Let x be a number which exceeds its square by the greatest possible quantity . Then x is equal to

The number which exceeds its square by the greatest possible quantity is 1/2 (b) 1/4 (c) 3/4 (d) none of these

The number which exceeds its square by the greatest possible quantity is (1)/(2)(b)(1)/(4)(c)(3)/(4) (d) none of these

The real numbers which must exceeds its cube is

The arithmetical fraction that exceeds its square by the greatest quantity is :

Find all number which exceed their square root by 12

Which fraction exceeds its pth power by the greatest possible number?

The fraction exceeds its p^(th) power by the greatest number possible,where p>=2 is

The fraction exceeds its p^(th) power by the greatest number possible, where p le2 is

If f (x) is continous and fifferentiable in [-3,9] and f'(x) in [-2,8] AA x in (-3,9). Let N be the number of divisors of the greatest possible vaue of f (9)-f (-3), then the sum of digits of N.

The fraction exceeds its p^(th) power by the greatest number possible, where p geq2 is