`f (x) = x^2- root(3)|x|, x in [-1,1]` Rolle's theorem is not applicable because

If f(x)={{:(x,olexle1),(2-x,1lexle2'):} then Rolle's theorem is not applicable to f(x) because

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

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

Define f(x)={{:(x",",0lexle1),(2-x,,1lexle2):} then Rolles theorem is not applicable to f(x) because

For the function f(x) = e^(cos x) , Rolle's theorem is applicable when

Rolle's theorem is applicable in case of f(x)=a^(sinx) in :

Let f(x)={(x^(a) , x > 0),(0, x=0):} .Rolle's theorem is applicable to f for x in[0,1] ,if a : (A) -2 (B) -1 (C) 0 (D) (1)/(2)

Consider f(x)=|1-x| 1 lt=xlt=2 a n d g(x)=f(x)+bsinpi/2 x , 1 lt=xlt=2 Then which of the following is correct? Rolles theorem is applicable to both f, g a n d b = 3//2 LMVT is not applicable of f and Rolles theorem if applicable to g with b=1/2 LMVT is applicable to f and Rolles theorem is applicable to g with b = 1 Rolles theorem is not applicable to both f,g for any real b .

Show that the Rolle's theorem is not applicable for f(x) = x^(1/3) on [-1,1]