A polynomial function f(x) is such that f''(4)= f''(4)=0 and f(x) has minimum value 10 at ax=4 .Then

A polynomial function f(x) is such that f'(4)= f''(4)=0 and f(x) has minimum value 10 at x=4 .Then

A function f is such that f'(4)=f''(4)=0 and f has minimum value 10 at x=4. Then f(x) is equal to

Let f(x)=ax^(2)+bx+c, if a>0 then f(x) has minimum value at x=

Let f(x) be a polynomial function such that f(x)=x^(4) . What is f'(1) equal to?

A function y=f(x) satisfying f'(x)=x^(-(3)/(2)),f'(4)=2 and f(0)=0 is

Let f(x) =4x^2-4ax+a^2-2a+2 be a quadratic polynomial in x,a be any real number. If x-coordinate ofd vertex of parabola y =f(x) is less thna 0 and f(x) has minimum value 3 for x in [0,2] then value of a is

Let f(x) =4x^2-4ax+a^2-2a+2 be a quadratic polynomial in x,a be any real number. If x-coordinate of vertex of parabola y =f(x) is less than 0 and f(x) has minimum value 3 for x in [0,2] then value of a is

Let f(x)=4x^(2)-4ax+a^(2)-2a+2 be a quadratic polynomial in x ,a be any real number.If x-coordinate ofd vertex of parabola y=f(x) is less thna 0 and f(x) has minimum value 3 for x in[0,2] then value of a is

Let f(x) be a polynomial function such that f(x). f(1/x) = f(x) + f(1/x). If f(4) = 65, then f^(')(x) =

A polynomial function f(x) satisfies the condition f(x)f(1/x)=f(x)+f(1/x) for all x inR , x!=0 . If f(3)=-26, then f(4)=