Let `f(x)` be a quadratic function such that `f(0) = f(1) =0 & f(2) = 1`, then `lim_(x->0)cos(pi/2cos^2x)/(f^2(x))` equal to

If f(x)=0 is a quadratic equation such that f(-pi)=f(pi)=0 and f(pi/2)=-(3pi^2)/4, then lim_(x->-pi)(f(x))/("sin"(sinx) is equal to

Let f : R to R be a differentiable function such that f(2) = -40 ,f^1(2) =- 5 then lim_(x to 0)((f(2 - x^2))/(f(2)))^(4/(x^2)) is equal to

-If f(x) is a quadratic expression such that f(-2)=f(2)=0 and f(1)=6 then lim_(x rarr0)(sqrt(f(x))-2sqrt(2))/(ln(cos x)) is equal to

If f(x)=0 be a quadratic equation such that f(-pi)=f(pi)=0 and f((pi)/(2))=(-3 pi^(2))/(4), then lim_(x rarr pi)(f(x))/(sin(sin x)) is equal to:

If f(x)=0 be a quadratic equation such that f(-pi)=f(pi)=0 and f((pi)/(2))=(-3 pi^(2))/(4), then lim_(x rarr pi)(f(x))/(sin(sin x)) is equal to:

Let f(x) be twice differentiable function such that f'(0) =2 , then, lim_(xrarr0) (2f(x)-3f(2x)+f(4x))/(x^2) , is

If f(x) = 0 is a quadratic equation such that f(-pi) =f(pi) = 0 and f(pi/2) = -(3pi^(2))/4 , then : lim _(x to - pi ) f(x)/(sin (sin x))=

Let f (x) be a quadratic function such that f (0) =1 and f(-1)=4, ifint(f(x))/(x^(2)(1+x)^(2))dx is a rational function then the value of f(10)

Let f (x) be a quadratic function such that f (0) =1 and f(-1)=4, ifint(f(x))/(x^(2)(1+x)^(2))dx is a rational function then the value of f(10)

If f(x)=0 is a quadratic equation such that f(-pi)=f(pi)=0 and f((pi)/(2))=-(3pi^(2))/(4) , then lim_(xto -pi^+) (f(x))/(sin(sinx)) is equal to