Transcript Warm-Up
Warm-Up
1)
2)
25
Find the Square Root:
3) 81
36
4) 144
Objectives
Estimate square roots.
Simplify square roots.
The side length of a square is the square
root of its area. This relationship is shown
by a radical symbol
. The number or
expression under the radical symbol is
called the radicand. The radical symbol
indicates only the positive square root of a
number, called the principal root. To
indicate both the positive and negative
square roots of a number, use the plus or
minus sign (±).
or –5
Example 1: Estimating Square Roots
Estimate
to the nearest tenth.
<
<
5<
<6
Find the two perfect squares that
27 lies between.
Find the two integers that
lies between
.
Because 27 is closer to 25 than to 36,
Try 5.2: 5.22 = 27.04
5.12 = 26.01
Too high, try 5.1.
Too low
Because 27 is closer to 27.04 than 26.01,
than to 5.1.
Check On a calculator
to the nearest tenth.
is close to 5 than to 6.
is closer to 5.2
≈ 5.1961524 ≈ 5.2 rounded
Check It Out! Example 1
Estimate
<
–7 <
to the nearest tenth.
<
< –8
Find the two perfect squares that
–55 lies between.
Find the two integers that
lies between –
.
Because –55 is closer to –49 than to –64,
is closer to –7
than to –8.
Try 7.2: 7.22 = 51.84
Too low, try 7.4
7.42 = 54.76
Too low but very close
Because 55 is closer to 54.76 than 51.84,
than to 7.2.
is closer to 7.4
Check On a calculator
≈ –7.4161984 ≈ –7.4
rounded to the nearest tenth.
Numbers such as 25 that have integer
square roots are called perfect squares.
Square roots of integers that are not
perfect squares are irrational numbers. You
can estimate the value of these square
roots by comparing them with perfect
squares. For example,
lies between
and
, so it lies between 2 and 3.
Square roots have special properties that help
you simplify, multiply, and divide them.
Example 2: Simplifying Square–Root Expressions
Simplify each expression.
A.
Find a perfect square factor of 32.
Product Property of Square Roots
B.
Quotient Property of Square Roots
Check It Out! Example 2
Simplify each expression.
A.
Find a perfect square factor of 48.
Product Property of Square Roots
B.
Quotient Property of Square Roots
Simplify.
Example 3B: Rationalizing the Denominator
Simplify the expression.
Multiply by a form of 1.
Check It Out! Example 3a
Simplify by rationalizing the denominator.
Multiply by a form of 1.
Check It Out! Example 3b
Simplify by rationalizing the denominator.
Multiply by a form of 1.
Homework!
Holt 1.3
p. 24
# 1-13, 18-33