Statement 1: If g(x) is a differentiable...

Statement 1: If `g(x)` is a differentiable function, `g(2)!=0,g(-2)!=0,` and Rolles theorem is not applicable to `f(x)=(x^2-4)/(g(x))in[-2,2],t h e ng(x)` has at least one root in `(-2,2)dot` Statement 2: If `f(a)=f(b),t h e ng(x)` has at least one root in `(-2,2)dot` Statement 2: If `f(a)=f(b),` then Rolles theorem is applicable for `x in (a , b)dot`

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Rolle's theorem is not applicable to f(x) = |x| in [ -2,2] because

Statement I If g(x) is a differentiable function g(1) ne0, g(-1)ne0 and Rolle's theorem is not applicable to f(x)=(x^(2)-1)/(g(x)) in [-1, 1] , then g(x) has atleast one root in (-1, 1) . Statement II if f(a)=f(b) , then Rolle's theorem is applicable for x in (a, b) .

Rolle's theorem is applicable for the function f(x) = |x-1| in [0,2] .

Rolle's theorem is not applicable to the function f(x)=|x|"for"-2 le x le2 becase

Rolle's theorem is not applicable to the function f (x) = |x| for -2 le x le 2 becaue

prove that the roll's theorem is not applicable for the function f(x)=2+(x-1)^((2)/(3)) in [0,2]

Verify Rolle's theorem for the function f(x)=e^(x) sin 2x [0, pi/2]

Verify Rolle theorem for the function f(x)=log{(x^(2)+ab)/(x(a+b))} on [a,b], where 0

Let f(x) and g(x) be two differentiable functions in R and f(2)=8,g(2)=0,f(4)=10, and g(4)=8 Then prove that g'(x)=4f'(x) for at least one x in(2,4).

Statement-1: Let f(x)=|x^(2)-1|,x in[-2,2]rArr f(-2)=f(2) and hence there must be at least one c in(-2,2) so that f'(c)=0, statement 2:f'(0)=0, where f(x) is the function of S_(1)

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