Question

If area of a square is 625 find the length of the square​

Answer 1

Answer:

Ans. -- 25

Step-by-step explanation:

A square has equal length on all its sides, so the area of square is

Length x Length = 625

Which is

Length ^2 = 625

We want the number that when it times it’s self it’s 625

It can be done by square root of 625 which is 25. So the length of side is 25.

Or look at the prime factorization of 625 ( or just factors) and what number they can make up

Which is 5x5x5x5 = 625

They can make up

5^2 x 5^2 = 25 x 25 that is the “same” number

So the length is 25

Answer 2

Answer:

The length of the square will be 25 units.

Step-by-step explanation:

Given: The area of a square is 625 units square.

We have to find the length of the square.

• As we know that the formula is used to calculate the area of the square is: $Area= side ^2$

We are solving in the following way:

We have,

The area of a square is 625 units square.

The length of the square will be:

$Area= side ^2$

We will put the given value in the above formula;

$=>625=side^2\\=>\sqrt{625} =side\\=>side=25\ \ \ [\because 25\times25=625]$

Hence, the length of the square will be 25 units.