If `(x^(51)+51)` is divided by `( x+1)` then the remainder is

If (x^(11)+1) is divided by (x+1) , then the remainder is :

If (x^11+1) is divided by (x-1) then the remainder is

If f(x) is divided by (x – a), then the remainder is

If x^(51)+51 is divided by x+1 , the remainder is (a)0 (b) 1 (c) 49 (d) 50

If 'x^(13) + 1' is divided by 'x-1' , the remainder is :

If x^(51)+51 is divided by x+1, the remainder is 0(b)1(c)49(d)50

A polynomial f(x) yields a remainder of 2 when divided by x+1, and a remainder of 4 when divided by x-1. If f(x) is divided by x^(2)-1 then the remainder is

If P(x) is a real polynomial and when divided by x-1 the remainder is 10 & when it is divided by x +1 then also the remainder is 10 then the remainder when it is divided by x^2-1 will be ax + b then (3a +b)/ 2