If `f` is periodic, `g` is polynomial function and `f(g(x))` is periodic and `g(2)=3,g(4)= 7` then `g(6)` is

If a polynomial p(x)=x^(2)-6x-7 is divided by g(x), we get (x-7)/(x+1) then g(x) is:

If f and g are continuous functions with f(3)=5 and lim_(x to 3)[2f(x)-g(x)]=4 , find g(3).

If f and g are continuous functions with f(3) = 5 and lim_(xto3)[2f(x)-g(x)]=4 , find g(3).

Let f be a differential function such that f(x)=f(2-x) and g(x)=f(1 +x) then (1) g(x) is an odd function (2) g(x) is an even function (3) graph of f(x) is symmetrical about the line x= 1 (4) f'(1)=0

Find the correct pair in the following statement : y = tan x is a periodic function with period pi Domain of cosecant function is R The period of f = g pm h is l.c.m of period of g , period of h "cosec"^(-1)x +sec^(-1) x = pi/4

If find g are polynomials of derrees m and n respectively, and if h(x) = (f^@ g ) (x), then the degree of h is

Let f and g be two functions from R to Rdefined by f(x) = 3x – 2 and g(x) = x^(2)+3 . Then gcircf is:

f is a continous function in [a, b] ; g is a continuous function in [b,c]. A function h(x) is defined as h(x)=f(x) for x in [a,b) , g(x) for x in (b,c] if f(b) =g(b) then