The values of `b` and `c` for which the identity of `f(x+1)-f(x)=8x+3` is satisfied, where `f(x)=b x^2+c x+d ,` are

f(x)= bx^(2) + cx and d and f(x+ 1) - f(x)= 8x + 3 then…….

f(x) is a cubic polynomial x^3 + ax^2+ bx + c such that f(x)=0 has three distinct integral roots and f(g(x)) = 0 does not have real roots, where g(x) = x^2 + 2x - 5, the minimum value of a + b + c is

For x inR - {1} , the function f(x ) satisfies f(x) + 2f(1/(1-x))=x . Find f(2) .

Find the intervals in which the function f given by f(x)=2x^(2)-3x is (a) incresing (b) decreasing

If a function satisfies f(x+1)+f(x-1)=sqrt(2)f(x) , then period of f(x) can be

The function f(x) satisfying the equation f^2 (x) + 4 f'(x) f(x) + (f'(x))^2 = 0

If f(x)=ax+b and g(x)=cx+d, then f(g(x))=g(f(x)) is equivalent to

The number or linear functions f satisfying f(x+f(x))=x+f(x) AA x in RR is

Find the approximate value of f(3.02) , where f(x)=3x^(2)+5x+3 .

For the function f(x)= x + (1)/(x), x in [1, 3] the value of c for mean value theorem is