STATEMENT-1: Let f(x) and g(s) be two decreasing function then f(g(x)) must be an increasing function .
and
STATEMENT-2 : `f(g(2)) gt f(g(1))` , where f and g are two decreasing function .

Let f and g be two real functions; continuous at x=a Then f+g and f-g is continuous at x=a

If f(x)=(x^2)/(2-2cosx);g(x)=(x^2)/(6x-6sinx) where 0 < x < 1, (A) both 'f' and 'g' are increasing functions (B) 'f' is increasing and 'g' is decreasing functions (C) 'f' is decreasing and 'g' is increasing functions (D) both 'f' and 'g' are decreasing functions

If g(x) is a decreasing function on R and f(x)=tan^(-1){g(x)}. State whether f(x) is increasing or decreasing on R.

Let f (x), g(x) be two real valued functions then the function h(x) =2 max {f(x)-g(x), 0} is equal to :

Let y=f(x) and y=g(x) be two monotonic, bijective functions such that f(g(x) is defined than y=f(g(x)) is

if f is an increasing function and g is a decreasing function on an interval I such that fog exists then

Let f(x) be a function such that f(x), f'(x) and f''(x) are in G.P., then function f(x) is

If f(x) and g(x) are two real functions such that f(x)+g(x)=e^(x) and f(x)-g(x)=e^(-x) , then