is odd and others are even or 1 is even & others are odd. P(O) =
2 10 C1. 10 C 3 20
=
C4
bi − c 1+ a iz + 1 bi − c + 1 + a bi + a + (1 − c) = = iz − 1 bi − c − 1 − a − (c + 1) − (a − ib)
iz =
9.
160 323
Now as given (a + ib) (a – ib) = 1 – c2 = (1 – c) (1 + c)
160 163 = 323 323 Hence P(E) > P(O)
P(E) = 1 –
6.
Let the point be P (x, y) so, 3x + 2y + 10 = 0 since |PA – PB| is maximum hence P, A, B must be colinear x
iz + 1 = − iz + 1
...(1)
=
y 1
⇒ –x–y+6=0 from (1) & (2) x = –22 & y = 28 So, point P is (–22, 28)
....(2)
Q1
P1
Interesting Science Facts
Q2
P2
y − y1 x − x1 Line AP1 is = =r cos θ sin θ Solve it with circle. (x1 + r cos θ)2 + (y1 + r sin θ)2 = a2
x12 + y12 + 2rx1 cos θ + 2ry1 sin θ + r2 = a2 so r2 + (2x1 cos θ + 2y1 sin θ)r + x12 + y12 – a2 = 0 r1 . r2 = x12 + y12 – a2 =
(S)
2
1
(S)
2
1
since
P1A . Q1A is independent on n, hence AP1 . AQ1 = AP2 . AQ2 = ........ = APn . AQn 8.
(AB)T = (BA)T BTAT = ATBT so BTATA = ATBTA BT = ATBTA (as AAT = I) ABT = AATBTA ABT = BTA (again as AAT = I) Hence proved.
XtraEdge for IIT-JEE
(c + 1) 2 [a + ib + 1 − c]
10. Let n(n2 – 1) = (n – 1) n (n + 1) Since n is odd so (n – 1) (n + 1) is the product of two consecutive even numbers, so it is divisible by 8. Since (n – 1) n (n + 1) is the product of 3 consecutive integers so it is divisible by 3 also Hence n(n2 – 1) is divisible by 24.
Let the point A be (x1, y1) and the circle be x2 + y2 = a2
so, AP1 . AQ1 =
(a + ib) 2 [(1 + c ) + a − ib]
a + ib 1 − iz (using (1)) = . c + 1 iz + 1 iz + 1 a + ib = (Hence proved) 1 − iz c +1
4 2 1
A
(a 2 + b 2 ) 1+ c 1− c2 (c + 1) + a + ib
bi + a +
2
2 4 1 =0
7.
...(i)
40
•
The dinosaurs became extinct before the Rockies or the Alps were formed.
•
Female black widow spiders eat their males after mating.
•
When a flea jumps, the rate of acceleration is 20 times that of the space shuttle during launch.
•
The earliest wine makers lived in Egypt around 2300 BC.
•
If our Sun were just inch in diameter, the nearest star would be 445 miles away.
•
The Australian billy goat plum contains 100 times more vitamin C than an orange.
•
Astronauts cannot belch - there is no gravity to separate liquid from gas in their stomachs.
•
The air at the summit of Mount Everest, 29,029 feet is only a third as thick as the air at sea level.
•
One million, million, million, million, millionth of a second after the Big Bang the Universe was the size of a …pea.
•
DNA was first discovered in 1869 by Swiss Friedrich Mieschler.
NOVEMBER 2011
Students' Forum Expert’s Solution for Question asked by IIT-JEE Aspirants
MATHS 1.
⇒ |x + y| = 1 ⇒ locus of point (x, y) is two line segments AB and CD. Case II If |x + y| ≤ |x – y| ⇒ |x – y| = 1 ⇒ locus of point (x, y) is two line segments BD and AC. Then area bounded by the locus of (x, y) point is 2 (unit)2, (because locus is a square of side one unit).
Let S(λ) be the area included between the parabola y = x2 + 2x – 3 and the line y = λx + 1. Find the least value of S(λ).
α
β
If normals at the points P and Q of the parabola y2 = 4ax meet at the point R of the parabola. Show that the locus of centroid of the ∆ PQR is a ray. Find the equation of the ray. Sol. Let P = (at2, 2at). Then Q is 2 2 a , 2a 2 = 4a , 4a t t t 2 t 2 and R is (aT2, 2aT). where T = – t – t centroid of the ∆PQR at 2 + 4a / t 2 + aT 2 2at + 4a / t + 2aT = , 3 3 y co-ordinates of the centroid 2 4a = 2at + + 2a − t − = 0 t t Thus centrocid of the ∆PQR for any choice of P on the parabola lies on the axis of the parabola. x-coordinates of the centroid 2 a 4 2 = t 2 + 2 + t + 3 t t 3.
Sol.
Solve y = x2 + 2x – 3 & y = λx + 1. To get x2 + (2 – λ) x – 4 = 0 ⇒ α + β = λ – 2, αβ = – 4 S(λ) = S´(λ) =
∫
β
[(λx + 1) – (x2 + 2x – 3)] dx
α
∫
β
α
d [(λx + 1) – (x2 + 2x – 3)]dx dλ
β2 − α 2 α 2 (β − α )(β + α) S´(λ) = 2 ( λ − 2) = (λ − 2) 2 + 16 = 0 2 ⇒ λ=2 Area is minimum for λ = 2 32 minm Area = (find your self) 3
=
∫
β
x dx =
Find the area enclosed by the curve, max {|x + y|, |x – y|} = 1 Sol. Case I : If |x + y| ≥ |x – y| 2.
2a 2 4 2a t + 2 + 2 ≥ (4 + 2) = 4a 3 3 t Hence equation of the ray is given by y = 0, x > 4a
=
B
4. D A
C
XtraEdge for IIT-JEE
41
In a class of 20 students, the probability that exactly x students pass the examination is directly proportional to x2 (0 ≤ x ≤ 20). Find out the probability that a student selected at random has passed the examination. If a selected students has been found to pass the examination find out the probability that he/she is only student to have passed the examination. NOVEMBER 2011
Ex : event that exactly x out of 20 students pass the examination and A : event that a particular student passes the examination ⇒ P(Ex) = kx2 (k is the proportionality constant) Now, E0, E2, ....., E20 are mutually exclusive and exhaustive events. ⇒ P(E0) + P(E1) + P(E2) + ... + P(E20) = 1 ⇒ 0 + k(1)2 + k(2)2 + .... + k(20)2 = 1
Sol. Let
→ →
⇒
→ →
→ →
x ).P ( A / E x )
k x = kx . = 20 20 x =0
∑
2
→ →
∴
20
∑x
| a× b | 2
∆ =
3
63 1 20(20 + 1) = 20 × 2870 2 82
and
P(E1/A) =
P(E1 ).P(A / E1 ) P(A )
1 1 (1) 2 . 1 2870 20 = = 63 44100 82
5.
∆1 +
→
n
k =1 n
=
→
1 k −1
cos(ak + x) {cosak. cos x – sin ak . sin x}
∑
C( − λ 1 , a )
n sin a k – sin x k −1 k =1 2
∑ n
= A cos x – B sin x, where A =
∑ k =1
n
∑ k =1
B( b )
sin a k 2 k −1
cos a k 2 k −1
and
since f (x1) = f (x2) = 0
⇒ A cos x1 – B sin x1 = 0 and A cos x2 – B sin x2 = 0 A A ⇒ tan x2 = ⇒ tan x1 = B B ⇒ tan x1 = tan x2 ⇒ (x2 – x1) = mπ
→ →
1 → → | a× b | | a × b || λ1λ 2 | = 2 2
XtraEdge for IIT-JEE
1 k −1
n cos a k = cos x . k −1 k =1 2
B=
⇒ ∆1 =
∑2 k =1
E( 0)
A(a )
∑2
f (x) =
D with respect to E be a , b , – λ1. a and –λ2 b ; where λ, λ2 ∈ R+ → λλ → → 1 → Now, ∆1 = | E C × E D | = 1 2 | a × b | 2 2 D( − λ 2 , b )
∆1 {using (i) and (ii)
Let a1, a2, ......, an be real constant, x be a real variable 1 1 and f (x) = cos(a1 + x) + cos(a2 + x) + cos(a3 + x) + 2 4 1 ...... + n−1 cos(an + x). Given that f (x1) = f (x2) = 0, 2 prove that (x2 – x1) = mπ for integer m. Sol. f (x) may be written as,
∆ 2 , where ∆ is the area of the
→
∆2 +
6.
quadrilateral ABCD. Also discuss the case when the equality holds. Sol. Let the position vector of the points A, B, C and and →
∆ ≥
It is clear that equality holds if λ1 = λ2 and in this case side AB and DC will become parallel.
Let ABCD be any arbitrary plane quadrilateral in the space having E as the point of intersection of its diagonals. If ∆1 and ∆2 be the areas of triangles DEC and AEB, using vector method prove that ∆ ≥
| a × b | | λ 1λ 2 | 2
| a× b | + 2
∴
(1 + λ1λ 2 ) 2
→ →
→ →
=
1 + 2 λ1 λ 2 + λ1λ 2
1 → → | a× b | + 2
≥
x =0
2
=
(1 + λ1 )(1 + λ 2 )
| a× b | 1 + λ1 + λ 2 + λ1λ 2 2 λ + λ2 where, 1 ≥ λ1λ 2 2
x =0
20
| a× b | 2
∆ =
∆ =
20
∑ P( E
...(ii)
→ (1 + λ1 )(1 + λ 2 ) → → 1 → | A C× BD | = | a× b | 2 2
∆=
∴
1 2870
Now, P(A) =
| a× b | 2
∆2 =
also
(20)(20 + 1)(40 + 1) ⇒ k =1 6
⇒k=
→ 1 → 1 → → | E B × EA | = | a × b | 2 2
∆2 =
and
λ1λ 2 ...(i)
42
NOVEMBER 2011
MATHS
DIFFERENTIATION Mathematics Fundamentals
Differentiation and Applications of Derivatives : If y = f (x), then f ( x + h) − f ( x ) dy 1. = lim h →0 dx h
1
4.
d dx
5.
f ( x) − f (a ) dy 2. = lim x → a dx x−a x =a
d x e = ex dx
6.
d x a = ax log a dx
f ( a + h) − f ( a ) dy 3. = lim x → h h dx x =a
7.
d 1 log x = x dx
8.
d 1 logax = logae x dx
9.
d sin x = cos x dx
10.
d cos x = – sin x dx
11.
d tan x = sec2x dx
12.
d cot x = – cosec2x dx
13.
d sec x = sec x tan x dx
14.
d cosec x = – cosec x cot x dx
15.
d sin–1x = dx
16.
1 d cos–1x = – dx 1− x2
17.
1 d tan–1x = dx 1+ x2
18.
1 d cot–1x = – dx 1+ x2
19.
1 d sec–1x = dx x x2 −1
20.
