The function f defined `f(x){(x[x],0lexle2),((x-1)x,2lexlt3):}` , Then Lf'(2) =

Examine the differentiability of f, where f is defined by f(x) = {{:(x[x],if0lexlt2),((x-1)x,if2lexlt3):} at x = 2

Examine the differentiability of f , where f is defined by f(x) = {{:(x[x],if0lexlt2),((x-1)x,if2lexlt3):} at x = 2

The function f:R→R defined by f(x)=(x−1)(x−2)(x−3) is

If a function f:RtoR is defined by f(x){{:(2x,xgt3),(x^(2),1lexle3),(3x,xlt1):} Then the value of f(-1)+f(2)+f(4) is

The function f:R rarr R defined as f(x)=(x^(2)-x+1)/(x^(2)+x+1) is

The function f : R -> R is defined by f (x) = (x-1) (x-2) (x-3) is

The function f is defined by f(x)={{:(x+3" if ",xlt1),(x^(2)" if ",xge1):} . Find f(-5),f(1), and f(3) .

Let f_(1) : R to R, f_(2) : [0, oo) to R, f_(3) : R to R be three function defined as f_(1)(x) = {(|x|, x < 0),(e^x , x ge 0):}, f_(2)(x)=x^2, f_(3)(x) = {(f_(2)(f_1(x)),x < 0),(f_(2)(f_1(x))-1, x ge 0):} then f_3(x) is:

The function f:R->[-1/2,1/2] defined as f(x)=x/(1+x^2) is