Approximating Irrational Square Roots
Find a decimal approximation for each square root. Round answers to the nearest
thousandth.
(a)
Using the square root key on a calculator gives where the
symbol means “is approximately equal to.”(b) Use a calculator. (c) NOW TRYOBJECTIVE 4 Use the Pythagorean theorem.
Many applications of square roots require the use of the
Pythagorean theorem. Recall from Section 6.6 and
FIGURE 1that if cis the length of the hypotenuse of a right
triangle, and aand bare the lengths of the two legs, thenIn the next example, we use the fact that if then the positive solution of
the equation is (See page 554.)Using the Pythagorean Theorem
Find the length of the unknown side in each right triangle with sides a, b, and c,
where cis the hypotenuse.
(a)
Use the Pythagorean theorem.
Let and.
Square.
Add.
Since the length of a side of a triangle must be a positive number, find the positive
square root of 25 to get c.(b)
Use the Pythagorean theorem.
Let and.
Square.
Subtract 25.
Use a calculator to approximate the positive square root of 56.a= 256 L7.483 NOW TRYa^2 = 56a^2 + 25 = 81a 2 + 52 = 92 b= 5 c= 9a^2 +b^2 =c^2b=5, c= 9c= 225 = 525 =c^29 + 16 =c^23 2 + 42 =c^2 a= 3 b= 4a^2 +b^2 =c^2a=3, b= 4EXAMPLE 6x^2 =k 2 k.k 7 0,a^2 b^2 c^2.239 L6.245 - 2740 L -27.203
«
3.31662479L3.317,
211
EXAMPLE 5SECTION 8.1 Evaluating Roots 497Solve for .a^2CAUTION Be careful not to make the common mistake of thinking that
equals Consider the following.butIn general, 2 a^2 +b^2 Za+b.29 + 16 = 225 = 5 , 29 + 216 = 3 + 4 = 7.
2 a^2 +b^2 a+b.NOW TRY
EXERCISE 5
Find a decimal approximation
for each square root. Round
answers to the nearest thou-
sandth.
(a) 251 (b) - 2360
Hypotenuse
Leg a c
90
Leg b
FIGURE 1NOW TRY
EXERCISE 6
Find the length of the
unknown side in each right
triangle with sides a, b,and c,
where cis the hypotenuse.
Give any decimal approxima-
tions to the nearest
thousandth.
(a)
(b)a=9, c= 14
a=5, b= 12NOW TRY ANSWERS
- (a)7.141 (b)
- (a)c= 13 (b)bL10.724
- 18.974