1 d cosec–1x = – dx x x2 −1
If u = f (x), v = φ(x), then d (k) = 0 1. dx d du 2. (ku) = k dx dx d du dv (u ± v) = ± 3. dx dx dx d dv du 4. (uv) = u +v dx dx dx du dv v −u du u dx dx 5. = 2 dx v v dy dx dy = dt dt dx dy d 7. If y = f[φ(x)], then = f´[φ(x)]. [φ(x)] dx dx dy dw 8. If w = f (y), then = f ´(y) dx dx dy dy dx 9. If y = f (x), z = φ(x), then = . dz dx dz 1 dy dx dy 10. . = 1 or = dx dy dx dx / dy
6. If x = f (t), y = φ (t), then
d (k) = 0 dx d n 2. x = nxn–1 dx n d 1 = – n+1 3. dx x n x
1.
XtraEdge for IIT-JEE
43
x =
2 x
1 1− x2
NOVEMBER 2011
1. If y = f (x), then
Suitable substitutions : The functions any also be reduced to simplar forms by the substitutions as follows.
1. If the function involve the term
(a 2 − x 2 ) , then
d2y
put x = a sin θ or x = a cos θ. 2. If the function involve the term
dx n
(a 2 + x 2 ) , then
2.
put x = a tan θ or x = a cot θ. 3. If the function involve the term
( x 2 − a 2 ) , then
3.
put x = a sec θ or x = a cosec θ. 4. If the function involve the term
a−x , then put a+x
4.
All the above substitutions are also true, if a = 1
5.
Differentiation by taking logarithm :
Differentiation of the functions of the following types are obtained by taking logarithm.
6.
1. When the functions consists of the product and quotient of a number of functions.
7.
2. When a function of x is raised to a power which is itself a function of x.
8.
φ(x)
For example, let y = [f (x)]
Taking logarithm of both sides, log y = φ(x) log f (x)
dx n dn dx n
= y2 = f´´(x), .....
= yn = f n(x) (ax + b)n = n ! an (ax + b)m = m(m – 1)
dn dx n dn dx n dn dx n
emx = mnemx amx = mnamx (log a)n log(ax + b) =
(−1) n −1 a n (n − 1) ! (ax + b) n
dn
nπ sin (ax + b) = an sin ax + b + 2 dx n
dn dx n
nπ cos (ax + b) = an cos ax + b + 2
Leibnitz's theorem : If u and v are any two functions of x such that their desired differential coefficients exist, then the nth differential coefficient of uv is given by
Differentiating both sides w.r.t 'x', f ´(x) 1 dy = φ´(x) log f (x) + φ(x). y dx f ( x)
Dn(uv) = (Dnu)v + nC1(Dn–1u)(Dv)
= [f (x)]φ(x) log f(x).φ´(x) + φ(x) . [f (x)φ(x) – 1.f´(x)
+ nC2(Dn–2u)(D2v) +...... + u(Dnv)
dy = Differential of y treading f (x) as constant dx + Differential of y treating φ(x) as constant.
It is an important formula.
Ability
Differentiation of implicit functions :
1. If f(x, y) = 0 is a implicit function, then ∂f / ∂x dy =– dx ∂f / ∂y
•
We can accomplish almost anything win tin our ability if we but think we can.
•
He is the best sailor who can steer within fewest points of the wind, and exact a motive power out of the greatest obstacles.
•
Our work is the presentation of our capabilities.
•
The wind and the waves are always on the side of the ablest navigator.
Diff . of f w.r.t. x keeping y constant Diff. of f w.r.t. y keeping x constant
For example, consider f (x, y) = x2 + 3xy + y2 = 0, then ∂f / ∂x 2x + 3y dy =– =– dx ∂f / ∂y 3x + 2 y XtraEdge for IIT-JEE
dn
dx 2
.... (m – n + 1) an(ax + b)m–n
x = a cos θ or x = a cos 2θ
=–
d2y
dy = y1 = f´(x), dx
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MATHS
STRAIGHT LINE & CIRCLE Mathematics Fundamentals
Different standard form of the equation of a straight line : General form : Ax + By + C = 0 where A, B, C are any real numbers not all zero. Gradient (Tangent) form : y = mx + c It is the equation of a straight line which cuts off an intercept c on y-axis and makes an angle with the positive direction (anticlockwise) of x-axis such that tan θ = m. The number m is called slope or the gradient of this line. Intercept form : y x + =1 a b It is the equation of straight line which cuts off intercepts a and b on the axis of x and y respectively. Normal form (Perpendicular form) :
b1c 2 − b2 c1 a 2 c1 − a1c 2 , a1b2 − a 2 b1 a1b2 − a 2 b1
Angle between two lines :
The angle θ between two lines whose slopes are m1 and m2 is given by tan θ =
If θ is angle between two lines then π – θ is also the angle between them. The equation of any straight line parallel to a given line ax + by + c = 0 is ax + by + k = 0. The equation of any straight line perpendicular to a given line, ax + by + c = 0 is bx – ay + k = 0. The equation of any straight line passing through the point of intersection of two given lines l1 ≡ a1x + b1y + c1 = 0 and l2 ≡ a2x + b2y + c2 = 0 is l1 + λl 2 = 0
x cos α + y sin α = p It is the equation of a straight line on which the length of the perpendicular from the origin is p and α is the angle which , this perpendicular makes with the positive direction of x-axis. One point form : y – y1 = m(x – x1) It is the equation of a straight line passing through a given point (x1, y1) and having slope m. Parametric equation :
where λ is any real number, which can be determined by given additional condition in the question. The length of perpendicular from a given point (x1, y1) to a given line ax + by + c = 0 is ax1 + by1 + c (a 2 + b 2 )
Equation of Bisectors : The equations of the bisectors of the angles between the lines a1x + b1y + c1 = 0 and a2x + b2y + c2 = 0 are a1 x + b1 y + c1 a12
y 2 − y1 (x – x1) x 2 − x1
+ b12
=±
a 2 x + b2 y + c 2 a 22 + b22
Distance between parallel lines : Choose a convenient point on any of the lines (put x = 0 and find the value of y or put y = 0 and find the value of x). Now the perpendicular distance from this point on the other line will give the required distance between the given parallel lines. Pair of straight lines : The equation ax2 + 2hxy + by2 = 0 represents a pair of straight lines passing through the origin.
It is the equation of a straight line passing through y − y1 two given points (x1, y1) and (x2, y2), where 2 x 2 − x1 is its slope. Point of intersection of two lines a1x + b1y + c1 = 0 and a2x + b2y + c2 = 0 is given by XtraEdge for IIT-JEE
= p (say)
In particular, the length of perpendicular from origin c (0, 0) to the line ax + by + c = 0 is 2 a + b2
y − y1 x − x1 = =r cos θ sin θ It is the equation of a straight line passes through a given point A(x1, y1) and makes an angle θ with x-axis. Two points form :
y – y1 =
m1 − m2 1 + m1m2
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Let the lines represented by ax2 + 2hxy + by2 = 0 be y – m1x = 0 and y – m2x = 0, then 2h a m1 + m2 = – and m1m2 = b b General equation of second degree in x, y is ax2 + 2hxy + by2 + 2gx + 2fy + c = 0 ...(i) This equation represents two straight lines, if ∆ = abc + 2fgh – af2 – bg2 – ch2 = 0 a or h g
h b f
If C1, C2 are the centres and a1, a2 are the radii of two circles, then (i) The circles touch each other externally, if C1C2 = a1 + a2 (ii) The circles touch each other internally, if C1C2 = |a1 – a2| (iii) The circles intersects at two points, if |a1 – a2| < C1C2 < a1 + a2 (iv) The circles neither intersect nor touch each other, if C1C2 > a1 + a2 or C1C2 < |a1 – a2| Equation of any circle through the point of intersection of two given circles S1 = 0 and S2 = 0 is given by S1 + λS2 = 0 (λ ≠ –1) and λ can be determined by an additional condition. Equation of the tangent to the given circle x2 + y2 + 2gx + 2fy + c = 0 at any point (x1, y1) on it, is xx1 + yy1 + g(x + x1) + f (y + y1) + c = 0 The straight line y = mx + c touches the circle x2 + y2 = a2, if c2 = a2(1 + m2) and the point of contact of the m ma ± a tangent y = mx ± a 1 + m 2 , is , 1 + m2 1 + m2
g f =0 c
and point of intersection of these lines is given by hf − bg hg − af , ab − h 2 ab − h 2 The angle between the two straight lines represented by (i) is given by 2 h 2 − ab a+b If ax2 + 2hxy + by2 + 2gx + 2f y + c = 0 represents a pair of parallel straight lines, then the distance between them is given by tan θ = ±
2
Length of tangent drawn from the point (x1, y1) to the
g 2 − ac f 2 − bc or 2 a ( a + b) b ( a + b)
circle S = 0 is 2
S1 = x1 + y1 + 2gx1 + 2f y1 + c The equation of pair of tangents drawn from point (x1, y1) to the circle S = 0 i.e. x2 + y2 + 2gx + 2f y + c = 0, is SS1 = T2, where T ≡ xx1 + yy1 + g(x + x1) + f (y + y1) + c and S1 as
Circle: Different forms of the equations of a circle : Centre radius form : the equation of a circle whose centre is the point (h, k) and radius 'a' is (x – h)2 + (y – k)2 = a2 General equation of a circle : It is given by x2 + y2 + 2gx + 2f y + c = 0 ...(i) Equation (i) can also be written as
|x – (– g)|2 + |y – (–f )|2 = | g 2 + f
2
mentioned above.
Chord with a given Middle point :
the equation of the chord of the circle S = 0 whose mid-point is (x1, y1) is given by T = S1, where T and S1 as defined a above.
− c |2
If θ be the angle at which two circles of radii r1 and r2 intersect, then
which is in centre-radius form, so by comparing, we get the coordinates of centre (– g, – f ) and radius is g2 + f
2
−c .
cos θ =
Parametric Equations of a Circle : The parametric equations of a circle (x – h)2 + (y – k)2 = a2 are x = h + a cos θ and y = k + a sin θ, where θ is a parameter. Lengths of intercepts on the coordinate axes made by
the circle (i) are 2 g 2 − c and 2
f
2
y − y2 x − x2
XtraEdge for IIT-JEE
r12 + r22 − d 2 2r1 r2
where d is distance between their centres. Note: Two circles are said to be intersect orthogonally if the angle between their tangents at their point of intersection is a right angle i.e.
r12 + r22 = d2 or
−c
2g1g2 + 2f1 f2 = c1 + c2
Equation of the circle on the line joining the points A(x1, y1) and B(x2, y2) as diameter is given by y − y1 x − x1
S1 , where
2
Radical axis : The equation of the radical axis of the two circle is S1 – S2 = 0 i.e.
