OBJECTIVE 4 Simplify radicals involving variables.Simplifying radicals with
variable radicands, such as , can get a little tricky.If xrepresents a nonnegative number, thenIf xrepresents a negative number, then the oppositeof x
(which is positive).For example, but the oppositeof
This means that the square root of a squared number is always nonnegative. We can
use absolute value to express this.252 = 5 , 21 - 522 = 225 = 5 , -5.
2 x^2 =-x,2 x^2 =x.2 x^2508 CHAPTER 8 Roots and Radicals
NOTE A quick way to find the square root of a variable raised to an even power is to
divide the exponent by the index, 2. For example,and.6 , 2 = 3 10 , 2 = 52 x^6 =x^32 x^10 =x^5For any real number a, 2 a^2 |a|.2 a^2The product and quotient rules apply when variables appear under radical sym-
bols, as long as the variables represent nonnegativereal numbers. To avoid negative
radicands, we assume variables under radical symbols are nonnegative in this text.
In such cases, absolute value bars are not necessary, since, for xĂ0, |x|=x.NOW TRY
EXERCISE 7
Simplify each radical.
Assume that all variables
represent nonnegative real
numbers.
(a) (b)
(c)
B
13
t^2
, tZ 0216 y^82 x^5NOW TRY ANSWERS
- (a) (b)
(c)
213
t4 y^4 x^22 x(e) ,Quotient rule=
25
x=
25
2 x^2xZ 0
B5
x^2Simplifying Radicals Involving Variables
Simplify each radical. Assume that all variables represent nonnegative real numbers.(a) 2 x^4 =x^2 ,since 1 x^222 =x^4.EXAMPLE 7(c)
Factor; 4 is a perfect square.Product rule;Commutative property(d)Product rule=r^42 r 1 r^422 =r 8= 2 r^8 # 2 r
= 2 r^8 #r
2 r^9= 2 p^522= 2 # 22 #p^524 = 21 p^522 =p^10
= 24 # 22 # 2 p^10
= 24 # 2 #p^10
28 p^10(b)
Product rule
= 5 m^31 m^322 =m^6= 225 # 2 m^6
225 m^6NOW TRYhttp://www.ebook777.com
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