Consider the function `f(x)=|x-2|+|x-5|,c inR.`
Statement 1: `f'(4)=0`
Statement 2: f is continuous in `[2,5],` differentiable in

Consider the real function f(x) =1 -2x find f(-1) and f(2)

Statement 1: f(x)=|x-1|+|x-2|+|x-3| has point of minima at x=3. Statement 2: f(x) is non-differentiable at x=3.

Consider the real function f(x ) = ( x+2)/( x-2) prove that f(x) f(-x) +f(0) =0

Statement 1: If 27 a+9b+3c+d=0, then the equation f(x)=4a x^3+3b x^2+2c x+d=0 has at least one real root lying between (0,3)dot Statement 2: If f(x) is continuous in [a,b], derivable in (a , b) such that f(a)=f(b), then there exists at least one point c in (a , b) such that f^(prime)(c)=0.

Let f:[-1,oo] in [-1,oo] be a function given f(x)=(x+1)^(2)-1, x ge -1 Statement-1: The set [x:f(x)=f^(-1)(x)]={0,1} Statement-2: f is a bijection.

Is the function defined by f(x)={{:(x+5," if "x le1),(x-5," if "x gt 1):} a continuous function?

Consider the graph of the function f(x) = x+ sqrt|x| Statement-1: The graph of y=f(x) has only one critical point Statement-2: fprime (x) vanishes only at one point

If f(x)={x ,xlt=1,x^2+b x+c ,x >1' find b and c if function is continuous and differentiable at x=1

If f(x)=2x^(2)+3x-5 , then prove that f'(0)+3f'(-1)=0

Which of the following hold(s) good for the function f(x)=2x-3x^(2/3)? (a) f(x) has two points of extremum. (b) f(x) is convave upward AAx in Rdot (c) f(x) is non-differentiable function. (d) f(x) is continuous function.