= 1
2x(g1 – g2) + 2y(f1 – f2) + c1 – c2 = 0
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NOVEMBER 2011
Based on New Pattern
IIT-JEE 2012 XtraEdge Test Series # 7
Time : 3 Hours Syllabus : Physics : Full Syllabus, Chemistry : Full Syllabus, Mathematics : Full syllabus
Instructions : Section – I :
Question 1 to 10 are multiple choice questions with only one correct answer. +3 marks will be awarded for correct answer and -1 mark for wrong answer.
Section – II :
Question 11 to 15 are multiple choice question with multiple correct answer. +4 marks will be awarded for correct answer and -1 mark for wrong answer.
Section – III : Question 16 to 21 are passage based single correct type questions. +3 marks will be awarded for correct answer and -1 mark for wrong answer Section – IV : Question 22 to 23 are Column Matching type questions. +8 marks will be awarded for the complete correctly matched answer (i.e. +2 marks for each correct row) and No Negative marks for wrong answer.
(A) a = d (B) a > d (C) a < d (D) all the above are possible depending on θ
PHYSICS Questions 1 to 10 are multiple choice questions. Each question has four choices (A), (B), (C) and (D), out of which ONLY ONE is correct. Mark your response in OMR sheet against the question number of that question. + 3 marks will be given for each correct answer and – 1 mark for each wrong answer. 1. Given are four arrangements of three fixed electric charges. In each arrangement, a point labeled P is also identified a test charge, +q, is placed at point P. All of the charges are the same magnitude Q. But they can be either +ve or –ve as shown. The charges and point P all lie on a straight line. The distance between adjacent items, either between two charges or between a charge and point P are all the same (I) P (II) P P (III) P (IV) Correct order of choices in a decreasing order of magnitude force on P is (A) II > I > III > IV (B) I > II > III > IV (C) II > I > IV > III (D) III > IV > I > II 2.
3.
4.
The moment of inertia of a hollow thick spherical shell of mass M and its inner radius R1 and outer radius R2 about diameter is : (A)
2 M ( R25 − R15 )
(C)
4 M ( R25 − R15 )
5( R23 − R13 ) 5( R23 − R13 )
(B)
2 M ( R25 − R15 )
(D)
4 M ( R25 − R15 ) 3( R23 − R13 )
A cyclic process ABCA is shown in a V-T diagram. The corresponding PV diagram will be V B C A
P
A segment of angle θ is cut from a half disc, symmetrically as shown. If the centre of mass of the remaining part is at a distance 'a' from O and the centre of mass of the original half disc was at distance d then it can be definitely said that :
3( R23 − R13 )
A
(A)
(C)
C B
P
B
T P
B
(B)
C
V P
C A
A
(D) V
V
B A
C V
θ O
XtraEdge for IIT-JEE
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NOVEMBER 2011
5.
(A) 1 and 3 (C) 1 and 2
A rectangular metal plate of dimension (a × b) having two holes of radii r1 and r2 (r1 > r2) and their positions are shown in the figure, now the plate is heated such that its temperature rises by ∆T. Then separation between the holes :
Questions 11 to 15 are multiple choice questions. Each question has four choices (A), (B), (C) and (D), out of which MULTIPLE (ONE OR MORE) is correct. Mark your response in OMR sheet against the question number of that question. + 4 marks will be given for each correct answer and – 1 mark for each wrong answer. 11. Consider a hypothetical binding energy per nucleon curve. Which of the following fission or fusion may occur ? (BE)n (MeV/n)
d
a
(A) decreases (C) remain constant 6.
(B) increases (D) can not say
Assuming all surface to be smooth minimum value of horizontal acceleration 'a' so that sphere losses contact at P is –
Q α
P α
7.
10 8 6 4 2
a
(A) g sinα (B) g tanα (C) g cotα
50 100 150 200
(D) g cosecα
A uniform rod of mass M and length L lies flat on a frictionless horizontal surface. Two forces F and 2F are applied along the length of the rod as shown. The tension in the rod at the point P is L F
(B) 2 and 3 (D) all three
(A) X250 → Y160 + Z90 (B) X220 → Y180 + Z40 (C) X40 + Y70 → Z110 (D) X40 + Y120 → Z160 12. In series R-C circuit : R
C
2F
P L/4
(A) 8.
9.
3F 4
(B) 3F
(C)
5F 4
(D)
7F 4
V = V0 sin ωt (A) current leads the applied voltage by 1 φ = tan–1 ωRC (B) current lags the applied voltage by φ < 90º (C) Vc0 < V0 , where Vc0 and V0 are the maximum
The Kα wavelength of an element with atomic number z is λz. The kα wavelength of an element with atomic number 3z is λ3z. Then (A) λz > 9λ3z (B) λz < 9λ3z (C) λz = 9λ3z (D) Depending on z, λz can be greater or smaller then (9λ3z).
values of the voltage across the capacitor and applied voltage respectively (D) applied voltage, voltage across the resistor and current are in phase.
The BE per nucleon of deutron (1H2) and helium nucleus (2He4) is 1.1 MeV and 7 MeV respectively. If two deutron react to form a single helium nucleus, then energy released is (A) 23.6 MeV (B) 4.8 MeV (C) 25.8 MeV (D) None of these
13. A sound wave of frequency 'f ' travels horizontally to the right. It is reflected from a large vertical plane surface moving to the left with speed v0. The speed of sound in the medium is v. Choose the correct statement. (A) The number of waves striking the surface per v + v0 second is f v (B) The wavelength of the reflected wave is v + v0 v−v f 0
10. In a radioactive decay, let N represent the number of residual active nuclei, D the number of daughter nuclei, and R the rate of decay at any time t. Three curves are shown in Fig. The correct ones are – R N
D
N t (1)
XtraEdge for IIT-JEE
t (2)
t (3)
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NOVEMBER 2011
(C) The frequency of the reflected wave is v + v0 v−v f 0
This section contains 3 paragraphs; each has 2 multiple choice questions. (Questions 16 to 21) Each question has 4 choices (A), (B), (C) and (D) out of which ONLY ONE is correct. Mark your response in OMR sheet against the question number of that question. +3 marks will be given for each correct answer and – 1 mark for each wrong answer.
(D) The number of beats heard by a stationary listener to the left of the reflecting surface is v0 v−v f 0
Passage # 1 (Ques. 16 - 17) Consider an electron moving in a circular orbit of radius 'r' in an external uniform and steady magnetic field B. Assume that Bohr's quantization principle regarding the angular momentum is true in this case. Now answer the following question :
14. Illustrated below is a uniform cubical block of mass M and side a. Mark the correct statement(s) p
A
D
a
16. If radius of nth orbit is rn and speed in this orbit is vn then correct relationship between them (B) rn ∝ vn2 (A) rn ∝ vn (C) rn2 ∝ vn (D) rn ∝ 1/vn
M
17. If total energy of e– in moving these orbit is sum of KE and potential energy of interaction between the magnetic moment of orbital current and magnetic field B. Then total energy in nth orbit is (e = charge of electron, m = mass of e–, h = plank's constant) nheB nheB (A) En = (B) En = 2πm 4πm
B C (A) The moment of inertia about axis A, passing 1 through the centre of mass is IA = Ma2 6 (B) The moment of inertia about axis B, which 5 Ma2 bisect one of the cube faces is IB = 12 (C) The moment of inertia about axis C, along one 2 of the cube edges is IC = Ma2 3 (D) The moment of inertia about axis D, which bisects one of the horizontal cube faces is 7 Ma2 12
(C) En = zero
m
m
(A) the angular speed ω of the block in its circular motion is
g/r
(B) kinetic energy as function of r is given by mgr/2 (C) angular momentum about the hole is conserved even if hanging block is pulled down (D) The block on table is in equillibrium XtraEdge for IIT-JEE
2nheB πm
Passage # 2 (Ques. 18 - 19) When the strain is small (say < 0.01), the stress is proportional to the strain. This is the region where Hook's law is valid and where young's modulus is defined. The point a on the curve represents the proportional limit up to which stress and strain are proportional. If the strain is increased a little bit, the stress is not proportional to the strain. However, the wire still remains elastic. This means, if the stretching force is removed, the wire acquires its natural length. This behaviour is shown up to a point b on the curve known as the elastic limit on the yield point. If the wire is stretched beyond the elastic limit, the strain increases much more rapidly. If the stretching force is removed, the wire does not come back to its natural length. Some permanent increase in length takes places. In figure, we have shown this behaviour by the dashed line from C. The behaviour of the wire is now plastic. If the deformation is increased further, the wire breaks at a point d known as fracture point. If large deformation takes place between the elastic limit and the fracture point, the material is called ductile. If it breaks soon after the elastic limit is crossed, it is called brittle.
15. In the figure the block on the smooth table is set into motion in a circular orbit of radius r round the centre hole. The hanging mass is identical to the mass on the table and remains in equilibrium, neglect friction. The string connecting the two blocks is massless and intextensible. Select the correct answer. r
(D) En =
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stress
P Q R S T
d
a b
a = proportional limit b = Elastic limit d = fracture point
II I
P Q R S T P Q R S T P Q R S T P Q R S T Mark your response in OMR sheet against the question number of that question in section-II. + 8 marks will be given for complete correct answer (i.e. +2 marks for each correct row) and No Negative marks for wrong answer. A B C D
c III plastic behaviour
Elastic behaviour
strain o 0.3 Permanent set 18. A metal wire will retain its original shape when load is removed in region. (A) oc (B) cd (C) ac (D) od
22.
19. Yield point and elastic limit point coincide for (A) ductile material (B) malleable material (C) brittle material (D) elastic material
(A)
Passage # 3 (Ques. 20 - 21) A uniform dense solid cylinder of mass m and radius R is released from rest on an inclined plane. After releasing from rest it starts performing pure rolling (i.e. rolling without slipping). As there is no slipping the friction force acts is static in nature. Therefore the relative velocity between the points in contact is zero. We know that rolling is combined rotation and translation. During its downward journey along the incline the cylinder moves distance l along the incline. The angle of inclination from horizontal is α and the coefficient of friction is given as µ. The acceleration due to gravity is g downwards. Air resistance α is not present.
v
(B)
(B)
(P)
(1)
m2
m1 < m2, 0 < e <1
(Q)
v
(C)
(1)
2nd body is massive wall
m1
2
(2)
t
(R)
(2)
putty
ball
v1
v2
t v
(D)
(1)
(S)
(2) t
m1 = m2 v 1 > v2
e=1 m2
m1
(T) m1 > m2
Match the Column : Column -I (A)The charge q is projected perpendicular to the electric field. Then it moves through the magnetic field
e=1
23.
