Statement I f(x) = |cos x| is not derivable at `x = (pi)/(2)`.
Statement II If g(x) is differentiable at x = a and g(a) = 0, then |g|(x)| is non-derivable at x = a.

If both f(x) and g(x) are non-differentiable at x=a then f(x)+g(x) may be differentiable at x=a

Let f(x)=|x| and g(x)=|x^(3)|, then f(x) and g(x) both are continuous at x=0 (b) f(x) and g(x) both are differentiable at x=0 (c) f(x) is differentiable but g(x) is not differentiable at x=0 (d) f(x) and g(x) both are not differentiable at x=0

Statement I f(x) = sin x + [x] is discontinuous at x = 0. Statement II If g(x) is continuous and f(x) is discontinuous, then g(x) + f(x) will necessarily be discontinuous at x = a.

Let f(x)=15-|x-10| and g(x)=f(f(x)) then g(x) is non differentiable

Let f(x) = x|x| and g(x) = sin x Statement-1: gof is differentiable at x=0 and derivative is continous at that point. Statement-2: gof is twice differentiable at x=0

Statement-1 : f(x) = 0 has a unique solution in (0,pi). Statement-2: If g(x) is continuous in (a,b) and g(a) g(b) <0, then the equation g(x)=0 has a root in (a,b).

Statement-1: If f and g are differentiable at x=c, then min (f,g) is differentiable at x=c. Statement-2: min (f,g) is differentiable at x=c if f(c ) ne g(c )

If f(x)={sin x,x<0 and cos x-|x-1|,x<=0 then g(x)=f(|x|) is non-differentiable for

Let f(x)={{:(-2",",-3lexle0),(x-2",",0ltxle3):}andg(x)=f(|x|)+|f(x)| Which of the following statement is correct ? g(x) is differentiable at x=0 g(x) is differentiable at x=2