If f(x) is a polynomial of degree 5 with real coefficients such that `f(|x|)=0` has 8 real roots, then `f(x)=0` has

f(x) is a polynomial of degree 4 with real coefficients such that f(x)=0 is satisfied by x=1,2,3 only, then f'(1).f'(2).f'(3) is equal to

If f(x) is a polynominal of degree 4 with leading coefficient '1' satisfying f(1)=10,f(2)=20 and f(3)=30, then ((f(12)+f(-8))/(19840)) is …………. .

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

If f(x) is a polynomial of degree n(gt2) and f(x)=f(alpha-x) , (where alpha is a fixed real number ), then the degree of f'(x) is

A polynomial of 6th degree f(x) satisfies f(x)=f(2-x), AA x in R , if f(x)=0 has 4 distinct and 2 equal roots, then sum of the roots of f(x)=0 is

The quadratic equation p(x)=0 with real coefficients has purely imaginary roots. Then the equation p(p(x))=0 has only purely imaginary roots at real roots two real and purely imaginary roots neither real nor purely imaginary roots

Let f be a function such that f(x+f(y)) = f(x) + y, AA x, y in R , then find f(0). If it is given that there exists a positive real delta such that f(h) = h for 0 lt h lt delta , then find f'(x)

Determine k so that the equation x^(2)-3kx+64=0 has no real roots.

Consider the cubic equation f(x)=x^(3)-nx+1=0 where n ge3, n in N then f(x)=0 has