Suppose the function f(x) satisfies the ...

Suppose the function `f(x)` satisfies the relation `f(x+y^3)=f(x)+f(y^3)dotAAx ,y in R` and is differentiable for all `xdot` Statement 1: If `f^(prime)(2)=a ,t h e nf^(prime)(-2)=a` Statement 2: `f(x)` is an odd function.

Similar Questions

Explore conceptually related problems

Let f(x y)=f(x)f(y)AAx , y in Ra n df is differentiable at x=1 such that f^(prime)(1)=1. Also, f(1)!=0,f(2)=3. Then find f^(prime)(2)dot

If function f satisfies the relation f(x)*f^(prime)(-x)=f(-x)*f^(prime)(x) for all x ,

A continuous function f(x)onRvec satisfies the relation f(x)+f(2x+y)+5x y=f(3x-y)+2x^2+1forAA x ,y in RdotT h e n findf(x)dot

Statement 1: For f(x)=sinx ,f^(prime)(pi)=f^(prime)(3pi)dot Statement 2: For f(x)=sinx ,f(pi)=f(3pi)dot

A function f: RvecR satisfies the equation f(x+y)=f(x)f(y) for all x , y in Ra n df(x)!=0fora l lx in Rdot If f(x) is differentiable at x=0a n df^(prime)(0)=2, then prove that f^(prime)(x)=2f(x)dot

Determine the function satisfying f^2(x+y)=f^2(x)+f^2(y)AAx ,y in Rdot

If y=f(x) is an odd differentiable function defined on (-oo,oo) such that f^(prime)(3)=-2,t h e n|f^(prime)(-3)| equals_________.

Prove that f(x)gi v e nb yf(x+y)=f(x)+f(y)AAx in R is an odd function.

Statement 1: If differentiable function f(x) satisfies the relation f(x)+f(x-2)=0AAx in R , and if ((d/(dx)f(x)))_(x=a)=b ,t h e n((d/(dx)f(x)))_(a+4000)=bdot Statement 2: f(x) is a periodic function with period 4.

If a function satisfies (x-y)f(x+y)-(x+y)f(x-y)=2(x^2 y-y^3) AA x, y in R and f(1)=2 , then

Suppose the function `f(x)` satisfies the relation `f(x+y^3)=f(x)+f(y^3)dotAAx ,y in R` and is differentiable for all `xdot` Statement 1: If `f^(prime)(2)=a ,t h e nf^(prime)(-2)=a` Statement 2: `f(x)` is an odd function.

Similar Questions

Recommended Questions