21. (The final angular speed of cylinder is
4 gl sin α 3 R2
Column-II m1
Column -I v (2) (1)
t
20. The acceleration of centre of mass of cylinder is(A) g sin α – µg cos α (B) g sin α 2g sin α (D) none of these (C) 3
(A)
Assume that 2 bodies collide head on. The graph of their velocities with time are shown in column-I match them with appropriate situation in column II
2 gl sin α 3 R2
E
1 gl sin α (D) none of these 3 R2 This section contains 2 questions (Questions 22, 23). Each question contains statements given in two columns which have to be matched. Statements (A, B, C, D) in Column I have to be matched with statements (P, Q, R, S, T) in Column II. The answers to these questions have to be appropriately bubbled as illustrated in the following example. If the correct matches are A-P, A-S, A-T; B-Q, B-R; C-P, C-Q and D-S, D-T then the correctly bubbled 4 × 5 matrix should be as follows :
Column-II (P)
B
(C)
XtraEdge for IIT-JEE
q
(B) The charge is released from rest r r in a crossed B and E q
(Q)
B E
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NOVEMBER 2011
The charge is projected perpendicular to E in a crossed r r E and E
3.
(R)
E B
Which of the following graphs are properly represented ?
(A)
q
Rate
(C)
For normal reaction Temperature
(D) The charge is projected at a nonzero angle θ(< 90º) with the magnetic induction v
(B)
Rate
(S) For explosive reaction
B
Temperature
(T)
(C)
Rate
q
CHEMISTRY (D)
45ºC
4.
A hydrogen electrode is placed in a buffer solution of sodium acetate and acetic acid in the ratio a : b and other in the ratio b : a was taken. If electrode potential values are found to be E1 and E2 then which of the following is/are correct for the pKa value of the acid. E − E2 E + E2 (B) – 1 (A) 1 0.118 0.118 E − E1 E (C) 1 × 0.118 (D) 2 0.118 E2
5.
Identify the incorrect statement – (A) In solid state N2O5 exist as NO2+ and NO3–ions (B) Solid PCl5 contains PCl4+ and PCl6– ions (C) Solid PBr5 has PBr4+ and Br– (D) In N4S4 all the bond angles are equal
6.
A bulb of constant volume is attached to a manometer tube open at other end as shown in figure. The manometer is filled with a liquid of density (1/3rd) that of mercury. Initially h was 228 cm.
NH2 Cl (A) 2, 3 diamino-4-chloro-2-pentenoic acid (B) 4-chloro-3, 3-diamino-2-pentenoic acid (C) 3, 3–diamino-3-chloro-pentenoic acid (D) All of the above Identify the correct statements CH3
(A) The compound
fails to undergo COOH O
decarboxylation (B) A Grignard reagent can be successfully made Br
from the following dibromide
Br
(C) Cyclopentan –1, 3– dione exists almost 100% in the enol form whereas diacetyl (CH3COCOCH3) can exist in the keto form as well as the enol form (D) Among the following resonance structure given below, (ii) will be the major contributor to the resonance hybrid. Θ .. (i)
C–CH3 ↔ O
XtraEdge for IIT-JEE
Gas
C–CH3
h
Through a small hole in the bulb gas leaked dp = – kP. assuming pressure decreases as dt
–
(ii)
For explosive reaction Temperature
NH2 – C ==== C ––– C – H is –
H3C
Rate
Temperature
Questions 1 to 10 are multiple choice questions. Each question has four choices (A), (B), (C) and (D), out of which ONLY ONE is correct. Mark your response in OMR sheet against the question number of that question. + 3 marks will be given for each correct answer and – 1 mark for each wrong answer. 1. The IUPAC name of compound CH3 HO – C = O
2.
For all normal reaction
:O .. :
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If value of h is 114 cm after 14 minutes. What is the value of k (in hour–1) ? [Use : ln(4/3) = 0.28 and density of Hg = 13.6 g/mL] (A) 0.6 (B) 1.2 (C) 2.4 (D) None of these 7.
8.
9.
12. In the purification Zr and B, which of the following is/are true ? passed over
(A) Zr + 2I2 → ZrI4(g) the white → hot W the pure Zr is deposited on W passed over
white → (B) 2B + 3I2 → 2BI3(g) the hot W
The dipole moment of HCl is 1.03D, if H–Cl bond distance is 1.26Å, what is the percentage of ionic character in the H–Cl bond ? (A) 60% (B) 29% (C) 17% (D) 39%
the pure B is deposited on W mixed with W
then → (C) Zr + 2I2 → ZrI4 (s) & heated
Arrange NH4+, H2O, H3O+, HF & OH– in increasing order of acidic nature (A) OH– < H2O < NH4+ < HF < H3O+ (B) H3O+ > HF > H2O > NH4+ > OH– (C) NH4+ < HF < H3O+ < H2O < OH– (D) H3O+ < NH4+ < HF < OH– < H2O
(D) none of these
13. Which of the following statements is correct ? (A) At 273ºC, the volume of a given mass of a gas at 0ºC and 1 atm. pressure will be twice its volume (B) At –136.5ºC, the volume of a given mass of a gas at 0ºC and 1 atm. pressure will be half of its volume (C) The mass ratio of equal volumes of NH3 and H2S under similar conditions of temperature and pressure is 1 : 2 (D) The molar ratio of equal masses of CH4 and SO2 is 4 : 1
A compression of an ideal gas is represented by curve AB, which of the following is wrong B(vB)
log P A(vA)
14. Dopamine of a drug used in the treatment of parkinson's disease. NH2 CH2–CH HO COOH HO Dopamin
log V
VA times VB (B) number of moles in this process is constant (C) it is isothermal process (D) it is possible for ideal gas
(A) number of collision increases
Which of the following statements about this compound are correct ? (A) It can exist in optically active forms. (B) One mole will react with three moles of sodium hydroxide to form a salt (C) It can exist as a Zwitter ion in the aqueous solution (D) It gives nitroso compound on treatment with HNO2. 15. In the given table types of H bonds and some H bond energies are given and other H bond energies are not given. You are to perdit the unknown Hbond energies. Types of H-bonds H-bond energies in KJ/mol …….. (I) F – H O – …….. F 30 F–H …….. O – (II) O – H …….. F 15 O–H …….. – F – (III) F – H …….. N – (IV) N – H Correct prediction are – (A) H-bond energy for (I) may be 20 kJ/mol (B) H-bond energy for (II) may be 25 kJ/mol (C) H-bond energy for (III) may be 113 kJ/mol (D) H-bond energy for (IV) may be 12 kJ/mol
10. A compound containing only sodium, nitrogen and oxygen has 33.33% by weight of sodium. What is the possible oxidation number of nitrogen in the compound? (A) –3 (B) + 3 (C) –2 (D) + 5 Questions 11 to 15 are multiple choice questions. Each question has four choices (A), (B), (C) and (D), out of which MULTIPLE (ONE OR MORE) is correct. Mark your response in OMR sheet against the question number of that question. + 4 marks will be given for each correct answer and – 1 mark for each wrong answer. 11. Which of the following is/are correct regarding the periodic classification of elements ? (A) The properties of elements are the periodic function of their atomic number (B) Non metals are lesser in number than metals (C) The first ionization energies of elements in a period do not increase with the increase in atomic numbers (D) For transition elements the d-subshells are filled with electrons monotonically with the increase in atomic number XtraEdge for IIT-JEE
ZrI4 is reduced to ZrI2
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If at a temperature T1 equilibrium constant be K1 and at temperature T2 equilibrium constant be K2 then, the above equation reduces to : ∆S° – ∆H° + ........(4) ⇒ log K1 = 2.3R 2.3RT1
This section contains 3 paragraphs; each has 2 multiple choice questions. (Questions 16 to 21) Each question has 4 choices (A), (B), (C) and (D) out of which ONLY ONE is correct. Mark your response in OMR sheet against the question number of that question. +3 marks will be given for each correct answer and – 1 mark for each wrong answer. Passage # 1 (Ques. 16 - 17) Freezing point of a liquid is defined as that temperature at which it is in equilibrium with its solid phase.
∆S° – ∆H° + ........ (5) 2.3R 2.3RT2 Subtracting (4) from (5) we get. ∆H° 1 1 K – ⇒ log 2 = K1 2.3R T1 T2
⇒ log K2 =
P = 1 atm solvent Vapour Pressure
Solid
18. If standard heat of dissociation of PCl5 is 230 Cal. 1 is then the slope of the graph of log K vs T (A) + 50 (B) – 50
T0 > T solution
∆Tf T
(C) 10
T0
Temperature Phase diagram for a pure solvent and solution for depression in freezing point. 16. The freezing point of the solvent is ∆H – ∆G ∆H (B) (A) T∆S ∆S ∆G ∆S (C) (D) ∆S ∆H
19. For exothermic reaction of ∆So < 0 then the sketch 1 may be of log K vs T log K log K (A) (B) 1/T
1/T
log K
log K
(C)
17. Freezing point of the solution is smaller than the freezing point of the solvent. Because (A) ∆H of solution and ∆H of solvent are almost same due to identical intermolecular forces (B) ∆S of the solution is larger than ∆S of solvent (C) ∆S of the solution is smaller than the ∆S of solvent (D) ∆H of the solution is much higher than the ∆H of solvent but ∆S of solution is smaller than that of the solvent
(D) 1/T
1/T
Passage # 3 (Ques. 20 - 21) A pleasant smelling optically active compound, monoester 'F' has molecular weight 186. It doesn't react with Br2 in CCl4. Hydrolysis of 'F' gives two optically active compounds 'G', which is soluble in NaOH and 'H'. H gives a positive iodoform test, but on warming with conc. H2SO4 gives I with no disastereomers. When the Ag+ salt of 'G' is reacted with Br2, racemic 'J' is formed. Optically active J is formed when 'H' is treated with tosyl chloride (TsCl), and then with NaBr.
Passage # 2 (Ques. 18 - 19) Effect of temperature on the equilibrium process is analysed by using the thermodynamics. From the thermodynamics relation ∆G° = – 2.3 RT logK........(1) ∆G° = Standard free energy change ∆G° =∆H° – T∆S°….(2) ∆H° = Standard heat of the reaction From (1) & (2) – 2.3 RT log K = ∆H° – T∆S° ; ∆S° : Standard Entropy change, ∆H° ∆S° + ........(3) log K = 2.3RT 2.3R Clearly if a plot of log K vs 1/T is made then it is a straight line having slope ∆S° – ∆H ° = . & y–intercept = 2.3R 2.3R XtraEdge for IIT-JEE
(D) None of these
20. The pleasant smelling optically active compound, F is O || (A) (CH3)2CH– CHC – O– CH – CH(CH3)2 | | CH 3 CH 3 O || (B) (CH3)3C–CH2 C –O– CH – CH(CH3)2 | CH 3
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NOVEMBER 2011
O || (C) CH3CH2CH2 CH – C –O– CH – CH2CH2CH3 | | CH 3 CH 3 O || (D) CH3CH2 CH – CH2– COCH 2 – CHCH 2 –CH3 | | CH 3 CH 3
Match the Column : Column -I (A) Two electron three centre bond (B) Four electron three centre bond (C) sp3 hybrid orbitals (D) Inorganic graphite
23.
