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

Consider the function f(x)=|x^2|+|x^5|,x in R . Statement 1: f'(4)=0 Statement 2: f is continuous in [2, 5], differentiable in (2, 5) and f(2) = f(5). (1) Statement 1 is false, statement 2 is true (2) Statement 1 is true, statement 2 is true; statement 2 is a correct explanation for statement 1 (3) Statement 1 is true, statement 2 is true; statement 2 is not a correct explanation for statement 1 (4) Statement 1 is true, statement 2 is false

Statement - 1 : Rolle's Theorem can be applied to the function f(x)=1+(x-2)^(4//5) in the interval [0, 4] and Statement - 2 : f(x) is continuous in [0, 4] and f(0)=f(4) .

Consider the function f(x)= {{:((x+5)/(x-2),"if " xne 2),(" 1", "if " x=2):} . Then f(f(x)) is discontinuous

The function f(x)={{-x^(2)+6, if 0<=x<2 },{ x-1, if 2<=x<=4 }, then find if f(x) is continuous, differentiable or both.

Given the function f(x) = x^(2) + 2x + 5 . Find f(-1), f(2), f(5).

If f is continuously differentiable function then int_(0)^(1.5) [x^2] f'(x) dx is

For the function f,f(x)=x^(2)-4x+7, show that f'(5)=2f'((7)/(2))

If f is continuously differentiable function then int_(0)^(2.5) [x^2] f'(x) dx is equal to