Guide 6A: Simplifying Radicals
Goal: Pull Perfect Squares Out of Radicals
Tiny Concept
Sometimes the number inside a radical is not a perfect square.
Example:
72
72 is not on our perfect square list.
So instead, we look for the largest perfect square factor hiding inside.
Recipe Box
Simplifying Radicals Recipe
Step 1: Find the largest perfect square factor.
Step 2: Rewrite the number as
(perfect square)(leftover)
Step 3: Split the radical.
Step 4: Simplify the perfect square.
Perfect Squares To Know
Square Root | Perfect Square |
1 | 1 |
2 | 4 |
3 | 9 |
4 | 16 |
5 | 25 |
6 | 36 |
7 | 49 |
8 | 64 |
9 | 81 |
10 | 100 |
11 | 121 |
12 | 144 |
13 | 169 |
14 | 196 |
15 | 225 |
See One
Simplify:
72
Step 1
Find the largest perfect square factor.
72 = 36(2)
Step 2
Rewrite.
72 = 36⋅2
Step 3
Split the radical.
72 = 36⋅2 = 36 ×2
Step 4
Simplify.
72 = 36⋅2 = 36 ×2 = 6 ×2
Answer:
72=62
Try One
Simplify:
45\sqrt{45}
45
Step 1
Largest perfect square factor?
45=9(5)45=9(5)
45=9(5)
Step 2
Rewrite.
45=95\sqrt{45} = \sqrt9\sqrt5
45
=9
5
Step 3
Simplify.
353\sqrt5
35
Answer:
45=35\sqrt{45}=3\sqrt5
45
=35
Do One
1
27\sqrt{27}
27
2
50\sqrt{50}
50
3
75\sqrt{75}
75
Pattern Watch
Notice what we're really doing.
72\sqrt{72}
72
↓
36⋅2\sqrt{36\cdot2}
36⋅2
↓
626\sqrt2
62
We're looking for a perfect square that can escape the radical.
Think:
Perfect squares can come out.Leftovers stay inside.
Visual
Imagine a box.
┌───────────┐
│ 72 │
└───────────┘Look inside.
72 = 36 × 2The 36 is a perfect square.
So it can leave.
6 √2The 6 escapes.
The 2 stays trapped.
Mixed Check
1
Simplify:
18\sqrt{18}
18
A)
323\sqrt2
32
B)
232\sqrt3
23
C)
929\sqrt2
92
D)
626\sqrt2
62
2
Simplify:
32\sqrt{32}
32
A)
424\sqrt2
42
B)
828\sqrt2
82
C)
282\sqrt8
28
D)
16216\sqrt2
162
3
Simplify:
98\sqrt{98}
98
A)
727\sqrt2
72
B)
14214\sqrt2
142
C)
49249\sqrt2
492
D)
777\sqrt7
77
4
Which perfect square factor should be used first when simplifying
72\sqrt{72}
72
A)
44
4
B)
99
9
C)
3636
36
D)
6464
64
5
Simplify:
200\sqrt{200}
200
A)
10210\sqrt2
102
B)
20220\sqrt2
202
C)
1002100\sqrt2
1002
D)
10410\sqrt4
104
Tiny Reminder
When simplifying radicals:
Find
largest perfect square factor\text{largest perfect square factor}
largest perfect square factor
Rewrite
ab\sqrt{ab}
ab
Split
ab\sqrt a\sqrt b
a
b
Simplify
72=362=62\sqrt{72} = \sqrt{36}\sqrt2 = 6\sqrt2
72
=36
2
=62
Perfect squares come out. Leftovers stay in.
Future Connection
This exact skill appears later in:
- distance formula
- quadratic formula
- Pythagorean theorem
- circles
- SAT radicals
- SAT geometry
- Algebra 2 simplification
Students who can quickly spot:
72=36(2)72=36(2)
72=36(2)
or
98=49(2)98=49(2)
98=49(2)
will save enormous time later.
- Guide 6B: Adding & Subtracting Radicals
- Guide 6C: Solving Radical Equations