21. How would be the structure of F if I exists as diastereomers ? O || (A) (CH3)2CH CHCOCHCH (CH 3 ) 2 | | CH 3 CH 3 O || (B) (CH3)3CCH2 C O CHCH (CH 3 ) 2 | CH 3 O || (C) CH3CH2CH2 CHCOCHCH 2 CH 2 CH 3 | | CH 3 CH 3 O || (D) CH3CH2 CHCH 2 C OCH2CHCH 2 CH 3 | | CH 3 CH3
(Q)
B2H6
(R) (S) (T)
AlCl3 B4H10 HF
MATHEMATICS Questions 1 to 10 are multiple choice questions. Each question has four choices (A), (B), (C) and (D), out of which ONLY ONE is correct. Mark your response in OMR sheet against the question number of that question. + 3 marks will be given for each correct answer and – 1 mark for each wrong answer. 1. The differential equation of all ellipse centred at the origin is (A) y2 + xy12 – yy1 = 0 (B) xyy2 + xy12 – yy1 = 0 (C) yy2 + xy12 – xy1 = 0 (D) none of these 2.
This section contains 2 questions (Questions 22, 23). Each question contains statements given in two columns which have to be matched. Statements (A, B, C, D) in Column I have to be matched with statements (P, Q, R, S, T) in Column II. The answers to these questions have to be appropriately bubbled as illustrated in the following example. If the correct matches are A-P, A-S, A-T; B-Q, B-R; C-P, C-Q and D-S, D-T then the correctly bubbled 4 × 5 matrix should be as follows: P Q R S T
The value of x for which the matrix 2 0 7 A = 0 1 0 is inverse of 1 − 2 1 7x − x 14 x 1 0 is B= 0 x − 4 x − 2 x 1 1 1 (A) (B) (C) 3 2 4
P Q R S T P Q R S T P Q R S T P Q R S T Mark your response in OMR sheet against the question number of that question in section-II. + 8 marks will be given for complete correct answer (i.e. +2 marks for each correct row) and No Negative marks for wrong answer. 22. Match the Column : Column-I Column-II (A) 5.4 g of Al (P) 0.5 NA electrons (B) 1.2 g of Mg2+ (Q) 15.9994 amu (C) Exact atomic weight (R) 0.2 mole atoms of mixture of oxygen isotopes (D) 0.9 mL of H2O (S) 0.05 moles (T) 3.1 × 1023 electrons A B C D
XtraEdge for IIT-JEE
Column-II (P) (BN)x
(D)
1 5
3.
If x = (7 + 4 3 )2n = [x] + f , then x(1– f ) if equal to (A) 1 (B) 2 (C) 3 (D) 4
4.
The number of values of x ∈[0, nπ], n ∈ I that satisfy log|sinx|(1 + cos x) = 2 is (A) 0 (B) n (C) 2n (D) none
5.
Reflection of the line a z + az = 0 in the real axis is z a (A) a z + az = 0 (B) = a z (C) (a + a ) (z + z ) = 0 (D) None of these
6.
The tangent to the curve x = a cos 2θ cos θ,
y = a cos 2θ sin θ at the point corresponding to θ = π/6 is (A) parallel to the x-axis (B) parallel to the y-axis (C) parallel to line y = x (D) none of these 54
NOVEMBER 2011
7.
8.
The exponent of 7 in 100C50 is (A) 0 (B) 2 (C) 4 (D) none of these | x | for 0 <| x |≤ 2 Let f (x) = , then at x = 0, f has 1 for x = 0 (A) a local maximum (B) no local maximum (C) a local minimum (D) no extremum
9.
If f (x) is a polynomial satisfying f (x).f (1/x) = f (x) + f (1/x), and f (3) = 28, then f (4) is given by (A) 63 (B) 65 (C) 67 (D) 68
10.
The integer n for which lim
is a finite nonzero number is (A) 1 (B) 2 (C) 3
xn
∫ cot
n
∫ sin
n
x dx,
∫ cos
n
x dx ,
∫ tan
n
x dx,
x dx and other integrals of these form using
integration by parts. In turn these reduction formulas can be used to compute x etc. 1 16. If sin 5 x dx = – sin4 x cos x + A sin2 x cos x 5 8 cos x + C then A is equal to – 15 (A) – 2/15 (B) – 3/5 (C) – 4/15 (D) – 1/15 1 17. If tan 6 x dx = tan5 x + A tan3 x + tan x – x + C 5 then A is equal to (A) 1/3 (B) 2/3 (C) – 2/3 (D) – 1/3
∫
11. If f (x) = 1 − 1 − x 2 , then (A) f is continuous on [–1, 1] (B) f is continuous at x = 0 (C) f is not differentiable at x = 0 (D) f is differentiable everywhere
∫
12. The line y = mx + c intersects the circle x2 + y2 = r2 at two real distinct points if
Passage # 2 (Ques. 18 - 19) Using differentiability and continuity of a function f which satisfies certain functional equation, we can determine in some cases the function explicity. E.g.
(A) – r 1 + m 2 < c ≤ 0 (B) 0 ≤ c < r 1 + m 2 (D) r < c 1 + m 2
13. Let α, β be the roots of x2 – 4x + A = 0 and γ, δ be the roots of x2 – 36x + B = 0. If α, β, γ, δ forms an increasing G.P., then (A) B = 81 A (B) A = 3 (C) B = 243 (D) A + B = 251
If f satisfies f (x + y) = f (x) f (y) for all x, y ∈ R and
f (x) ≠ 0 for any x ∈ R and f ′(0) = 1 then f (x) = ex.
14. Given an isosceles triangle with equal sides of length b, base angle α < π/4, R, r the radii and O, I the centres of the circumcircle and incircle, respectively. Then 1 (A) R = b cosec α (B) ∆ = 2b2 sin 2α 2 b cos(3α / 2) b sin 2α (C) r = (D) OI = 2 sin α cos(α / 2) 2(1 + cos α)
XtraEdge for IIT-JEE
0
the form
(D) 4
Questions 11 to 15 are multiple choice questions. Each question has four choices (A), (B), (C) and (D), out of which MULTIPLE (ONE OR MORE) is correct. Mark your response in OMR sheet against the question number of that question. + 4 marks will be given for each correct answer and – 1 mark for each wrong answer.
(C) – c 1 − m 2 < r
∫
This section contains 3 paragraphs; each has 2 multiple choice questions. (Questions 16 to 21) Each question has 4 choices (A), (B), (C) and (D) out of which ONLY ONE is correct. Mark your response in OMR sheet against the question number of that question. +3 marks will be given for each correct answer and – 1 mark for each wrong answer. Passage # 1 (Ques. 16 - 17) We can derive reduction formulas for the integral of
(cos x − 1)(cos x − e x )
x →0
α
A dx = + B (a ≠ 0). Then 1 − cos α cos x sin α possible values of A and B are π π π (A) A = , B = 0 (B) A = , B = 4 sin α 2 4 π π π (D) A = π, B = (C) A = , B = 6 sin α sin α
15. If
x + y 2 + f ( x) + f ( y ) 18. If a function f satisfy f = 3 3 for real x and y and f ′ (2) = 3, then f (x) is equal to 1 (A) – x3 + x2 (B) 24 log (3x + 2) 12 3 (C) 3x + 2 (D) x2 + 2 4
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19. If f is a differentiable function on R and f ′(0) = 2 f ( x) + f ( y ) satisfying f (x + y) = then f (π/8) is 1 − f ( x) f ( y ) equal to (A) 1/2 (B) 1 (C) 3/2 (D) tan π/8 Passage # 3 (Ques. 20 - 21) Let k be the length of any edge of a regular tetrahedron. (A tetrahedron whose edges are all equal in length is called a regular tetrahedron.) The angle between a line and a plane is equal to the complement of the angle between the line and the normal to the plane whereas the angle between two planes is equal to the angle between the normals. Let O be the origin of reference and A, B and C vertices with position vectors a, b and c respectively of the regular tetrahedron. 20. The angle between any edge and a face not containing the edge is (A) cos–1(1/2) (B) cos–1 (1/4)
(C) cos–1 (1/ 3 )
(C) If chord x + y + 1= 0 of parabola y2 = ax subtends 90º at (0, 0) then a = →
^
^
^
→ →
(D) If a = i + j + k , a . b = 1 →
→
^
^
(R) –3
(S) 1
→
and a × b = j – k , then | b | is equal to
(T) 2
23. A is a set containing n elements. A subset P of A is chosen at random. The set A is reconstructed by replacing the elements of the subset P. A subset Q of A is again chosen at random. The probability that (where |x| = number of elements in X) Column-I Column-II (A) P ∩ Q = φ (P) n(3n–1)/4n (B) P ∩ Q is a singleton (Q) (3/4)n (C) P ∩ Q contains 2 (R) 2nCn/4n elements (D) |P| = |Q| (S) 9n(n–1)/2(4n) (T) None
(D) π/3 2
21. The value of [a b c] is (A) k2 (B) (1/2)k2 (C) (1/3)k2
(D) k3
COMPLEMENTARY COLOURS
This section contains 2 questions (Questions 22, 23). Each question contains statements given in two columns which have to be matched. Statements (A, B, C, D) in Column I have to be matched with statements (P, Q, R, S, T) in Column II. The answers to these questions have to be appropriately bubbled as illustrated in the following example. If the correct matches are A-P, A-S, A-T; B-Q, B-R; C-P, C-Q and D-S, D-T then the correctly bubbled 4 × 5 matrix should be as follows:
If you arrange some colours in a circle, you get a "colour wheel". The diagram shows one possible version of this. An internet search will throw up many different versions!
P Q R S T A B C D
P P P P
Q Q Q Q
R R R R
S S S S
T T T T
Mark your response in OMR sheet against the question number of that question in section-II. + 8 marks will be given for complete correct answer (i.e. +2 marks for each correct row) and No Negative marks for wrong answer. 22. Match the followingColumn -I x–2 y –3 z –4 = = 1 1 λ x –1 y – 4 z − 5 z – 5 = = and λ 2 1 1 intersect at (α, β, γ) then λ =
Column -II
(A) If the lines
(P) 0
π x +1 (B) If lim 4 x – tan –1 = x →∞ 4 x + 2 y2 + 4y + 5 then y =
(Q) –1
XtraEdge for IIT-JEE
Colours directly opposite each other on the colour wheel are said to be complementary colours. Blue and yellow are complementary colours; red and cyan are complementary; and so are green and magenta. Mixing together two complementary colours of light will give you white light. What this all means is that if a particular colour is absorbed from white light, what your eye detects by mixing up all the other wavelengths of light is its complementary colour. Copper(II) sulphate solution is pale blue (cyan) because it absorbs light in the red region of the spectrum. Cyan is the complementary colour of red. The origin of colour in complex ions Transition metal v other metal complex ions 56
NOVEMBER 2011
Based on New Pattern
IIT-JEE 2013 XtraEdge Test Series # 7
Time : 3 Hours Syllabus : Syllabus : Physics : Full Syllabus, Chemistry : Full Syllabus, Mathematics : Full syllabus
Instructions : Section – I :
Question 1 to 10 are multiple choice questions with only one correct answer. +3 marks will be awarded for correct answer and -1 mark for wrong answer.
