Solve Absolute Value Equations Learn absolute value equations concept. The equation |x| = 4. This means that x could be 4 or x could be -4. When you take the absolute value of 4, the solution is 4 and when you take the absolute value of -4, the solution is also 4. An absolute value problem, you have to get into account that there can be two solutions that will make the equation true. Learning absolute value equation, you set the quantity inside the absolute value symbol equal to the positive and negative value on the other side of the equal symbol. Solve Absolute Value Equations Below are the examples on how to solve absolute value equations Example 1: |x + 1| = 4 Know More About Absolute Value Inequalities Worksheet
Solution: The quantity inside the absolute value symbol can be equal to 4 or -4 x + 1 = 4 or x + 1 = - 4 Subtract 1 on both side of the given equation x + 1 - 1 = 4 - 1 or x + 1 - 1 = -4 - 1 x = 3 or x = -5 So the solution are x = 3 and x = -5 Example 2: |2x - 3| = x - 5 Solution: When solving this equation, you have to be careful when solving opposite of (x - 5) 2x - 3 = x - 5 or 2x - 3 = -(x - 5) x - 3 = -5 or 2x -3 = -x + 5 Learn More Area of Parallelogram Worksheet
x = -2 or 3x – 3 = 5 3x = 8 x= So, the solution is x = -2 and x = 83 Example 3: |x + 1| = 5 Solution: The quantity inside the absolute value symbol can be equal to 5 or -5 x + 1 = 5 or x + 1 = -5 Subtract 1 on both side of the given equation x + 1 - 1 = 5 - 1 or x + 1 - 1 = - 5 - 1 x = 4 or x = - 6 So the solution are x = 4 and x = - 6
Definition of Dependent Variable In this page we are going to discuss about concept called dependent Variable. Below you can see dependent Variable definition with example. What is a dependent variable? Dependent variable define as the variable whose value is based on the value of other variable in its equation. That is the value of dependent variable is always said to be dependent on the independent variable of math equation. For example, consider the equation y = 4x + 3. In this equation the value of the variable ‘y’ value changes according to the changes in the value of ‘x’. Therefore the variable ‘y’ is said to be as dependent variable. Some of the examples that involve dependent variables are discussed in detail as below with their solutions. Dependent Variable Examples Below you can see the solved dependent variable examples -
Example 1: Find the value of y in the following equation, y = 3x2 + 2x + 4 when the value of x is equal to 3. Solution: Given equation: y = 3x2 + 2x + 4 Now substitute the value of x as 3 in the given equation y = 3(3)2 + 2(3) + 4 Solving the equation we get, y = 3(9) + 2(3) + 4 y = 27 + 6 + 4 y = 37 Therefore the ‘y’ is said to be as dependent variable and ‘x’ is said to be as independent variable. Read More About Circle Worksheets
Example 2: Find the area for the following: a) Circle when radius ‘r’ = 3 cm. b) Rectangle when its length (l) = 6cm and its breadth (b) = 4 cm. Solution: a) Area of the circle (A) = π r2 A = π (3)2 A=πx3x3 A = 3.143 x 3 A = 9.429 sq.cm. In this area of the circle the variable ‘A’ is said to be as dependent variable and the variable ‘r’ is said to be as independent variable. b) Area of the rectangle (A) = l x b A=6x4
A = 24 sq.cm. In this area of the rectangle the variable ‘A’ is said to be as dependent variable and the variables ‘l’ and ‘b’ are said to be as independent variables. The independent variables also can be more than one in their count. Exercise: Find the value of y in the following equation, y = 2(4x2 + x) + 4 when the value of x is equal to 2. (Answer: 40) Find the area of the square when its side length is 6cm. (Answer: 36 sq. cm.)
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