Consider f(x)=|1-x|\ \ 1\ lt=xlt=2\ a...

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` .

Similar Questions

Explore conceptually related problems

Function for which LMVT is applicable but Rolle’s theorem is not

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

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

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

Rolle's theorem is not applicable to the function f(x)=|x| for -2lexle2 because

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

Discuss the applicability of Rolles theorem for f(x)=tan x on [0,pi]

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