Let P(x) be a polynomial, which when divided by `x-3` and `x-5` leaves remainders 10 and 6 respectively. If the polynomial is divided by `(x-3)(x-5)` then the remainder is-

When (x^5 - 1) is divided by (2x + 1), then the remainder is

Let's find the greatest number which divides 2300 and 3500 to leave remainders 32 and 56 respectively.

Consider an unknown polynomial which when divided by (x-3) and (x-4) leaves 2 and 1 as remainders, respectively, Let R(x) be the remainder when the polynomial is divided by (x-3) (x-4). Range of f(x) = =([R(x)])/(x^2-3x+2) is-

Consider an unknown polynomial which when divided by (x-3) and (x-4) leaves 2 and 1 as remainders, respectively, Let R(x) be the remainder when the polynomial is divided by (x-3) (x-4). If the equation R(x)= x^2+ax+1 has two distinct real roots then values of 'a' are-

If the polynomial p(x)=x^(3)+3x^(2)+3x+1 be divided by (x-pi) , the remainder is

A certain polynomial P(x)x in R when divided by x-a ,x-ba n dx-c leaves remainders a , b ,a n dc , resepectively. Then find remainder when P(x) is divided by (x-a)(x-b)(x-c)w h e r eab, c are distinct.

If the polynomial P(a)=x^(2)-2x+a be divided by (x - 3), the remainder is 0. Then a =

Remainder of the polynomial 2x^2 + 5x - 6 when it is divided by (2x - 1) is

Let p(x) be a quadratic polynomial with constant term 1. Suppose p(x) when divided by x-1 leaves remainder 2 and when divided by x+1 leaves remainder 4. Then the sum of the roots of p(x)=0 is