Understanding Square Roots

A square root is a value that, when multiplied by itself, gives you the original number. Every positive number has two square roots - one positive and one negative. When we write √9, we mean the positive square root (3), while -√9 means the negative square root (-3).

Perfect squares have whole number square roots. For example:

• √1 = 1
• √4 = 2
• √9 = 3
• √16 = 4
• √25 = 5

But what about numbers that aren't perfect squares? These have irrational square roots that we need to approximate. Here's how:

1. Find the two consecutive perfect squares the number falls between
2. Take the square root of each perfect square
3. Your answer will be between these two values

Remember: When approximating square roots, identify which perfect squares your number sits between, and you'll know the range for your answer!

For example, to estimate √13:

• 13 is between 9 and 16
• √9 = 3 and √16 = 4
• Therefore, √13 is between 3 and 4

Applying Square Root Approximations

When solving real-world problems, you'll often need to estimate square roots. For example, to find the side length of a square with area 174.6 mm², you need to find √174.6.

First, identify the perfect squares around 174.6:

• 169 (13²) and 196 (14²)
• Therefore, √174.6 is between 13 and 14 mm

This skill is especially useful in geometry when working with areas and the Pythagorean theorem. For instance, if a square has an area of 117.5 yd², its side length would be approximately 11 yards since √117.5 falls between √100 (10) and √121 (11), but closer to 11.

Try this: To quickly estimate square roots without a calculator, remember key perfect squares: 1, 4, 9, 16, 25, 36, 49, 64, 81, 100, 121, 144...

When estimating negative square roots like -√72, the process is similar, but your answer will be negative:

• √72 is between √64 (8) and √81 (9)
• Therefore, -√72 is between -9 and -8

You've got this! Square root approximation is a skill that becomes more intuitive with practice.