Let r be the remainder when `2021^(2020)` is divided by `2020^(2)`. Then r lies between

Let r be the least non-negative remainder when (22)^(7) is divided by 123. The value of r is

If 17^(2020) is divided by 18, then what is the remainder ?

If lambda is the remainder when 2^("2021") is divided by 17, then the value of lambda must be equal to

The remainder 'R' when 3^(37)+ 4^(37) is divided by 7 is :

Suppose ,m divided by n , then quotient q and remainder r {:("n)m(q"),(" "-), (" "-), (" "r) , (" "):} or m= nq + r , AA m,n,q, r in 1 and n ne 0 If a is the remainder when 5^(40) us divided by 11 and b is the remainder when 2^(2011) is divided by 17 , the value of a + b is

Suppose p(x) is a polynomial with integer coefficients.The remainder when p(x) is divided by x-1 is 1 and the remainder when p(x) is divided cby x-4 is 10. If r(x) is the remainder when p(x) is divided by (x-1)(x-4) then find the value of r(2006)

Suppose p(x) is a polynomial with integer coefficients.The remainder when p(x) is divided by x-1 is 1 and the remainder when p(x) is divided cby x-4 is 10. If r(x) is the remainder when p(x) is divided by (x-1)(x-4) then find the value of r(2006)

When y^(2)+my+2=0 us divide by (y-1) then the quotient is f(y) and the remainder is R_(1). When y^(2)+my+2=0 is divided by (y+1) then the quotient is g(y) and the remainder is R_(2). If R_(1)=R_(2) then find the value of m