Question

smallest number by which 3888 must be multiplied so that the product becomes a perfect square​

Answer 1

Answer:

smallest number by which 3888 must be multiplied so that the product becomes a perfect square​ is "3".

Step-by-step explanation:

3888 × 3 = 11664.

The square root of 11664 = 108

So the answer is = 3

Answer 2

Answer:

When we prime factorise 3888, we get = 2*2*2*2*3*3*3*3*3

=2^2*2^2*3^2*3^ 2*3

3 is extra

To make a pair for 3 we must multiply 3888 by 3.

Therefore it would become a perfect square.