Let`f:RrarrR` and `g:RrarrR` be respectively given by `f(x)=|x|+1 and g(x)=x^2+1`. Define `h:RrarrR` by
`h(x)={(max {f(x),g(x)} if x le 0),(min {f(x),g(x)} if x gt 0):}`
The number of points at which `h(x)` is not differentiable is

Let f, g : R to R be defined, respectively byt f(x)=x+1, g(x)=2x-3. Find f+g, f-g and f/g .

Let g(x)=1+x-[x] and f(x)=={(-1, x lt0),(0, x=0),(1, x gt 0):} Then for all x find f(g(x))

Let f:[a,b]rarr[1,infty) be a continuous function and lt g: RrarrR be defined as g(x)={(0, "if x" lt a),(int_a^x f(t)dt, "if a"lexleb),(int_a^b f(t)dt, "if x"gtb):} Then a) g(x) is continuous but not differentiable at a b) g(x) is differentiable on R c) g(x) is continuous but nut differentiable at b d) g(x) is continuous and differentiable at either a or b but not both.

Let f(x)=x^(2) and g(x)=2x+1 be two real functions. Find (f+g) (x), (f-g) (x), (fg) (x), (f/g) (x) .

Let f:R→R: f(x)=x+1 and g:R→R: g(x)=2x−3 . Find (f−g)(x) .

Let R be the set of real numbers and the functions f:RrarrR and g:RrarrR be defined f(x)=x^2+2x-3 and g(x)=x+1 . Then the value of x for which f(g(x))=g(f(x)) is

If f(x)=sinx, g(x)=x^2 and h(x)=log x, find h[g{f(x)}].

Let f: RrarrR be defined by f(x)=(e^x-e^(-x))//2dot then find its inverse.

Let g(x)=f(x)+f(1-x) and f '' (x) gt 0 AA x in (0, 1) . Find the intervals of increase and decrease of g(x) -

Let f(x)=(1)/(1+x^(2)) and g(x) is the inverse of f(x) ,then find g(x)