### Theory:

To check whether the given natural number is a perfect square or not, we can follow the below steps:
Step 1. Write the given natural number as a product of prime factors.

Step 2. Now, group the factors in pairs so that both factors in each pair are equal.

Step 3. Now, see whether some factors are leftover or not. If no factor is leftover in grouping, then the given number is a perfect square. Otherwise, it is not a perfect square.

Step 4. Take one factor from each group and multiply them to obtain the number whose square is the given number.
Let's see an example to understand this concept clear.
Example:
Check whether $$36$$ is a perfect square or not. If it is perfect square, find the number whose square is $$36$$.

Solution:

The given number is $$36$$.

We have to write $$36$$ as a product of prime factors. $$36$$ $$=$$ $$2 \times 2 \times 3 \times 3$$

Now, group the prime factors of $$36$$.

$36=\left(2×2\right)×\left(3×3\right)={2}^{2}×{3}^{2}$

Here, no factor is leftover in grouping.

So, the given number is a perfect square.

Now, we need to find the number whose square is $$36$$.

Take one factor from each group and multiply them to obtain the number whose square is the given number.

$36=\left(2×2\right)×\left(3×3\right)=2×3=6$

Therefore, $$36$$ is the square of the number $$6$$.
To obtain perfect square:
All numbers are not perfect squares. If any number is not a perfect square, we need to multiply or divide the given number by one of the factor(s) to make it a perfect square.
Example:
Is $$80$$ is a perfect square? If not, make it a perfect square.

Solution: $$80$$ $$=$$ $$2 \times 2 \times 2 \times 2 \times 5$$

$$80$$ $$=$$ $$(2 \times 2) \times (2 \times 2) \times 5$$

Here, $$5$$ is leftover in grouping.

So, $$80$$ is not a perfect square

To make $$80$$ as a perfect square:

Case I: The number leftover in grouping is $$5$$. So multiply the given number by $$5$$.

$$80 \times 5 = 400$$

Therefore, $$400$$ is a perfect square.

Case II: The number leftover in grouping is $$5$$. So divide the given number by $$5$$.

$\frac{80}{5}=16$

Therefore, $$16$$ is a perfect square.
Important!
perfect number cannot be a perfect square number. Perfect numbers such as $$6$$, $$28$$, $$496$$, $$8128$$,... are not square numbers.