Rational Expressions Rational Expressions A "rational expression" is a polynomial fraction, and anything you could do with regular fractions you can do with rational expressions. However, since there are variables in rational expressions, there are some additional considerations. When you dealt with fractions, you knew that the fraction could have any whole numbers for the numerator and denominator, as long as you didn't try to divide by zero. When dealing with rational expressions, you will often need to evaluate the expression, and it can be useful to know which values would cause division by zero, so you can avoid these x-values. So probably the first thing you'll do with rational expressions is find their domains. When we discuss a rational expression in this chapter, we are referring to an expression whose numerator and denominator are (or can be written as) polynomials. For example, and are rational expressions. Writing a Rational Expression in Lowest Terms. To write a rational expression in lowest terms, we must first find all common factors (constants, variables, or polynomials) or the numerator and the denominator. Thus, we must factor the numerator and the denominator. Once the numerator and the denominator have been factored, cross out any common factors. Know ore About :- Polynomial
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Find the domain of 3/x :- The domain is all values that x is allowed to be. Since I can't divide by zero (division by zero isn't allowed), I need to find all values of x that would cause division by zero. The domain will then be all other x-values. When is this denominator equal to zero? When x = 0. Then the domain is "all x not equal to zero". Determine the domain of x/3 :- The domain doesn't care what is in the numerator of a rational expression. The domain is only influenced by the zeroes of the denominator. Will "3" ever equal zero? Of course not. Since the denominator will never equal zero, no matter what value x is, then there are no forbidden values for this rational expression, and x can be anything. So the domain is "all x". Give the domain of the following expression: - To find the domain, I'll ignore the "x + 2" in the numerator (since the numerator does not cause division by zero) and instead I'll look at the denominator. I'll set the denominator equal to zero, and solve. The x-values in the solution will be the xvalues which would cause division by zero. The domain will then be all other x-values. x2 + 2x – 15 = 0 (x + 5)(x – 3) = 0 x = –5, x = 3 By factoring the quadratic, I found the zeroes of the denominator. The domain will then be all other xvalues: Find the domain of the following expression :- To find the domain, I'll solve for the zeroes of the denominator: x2 + 4 = 0 X2 = –4 This has no solution, so the denominator is never zero. Then the domain is "all x".
Read More About :- Trigonometric Identities
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