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

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

A fraction that exceeds its own 10^( th ) power by maximum possible value

A fraction that exceeds its own 10^( th ) power by maximum possible value is

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 sum of two non-negative numbers is 2a. If P be the probability that the product of these numbers is not less than m times their greatest possible product, then

The denominator of a fraction exceeds the square of the numberator by 16, then the least value of the fraction is

What is the greatest possible sum of the A.P. 17,14,11,…

The 7^(th) term of an A.P. is 5 times the first term and its 9^(th) term exceeds twice the 4^(th) term by 1 . The first term of the A.P. is

A point P(x,y) moves such that [x+y+1]=[x] . Where [.] denotes greatest intetger function and x in (0,2) , then the area represented by all the possible position of P , is