Chapter 10 QuadratiC EQuations 367Simplifying this expression is much easier than the expression containing
all of the fractions.
Sometimes we must simplify the solutions we find with the quadratic for-
mula. We begin by simplifying the square root if the number under the
radical has a perfect square as a factor. For example, 12 is not simplified
because 12 has 4, a perfect square, as a factor. We simplify 12 with the
radical properties ab = ab⋅ and aa^2 = (provided a and b are not
negative). Thus we obtain 12 = 43 ⋅⋅= 43 = 23.
Once we simplify the square root, we then see if the numerator and denom-
inator have any common factors. If so, we factor the numerator and divide
out the common factor.
EXAMPLES
Simplify the fraction.
824
2±We begin by simplifying the square root: 24 = 46 ⋅ 26 =
824
2826
2± = ±The denominator is divisible by 2 and each term in the numerator is divis-
ible by 2, so we factor a 2 from each term in the numerator. We then divide
2 from the numerator and denominator.
826
224 6
2± = ()± =± 46Simplify the fractions.
−± (^318) =−± ⋅ =−± = −± =−±
6
392
6
332
6
31 2
6
12
2
()
15 50
10
15 252
10
15 52
10
53 2
10
32
2
± = ±⋅= ± = ()± = ±
EXAMPLES
Simplify the fraction.
EXAMPLES
Simplify the fraction.