If `(x^31 + 31)` is divided by (x + 1), the remainder is :

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

When 2^(31) is divided by 5 the remainder is

When x^2 + ax + b is divided by (x - 1) , the remainder is 15 and when x^2 + bx + a is divided by (x + 1), the remainder is - 1, then the value of a^2 + b^2 is:

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

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

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

If x^(11) +3 is divided by (x+1) , find the remainder