Lesson

As we have seen previously, perfect squares are important numbers as their square root is an integer. We have actually only looked a positive square roots before. However, we can also find the negative square root of a number.

Use the applet below to refresh your memory of the first $20$20 perfect squares. Consider the questions below as you explore.

- Which of these perfect squares are you already familiar with?
- How can you create a definition for a perfect square, using tiles?
- Where might you see these numbers come up outside of math class?
- What is the relationship between the area (number of tiles) and side length?
- Why do you think they call multiplying a number by itself as squaring a number?

If we are asked to find the square root of a value, we are being asked, "What number multiplied by itself would give this value?"

You might also see the square root symbol written with a number inside it, for example, $\sqrt{25}$√25.

This means find the square root of $25$25.

**Evaluate** $\sqrt{144}$√144.

**Think: **We should read $\sqrt{144}$√144 as "the square root of $144$144".

This is the number that squares (multiplies with itself) to make $144$144.

We know that $144=12\times12$144=12×12.

**Do: **The square root of $144$144 is $12$12, so $\sqrt{144}=12$√144=12.

**Evaluate: **what numbers, when squared, give $25$25?

**Think: **We might think of this as the same thing as $\sqrt{25}$√25, but notice that the question says numbers, not number, so we are looking for more than one. We should remember that the product of two positives is positive, but the product of two negatives is also positive.

We know that $25=5\times5$25=5×5 and also that $25=-5\times\left(-5\right)$25=−5×(−5).

**Do: **The two number which when squared equal $25$25 are $5$5 and $-5$−5.

**Reflect:** We can always check by doing $5^2$52 and $\left(-5\right)^2$(−5)2 to confirm that we do get back $25$25.

Which of the following numbers are perfect squares? Select all that apply.

$6$6

A$25$25

B$49$49

C$44$44

D$18$18

E$144$144

F$6$6

A$25$25

B$49$49

C$44$44

D$18$18

E$144$144

F

Evaluate $\sqrt{256}$√256

Use square root symbols to represent solutions to equations of the form x^2 = p, where p is a positive rational number.