Section – II :
Question 11 to 15 are multiple choice question with multiple correct answer. +4 marks will be awarded for correct answer and -1 mark for wrong answer.
Section – III : Question 16 to 21 are passage based single correct type questions. +3 marks will be awarded for correct answer and -1 mark for wrong answer Section – IV : Question 22 to 23 are Column Matching type questions. +8 marks will be awarded for the complete correctly matched answer (i.e. +2 marks for each correct row) and No Negative marks for wrong answer. k
PHYSICS Questions 1 to 10 are multiple choice questions. Each question has four choices (A), (B), (C) and (D), out of which ONLY ONE is correct. Mark your response in OMR sheet against the question number of that question. + 3 marks will be given for each correct answer and – 1 mark for each wrong answer. 1.
When sound wave is refracted from air to water, which of the following will remain unchanged ? (A) wave number (B) wavelength (C) wave velocity (D) frequency
2.
In stationary wave – (A) All the particles of the medium vibrate in phase (B) All the nodes vibrate in phase (C) All the antinodes vibrate in phase (D) All the particles between consecutive nodes vibrate in phase
3.
A 20 N metal block is suspended by a spring balance. A beaker containing some water is placed on a weighing machine which reads 40 N. The spring balance is now lowered so that the block gets immersed in water. The spring balance now reads 16N. The reading of the weighing machine will be (A) 36 N (B) 44 N (C) 60 N (D) None
4.
The springs shown in figure is unstretched when James bond starts pulling on the cord. The mass of the block is m. If he exerts a constant force F. The amplitude of the motion of the block will be-
XtraEdge for IIT-JEE
m
k
F(const.)
Smooth
(A) 5.
F 2k
(B)
F k
(C)
2F k
(D) None
Ideal fluid flows along a flat tube of constant crosssection, located in a horizontal plane and bent as shown in figure (top view). The flow is steady. The velocities of fluid at point 1 and at point 2 are v1 and v2 respectively then correct relation is –
2 1
(A) v1 > v2 (C) v1 = v2 6.
A body is moving down a long inclined plane of inclination θ. The coefficient of friction between the body and the plane varies as µ = 0.5 x, where x is the distance moved down the plane. The body will have maximum velocity, when it has travelled a distance x given by 2 (A) x = 2 tan θ (B) x = tan θ (C) x =
57
(B) v2 > v1 (D) None of these
2 cot θ
(D) x =
2 cot θ
NOVEMBER 2011
7.
A system consists of three particles, each of mass m and located at (1, 1), (2, 2) and (3, 3). The coordinates of the centre of mass are (A) (1, 1) (B) (2, 2) (C) (3, 3) (D) (6, 6)
8.
A thin wire of length l and mass m is bent in the form of a semicircle. Its moment of inertia about an axis joining its free ends will be –
(A) It is not possible. (B) Speed of the rain relative to the ground is 2 m/s (C) Speed of the man when he finds rain to be falling at angle 45º with the vertical, is 4 m/s (D) the man has travelled a distance 16 m on the road by the time he again finds rain to be falling at angle 45º 12. All the blocks shown in the figure are at rest. The pulley is smooth and string is light. Coefficient of friction at all the contacts is 0.2. A frictional force of 10N acts between A and B. The block A is about to slide on block B. The normal reaction and frictional force exerted by the ground on the block B is A 5kg B C
m O
(A) ml2 (C) 9.
ml2 π
2
P (B) zero
(D)
ml2 2π 2
What is the velocity v of a metallic ball of radius r falling in a tank of liquid at the instant when its acceleration is one half that of a freely falling body? (The densities of metal and of liquid are ρ and σ respectively and the viscosity coefficient of the liquid is η) (A)
r2g (ρ – 2σ) 9η
(B)
r2g (2ρ – σ) 9η
(C)
r2g (ρ – σ) 9η
(D)
2r 2 g (ρ – σ) 9η
(A) The normal reaction exerted by the the block B is 110 N. (B) The normal reaction exerted by the the block B is 50 N. (C) The frictional force exerted by the the block B is 20 N (D) The frictional force exerted by the the block B is zero.
ground on ground on ground on
13. The value of mass m for which the 100 kg block remain is static equilibrium is –
10. An anisotropic material has coefficient of linear thermal expansion α1 and α2 along x and y respectively. Coefficient of superficial expansion of its material will be equal to – (A) α1 + α2 (B) α1 + 2α2 α + α2 (C) 3α1 + 2α2 (D) 1 2
100
µ = 0.3
37º
(A) 35 kg (C) 83 kg
(B) 37 kg (D) 85 kg
14. A particle is describing circular motion in a horizontal plane in contact with the smooth inside surface of a fixed right circular cone with its axis vertical and vertex down. The height of the plane of motion above the vertex is h and the semi vertical angle of the cone is α. The period of revolution of the particle –
Questions 11 to 15 are multiple choice questions. Each question has four choices (A), (B), (C) and (D), out of which MULTIPLE (ONE OR MORE) is correct. Mark your response in OMR sheet against the question number of that question. + 4 marks will be given for each correct answer and – 1 mark for each wrong answer. 11. A man is standing on a road and observes that the rain is falling at angle 45º with the vertical. The man starts running on the road with constant acceleration 0.5 m/s2. After a certain time from the start of the motion, it appears to him that the rain is still falling at angle 45º with the vertical, with speed
α
h
(A) increases as h increases (B) decreases as h increases (C) increases as α increases (D) decreases as α increases
2 2 m/s. Motion of the man is in the same vertical plane in which the rain is falling. Then which of the following statement(s) are true XtraEdge for IIT-JEE
ground on
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NOVEMBER 2011
15. A wire of density 9 × 103 kg / m3 is stretched between two clamps 1 m apart and is stretched to an extension of 4.9 × 10–4 metre. Young's modulus of material is 9 × 1010 N/m2 then (A) The lowest frequency of standing wave is 35 Hz (B) The frequency of 1st overtone is 70 Hz (C) The frequency of 1st overtone is 105 Hz (D) The stress in the wire is 4.41 × 107 N/m2
π (C) (0.05) sin × cos (10π) t 2
(D) (0.04) sin (π) × sin (10π) t Passage # 3 (Ques. 20 - 21) Transverse and longitudinal standing waves are easily represented by sine waves. The distance between an adjacent node and antinode (N – A) is a λ quarter of the wavelength, . 4 A N N N A λ/4 λ/4 λ Fundamental and first overtone for a pipe closed at one end L L
This section contains 3 paragraphs; each has 2 multiple choice questions. (Questions 16 to 21) Each question has 4 choices (A), (B), (C) and (D) out of which ONLY ONE is correct. Mark your response in OMR sheet against the question number of that question. +3 marks will be given for each correct answer and – 1 mark for each wrong answer. Passage # 1 (Ques. 16 - 17) In the figure shown a uniform solid sphere is released on the top of a fixed inclined plane of inclination 37º and height ‘h’. It rolls without sliding (take sin 37º = 3/5)
A
N
A
N
37º
16. The acceleration of the centre of the sphere is 3g 4g 4g 3g (A) (B) (C) (D) 5 5 7 7 17. The speed of the point of contact of the sphere with the inclined plane when the sphere reaches the bottom of the incline is -
(A)
2 gh
(C) Zero
(B)
N
λ =L 4
λ L = 4 3
Therefore λ0 = 4L
L Therefore, λ1= 4 3
and ν0 =
V 4L
overtones are multiplies of ν0 :
10 gh 7
A λ/4 L/3
λ/4
& v1=
V v =3 4 L 4L 3
for the first overtone n = 3, the third
v nµ0 = n harmonic. 4L This implies that the ratio of natural frequency is n = 1 : 3 : 5.........
(D) 2 2 gh
Passage # 2 (Ques. 18 - 19) In a standing wave experiment, a 1.2 kg horizontal rope is fixed in place at its two ends (x = 0 and x = 2.0 m) and made to oscillate up and down in the fundamental mode at frequency 5.0 Hz. At t = 0, the point at x = 1.0 m has zero displacement and is moving upward in the positive direction of y axis with a transverse velocity 3.14 m/s 18. Speed of the participating travelling wave on the rope is (A) 6 m/s (B) 15 m/s (C) 20 m/s (D) 24 m/s
20. When an organ pipe is open at both ends, it resonates with a fundamental frequency of 240 Hz. What is the fundamental frequency of the same pipe if it is closed at one end(A) 64 Hz (B) 120 Hz (C) 360 Hz (D) 480Hz 21. A pipe resonates at 60 Hz, 100 Hz and 140 Hz consecutive frequencies. How long is the pipe ? (A) 1.4 m (B) 2.8 m (C) 4.3 m (D) 8.5 m
19. What is the correct expression of the standing wave equation π (A) (0.1) sin × sin (10π) t 2
(B) (0.1) sin (π) × sin (10π) t XtraEdge for IIT-JEE
59
NOVEMBER 2011
This section contains 2 questions (Questions 22, 23). Each question contains statements given in two columns which have to be matched. Statements (A, B, C, D) in Column I have to be matched with statements (P, Q, R, S, T) in Column II. The answers to these questions have to be appropriately bubbled as illustrated in the following example. If the correct matches are A-P, A-S, A-T; B-Q, B-R; C-P, C-Q and D-S, D-T then the correctly bubbled 4 × 5 matrix should be as follows : P Q R S T A B C D
P P P P
Q Q Q Q
R R R R
S S S S
Column I (A) The velocity of block A (B) The velocity of block B
(C) The kinetic energy of system of two blocks (D) The potential energy of spring
T T T T
(B) (C) (D)
23.
Questions 1 to 10 are multiple choice questions. Each question has four choices (A), (B), (C) and (D), out of which ONLY ONE is correct. Mark your response in OMR sheet against the question number of that question. + 3 marks will be given for each correct answer and – 1 mark for each wrong answer.
Let V and E denote the gravitational potential and gravitational field respectively at a point due to certain uniform mass distribution described in four different situation of column – I, then (A)
Column -I At centre of thin spherical shell
At centre of solid sphere At the centre of a thick hemi spherical shell At centre of line joining two point masses of equal magnitude
(P)
Column -II E=0
(Q)
E≠0
(R)
V≠0
(S)
V=0
(T)
None
Two blocks A and B of mass m and 2m respectively are connected by a massless spring of spring constant K. This system lies over a smooth horizontal surface. At t = 0 the block A has velocity u towards right as shown while the speed of block B is zero, and the length of spring is equal to its natural length at that instant. In each situation of column-I, certain statements are given and corresponding results are given in column-II, Match the statements in column-I to the corresponding results in column-II : K B A m 2m u smooth horizontal surface
XtraEdge for IIT-JEE
(Q) may be zero at certain instants of time (R) is minimum at maximum compression of spring (S) is maximum at maximum extension of spring (T) None
CHEMISTRY
Mark your response in OMR sheet against the question number of that question in section-II. + 8 marks will be given for complete correct answer (i.e. +2 marks for each correct row) and No Negative marks for wrong answer. 22.
