Between `5^(2)` and `6^2` there are _____non-perfect square numbers.

There are _________ perfect squares between 1 and 100.

There are __________ perfect squares between 1 and 50.

If ax^2+bx+c=0 and px^2+qx+r=0 have one and only one root in common and a,b,c,p,q,r being rational, then b^2-ac and q^2-pr are 1) both are perfect squares 2) b^2-ac is a perfect square but q^2-pr is not a perfect square 3) q^2-pr is a perfect square but b^2-ac is not a perfect square 4) both are not perfect squares

The number which is not a perfect square is-

There are 2n non-perfect square numbers between two consecutive square numbers n^(2) and (n+1)^(2)

How many factors of the number 4000 are perfect squares ?

How many factors of the number 4000 are perfect squares ?

How many numbers are there between 200 to 300 which are perfect squares?

Suppose n is a positive integer such that (n^2 + 48) is a perfect square. What is the number of such n? (n<5)