Column II (P) Can never be zero
1.
At constant pressure P, A dissociates on heating according to the equation A(g) B(g) + C(g) The equilibrium partial pressure of A at T K is 1/9 P, the equilibrium Kp at TK is 8 64 16 (A) P (B) P (C) P (D) 9 P 9 9 9
2.
Calculate the pH of 6.66 × 10–3 M solution of Al(OH)3. Its first dissociation is 100% where as second dissociation is 50% and third dissociation is negligible. (A) 2 (B) 12 (C) 11 (D) 13
3.
pH of the blood in the body is maintained by buffer solution of (A) glucose and salt concentration (B) protein and salt concentration (C) CO33– and HCO3– (D) Salt and carbonate ion
4.
IUPAC name of the following compound is : OH CH3 (A) 2-methyl-3-cyclohexenol (B) 3-methyl-1-cyclohexen-4-ol (C) 4-hydroxy-3-methyl-1-cyclohexene (D) 2-hydroxy-1-methylcyclohexene
60
NOVEMBER 2011
5.
Which will form geometrical isomers ? Cl (A)
12. KCl has a dipole moment of 10 D. The inter ionic distance in KCl is 2.6 Å. Which of the following statement are true for this compound ? (A) The theoretical value of dipole moment, if the compound were completely ionic is 12.5 D. (B) The % ionic character of the compound is 85 % (C) It is a poor conductor of electricity (D) The forces operating in this molecule are coulombic type
(B) CH3CH = NOH Cl
(C) 6.
7.
8.
9.
(D) All
The dissolution of Al(OH)3 by a solution of NaOH results in the formation of (A) [Al(H2O)4(OH)2]+ (B) [Al(H2O)3(OH)3] (C) [Al(H2O)2(OH)4]– (D) [Al(H2O)6](OH)3
13. The major product of reaction Br
→ 2 is –
Helium-oxygen mixture is used by deep sea divers in preference to nitrogen-oxygen mixture because (A) helium is much less soluble in blood than nitrogen (B) nitrogen is highly soluble in water (C) helium is insoluble in water (D) nitrogen is less soluble in blood than helium
Br
(D) Cr2O7 + 6I + 14H
+
Br
Br Br
Br
(C)
Which of the following reactions is a redox reaction? (A) Cr2O3 + 6HCl → 2CrCl3 + 3H2O (B) CrO3 + 2NaOH → Na2CrO4 + H2O Cr2O72– + OH– (C) 2CrO42– + H+ –
(B)
(A)
SF4 + BF3 → (A). The compound 'A' is (A) [SF5]–[BF2]+ (B)[SF3]+[BF4]– (D) S2F4 (C) SF6
2–
Br
(D) None of these
Br
+ KOH (alc) —→
14.
3+
2Cr + 3I2 + 7H2O
Br
Which of the following can be formed.
10. The combustion reaction occurring in an automobile is 2C8H18(s) + 5O2(g) → 16CO2(g) + 18H2O(1). This reaction is accompanied with (A) ∆H = –ve, ∆S = + ve, ∆G = + ve (B) ∆H = + ve, ∆S = –ve, ∆G = + ve (C) ∆H = – ve, ∆S = +ve, ∆G = – ve (D) ∆Η = +ve, ∆S = +ve, ∆G = – ve
Br
(A)
(B)
(C) Br
15.
Questions 11 to 15 are multiple choice questions. Each question has four choices (A), (B), (C) and (D), out of which MULTIPLE (ONE OR MORE) is correct. Mark your response in OMR sheet against the question number of that question. + 4 marks will be given for each correct answer and – 1 mark for each wrong answer. 11. Which of the following species are correctly matched with their geometries according to the VSEPR theory (A) ClF2– → linear (B) IF4+ → see – saw (C) SnCl5– → trigonal bipyramidal
(D) Br
Br
Reduction of But-2-yne with Na and liquid NH3 gives an alkene which upon catalytic hydrogenation with D2 / Pt gives an alkane. The alkene and alkane formed respectively are (A) cis-but-2-ene and recemic-2, 3-dideuterobutane (B) trans-but-2-ene and meso-2, 3-dideuterobutane (C) trans-but-2-ene and recemic-2, 3-dideuterobutane (D) cis-but-2-ene and meso-2, 3-dideuterobutane
••
(D) N(SiH 3 ) 3 → pyramidal XtraEdge for IIT-JEE
61
NOVEMBER 2011
This section contains 3 paragraphs; each has 2 multiple choice questions. (Questions 16 to 21) Each question has 4 choices (A), (B), (C) and (D) out of which ONLY ONE is correct. Mark your response in OMR sheet against the question number of that question. +3 marks will be given for each correct answer and – 1 mark for each wrong answer.
19. For the above reaction in equilibrium, helium gas was added but the mixture was allowed to expand to keep the pressure constant. Then (A) More of ammonia will be formed (B) Ammonia will dissociate back into N2 and H2 (C) There will be no effect on equilibrium (D) Equilibrium constant of the reaction will change
Passage # 1 (Ques. 16 - 17) In order to explain the existance of doublets in the spectra of alkali metals, Goudsmit and Uhlenbeck in 1925 proposed that electron has an intrinsic angular momentum due to spining about its own axis. The value of spining a angular momentum of electron can be described by 2 spin quantum number s and ms. The physical significance of s and ms is similar as of l and ml.
Passage # 3 (Ques. 20 - 21) Lithium only forms monoxide when heated in oxygen. Sodium forms monoxide and peroxide in excess of oxygen. Other alkali metals form super oxide with oxygen i.e., MO2. The abnormal behaviour of lithium is due to small size. The larger size of nearer alkali metals also decides the role in formation of superoxides. The three ions related to each other as follows : O 2−
16. The possible value of s for electron is (A) 1/2 (B) – 1/2 (C) 0 (D) 1
Oxide ion
2 O→
2O −2 Superoxide ion
20. Consider the following reaction : M + O2 → MO 2 (M = alkali metal) (super oxide)
Select the correct statement : (A) M can not be Li and Na (B) M can not be Cs and Rb (C) M can not be Li and Rb (D) None of these
s(s + 1) cos θ = ms
3h = ms 4π (D) None of these
(C)
21. Lithium does not form stable peroxide because : (A) of its small size (B) d-orbital are absent in it (C) it is highly reactive and form superoxide in place of peroxide (D) covalent nature of peroxide
Passage # 2 (Ques. 18 - 19) The expression for the reaction quotient, Q, is similar to that for equilibrium constant K. The value of Q for the given composition of a reaction mixture helps us to know whether the reaction will move forward or backward or remain in equilibrium. It also helps to predict the effect of pressure on the direction of the gaseous reaction. In certain reactions, addition of inert gas also favours either the formation of reactants or products. The value of equilibrium constant of a reaction changes with change of temperature and the change is given by van't Hoff equation, d ln Kp/dT = ∆Hº/RT2 where enthalpy change, ∆Hº, is taken as constant in the small temperature range.
This section contains 2 questions (Questions 22, 23). Each question contains statements given in two columns which have to be matched. Statements (A, B, C, D) in Column I have to be matched with statements (P, Q, R, S, T) in Column II. The answers to these questions have to be appropriately bubbled as illustrated in the following example. If the correct matches are A-P, A-S, A-T; B-Q, B-R; C-P, C-Q and D-S, D-T then the correctly bubbled 4 × 5 matrix should be as follows : P Q R S T A B C D
18. The reaction N2(g) + 3H2(g) 2NH3(g) is in equilibrium. Now the reaction mixture is compressed to half the volume (A) More of ammonia will be formed (B) Ammonia will dissociate back into N2 and H2 (C) There will be no effect on equilibrium (D)Equilibrium constant of the reaction will change XtraEdge for IIT-JEE
O 22− Peroxide ion
All the three ions abstract proton from water.
17. Relation between s and ms is : h (A) s(s + 1) . cos θ = ms 2π
(B)
/ 2 O2 1 →
P P P P
Q Q Q Q
R R R R
S S S S
T T T T
Mark your response in OMR sheet against the question number of that question in section-II. + 8 marks will be given for complete correct answer (i.e. +2 marks for each correct row) and No Negative marks for wrong answer.
62
NOVEMBER 2011
22.
23.
Match the Column : Column –I Column II (A) pKb of X– (Ka of HX = 10–6) (P) 6.9 (Q) 8 (B) pH of 10–8 M HCl (C) pHof 10–2M acetic acid solution (R) 3.3 (Ka = 1.6 × 10–5) (D) pH of a solution obtained by (S) 3.4 mixing equal volumes of solution with pH 3 & 5. (t) Match the Column : Column I Br
(A)
4.
The positive integer n for which 2 × 22 + 3 × 23 + 4 × 24 + .... + n × 2n = 2n + 10 is (A) 510 (B) 511 (C) 512 (D) 513
5.
A vector c, directed along the internal bisector of the angle between the vectors a = 7i – 4j – 4k and b = –2i – j + 2k, with |c| = 5 6 , is -
Column II
(p) Nucleopilic substitution
OH
(r) Nucleophilic addition
NO2
1.
2.
In a certain test there are n questions. In this test 2k students gave wrong answers to at least (n – k) questions, where k = 0, 1, 2, ...... , n. If the total number of wrong answers is 4095, then value of n is (A) 11 (B) 12 (C) 13 (D) 15
If p1, p2, p3 are respectively the perpendicular from the vertices of a triangle to the opposite sides, then cos A cos B cos C + + is equal to p1 p2 p3 (B) 1/R
XtraEdge for IIT-JEE
(C) 1/∆
5 (–5i + 5j + 2k) 3
(A) 200 m
(B) 300 2 + 3 m
(C) 300 2 − 3 m
(D) 400 m
If two vertices of a triangle are (–2, 3) and (5, – 1), orthocentre lies at the origin and centroid on the line x + y = 7, then the third vertex lies at (A) (7, 4) (B) (8, 14) (C) (12, 21) (D) None
9.
If tan x + tan(x + π/3) + tan (x + 2π/3) = 3, then (B) tan 2x = 1 (A) tan x = 1 (D) none of these (C) tan 3x = 1
Questions 11 to 15 are multiple choice questions. Each question has four choices (A), (B), (C) and (D), out of which MULTIPLE (ONE OR MORE) is correct. Mark your response in OMR sheet against the question number of that question. + 4 marks will be given for each correct answer and – 1 mark for each wrong answer. 11. The coordinates of a point on the line y +1 x −1 = = z at a distance 4 14 from the −3 2 point (1, –1, 0) are (A) (9, – 13, 4)
The values of x between 0 and 2π which satisfy the
(A) 1/r
(D)
10. The number of seven digit integers, with sum of the digits equal to 10 and formed by using the digits 1, 2 and 3 only, is (A) 55 (B) 66 (C) 77 (D) 88
equation sin x 8 cos 2 x = 1 are in A.P. The common difference of the A.P. is (A) π/8 (B) π/4 (C) 3π/8 (D) 5π/8 3.
5 (i + 7j + 2k) 3
8.
MATHEMATICS Questions 1 to 10 are multiple choice questions. Each question has four choices (A), (B), (C) and (D), out of which ONLY ONE is correct. Mark your response in OMR sheet against the question number of that question. + 3 marks will be given for each correct answer and – 1 mark for each wrong answer.
(C)
A flagstaff stands in the centre of a rectangular field whose diagonal is 1200 m, and subtends angles 15º and 45º at the mid points of the sides of the field. The height of the flagstaff is -
(s) Esterification with acetic anhydride (t) Dehydrogenation
5 (5i + 5j + 2k) 3
7.
OH Br
(D)
(B)
The locus of the mid-point of the line segment joining the focus to a moving point on the parabola y2 = 4ax is another parabola with directrix (B) x = – a/2 (A) x = – a (C) x = 0 (D) x = a/2
(q) Elimination
CHO
(C)
5 (i – 7j + 2k) 3
6.
O
(B)
(A)
(D) None
(B) ( 8 14 + 1, –12 14 – 1, 4 14 63
NOVEMBER 2011
(C) (–7, 11, – 4)
Passage # 2 (Ques. 18 - 19) To solve equation or inequality involving exponential expression f(x)g(x), we may use
(D) (– 8 14 + 1, 12 14 – 1, –4 14 12. If x2 + 2hxy + y2 = 0 represents the equations of the straight lines through the origin which make an angle α with the straight line y + x = 0, then (A) sec 2α = h
(B) cos α =
18. Solution set of the inequality 3x(0.333 ....)x–3 ≤ (1/27)x is (A) [3/2, 5] (B) (– ∞, 3/2] (D) None of these (C) (0, ∞)
1+ h 2h 1+ h h
(C) 2 sin α = (D) cot α =
logarithm or the identity xy = a y loga x where a > 0, a ≠ 1.
19. Solution set of the inequality 2(25)x – 5(10x) + 2(4x) ≥ 0 is (A) (–1, ∞) (B) (0, ∞) (D) None of these (C) (2, ∞)
1+ h h −1
Passage # 3 (Ques. 20 - 21)
13. If z1, z2, z3, z4 are the vertices of a square in that order, then (A) z1 + z3 = z2 + z4 (B) |z1 – z2| = |z2 – z3| = |z3 – z4| = |z4 – z1| (C) |z1 – z3| = |z2 – z4| (D) (z1 – z3)/(z2 – z4) is purely imaginary 14.
x2 y2 + = 1, L : y = 2x 9 4 20. P is a point on the circle C, the perpendicular PL to the major axis of the ellipse E meets the ellipse at ML is equal to M, then PL (A) 1/3 (B) 2/3 (C) 1/2 (D) none of these
C : x2 + y2 = 9, E :
The equation of a tangent to the hyperbola 3x2 – y2 = 3, parallel to the line y = 2x + 4 is (A) y = 2x + 3
21. Equation of the diameter of the ellipse E conjugate to the diameter represented by L is (A) 9x + 2y = 0 (B) 2x + 9y = 0 (C) 4x + 9y = 0 (D) 4x – 9y = 0
(B) y = 2x + 1 (C) y = 2x – 1 (D) y = 2x + 2 15.
If m is a positive integer, then [( 3 + 1) 2 m ] + 1, where [x] denotes greatest integer ≤ n, is divisible by(A) 2m (B) 2m+1 m+2 (C) 2 (D) 22m
This section contains 2 questions (Questions 22, 23). Each question contains statements given in two columns which have to be matched. Statements (A, B, C, D) in Column I have to be matched with statements (P, Q, R, S, T) in Column II. The answers to these questions have to be appropriately bubbled as illustrated in the following example. If the correct matches are A-P, A-S, A-T; B-Q, B-R; C-P, C-Q and D-S, D-T then the correctly bubbled 4 × 5 matrix should be as follows :
This section contains 3 paragraphs; each has 2 multiple choice questions. (Questions 16 to 21) Each question has 4 choices (A), (B), (C) and (D) out of which ONLY ONE is correct. Mark your response in OMR sheet against the question number of that question. +3 marks will be given for each correct answer and – 1 mark for each wrong answer.
P Q R S T A B C D
Passage # 1 (Ques. 16 - 17) f (x) = sin {cot–1 (x + 1)} – cos (tan–1 x) a = cos tan–1 sin cot–1 x b = cos (2 cos–1 x + sin–1 x) 16. The value of x for which f (x) = 0 is (A) –1/2 (B) 0 (C) 1/2 (D) 1
Q Q Q Q
R R R R
S S S S
T T T T
Mark your response in OMR sheet against the question number of that question in section-II. + 8 marks will be given for complete correct answer (i.e. +2 marks for each correct row) and No Negative marks for wrong answer.
17. If a2 = 26/51, then b2 is equal to (A) 1/25 (B) 24/25 (C) 25/26 (D) 50/51 XtraEdge for IIT-JEE
P P P P
64
NOVEMBER 2011
22. Match the following Column- I (A) If a, b, c are unequal positive numbers and b is A.M. of a and c then the roots of ax2 + 2bx + c = 0 are
Column- II (P) of opposite signs
(B) If a ∈ R, then the roots of the equation x2 – (a +1) x – a2 – 4 = 0 are (C) If a, b, c are unequal positive numbers and b is H.M. of a and c then the roots of ax2 + 2bx + c = 0 are
(Q) rational numbers
(D) If |a ± b| < c and a = 0 then the roots of a2x2 + (b2 + a2 – c2)x + b2 = 0 are 23.
Regents Physics You Should Know Nuclear Physics : •
(R) real and unequal
and have the symbol
(S) imaginary
Column-II
(A) Equation of the polar
(P) 8x + 2y – 23 = 0
of (–7, –9) with respect to the circle
The atomic number is equal to the number of protons (2 for alpha)
•
Deuterium (
x + y – 12x – 8y – 48 = 0 (Q) 13x + 13y – 30 = 0
+ 2x + 2y + 1 = 0 and
•
Only charged particles can be accelerated in a particle accelerator such as a cyclotron or Van Der Graaf generator.
•
Natural radiation is alpha ( ), beta ( and gamma (high energy x-rays)
•
A loss of a beta particle results in an increase in atomic number.
•
All nuclei weigh less than their parts. This mass defect is converted into binding energy. (E=mc2)
•
Isotopes have different neutron numbers and atomic masses but the same number of protons (atomic numbers).
•
Geiger counters, photographic plates, cloud and bubble chambers are all used to detect or observe radiation.
•
Rutherford discovered the positive nucleus using his famous gold-foil experiment.
•
Fusion requires that hydrogen be combined to make helium.
•
Fission requires that a neutron causes uranium to be split into middle size atoms and produce extra neutrons.
•
Radioactive half-lives can not be changed by heat or pressure.
•
One AMU of mass is equal to 931 meV of energy (E = mc2).
x2 + y2 + 4x + 3y + 2 = 0 (C) Equation of the
(R) 2x + y + 1 = 0
tangent at (–7, –9) to the circle x2 + y2 + 12x + 8y + 26 = 0 (D) Equation of the radical
(S) x + 5y + 52 = 0
axis of the circles 2x2 + 2y2 + 4x + 4y + 9 = 0 and x2 + y2 + 6x+3y – 7 = 0 (T) x + y – 1 = 0
XtraEdge for IIT-JEE
65
)
The number of nucleons is equal to protons + neutrons (4 for alpha)
common chord of the circles x2 + y2
) is an isotope of hydrogen
•
2
(B) Equation of the
.
•
(
(T) None
Match the Column : Column-I
2
Alpha particles are the same as helium nuclei
)
NOVEMBER 2011
XtraEdge Test Series ANSWER KEY IIT- JEE 2012 (November issue) Ques Ans Ques Ans
Column Match Ques Ans Ques Ans
Column Match
1 C 12 A,C,D Ques Ans
2 C 13 A
3 A 14 A,B,C
4 A 15 A,B,C
PHYSICS 5 B 16 A
6 B 17 A
7
8
9
10
11
D
A
A
B
A,C
18
19
20
21
D
C
C A 23 A→ R; B→ P; C→ S; D→ Q
22 A→ S; B→ R; C→ Q; D→ P
1 A 12 A,B Ques Ans
2 A 13 A,B,C,D
1 B 12 A,B Ques Ans
2 D 13 A,B,C
3 B 14 A
4 B 15 B,C
CHEMISTRY 5 D 16 B
6 B 17 B
7
8
9
10
11
C
A
A
B
A,B,D
18
19
20
21
B
B
22 A→ R; B→ P,S,T; C→ Q; D→ P,T
A C 23 A→ Q,R; B→ S; C→ Q,R; D→ P
MATHEMATICS Ques Ans Ques Ans
Column Match
3 A 14 A,C,D
4 A 15 A,B
5 A 16 C
6 A 17 D
7
8
9
10
11
A
D
B
C
A,B,C
18
19
20
21
C
B
C B 23 A→ R; B→ P; C→ S; D→ R
22 A→ P,Q; B→ Q,R; C→ Q; D→ S
IIT- JEE 2013 (November issue) Ques Ans Ques Ans
Column Match
Ques Ans Ques Ans
Column Match Ques Ans Ques Ans
Column Match
1 D 12 A,D Ques Ans
2 D 13 B,C
1 C 12 A,C,D Ques Ans
2 B 13 A
1 B 12 A,B,D Ques Ans
3 B 14 A,C
PHYSICS
4 A 15 A,B
5 B 16 D
6 A 17 C
7
8
9
10
11
B
D
A
C
C,D
18
19
20
21
C
A
B C 23 A→ P; B→ Q; C→ P,R; D→ Q,S
22 A→ P,R; B→ P,R; C→ Q,R; D→ P,R
3 C 14 A,B,C,D
4 A 15 C,D
CHEMISTRY 5 D 16 A
6 C 17 B
7
8
9
10
11
A
B
D
C
A,B,C
18
19
20
21
A
B
A A 23 A→ P,Q; B→ P,S,T; C→ R,S; D→ P
22 A→ Q; B→ P; C→ S; D→ R 2 B 13 A,B,C,D
XtraEdge for IIT-JEE
3 B 14 B,C
MATHEMATICS
4 B 15 A,B
5 A 16 A
6 C 17 B
22 A→ R; B→ P,R; C→ S; D→ R
66
7
8
9
10
11
C
D
A
C
A,C
18
19
20
21
B
D
B B 23 A→ Q; B→ R; C→ S; D→ P
NOVEMBER 2011
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