Let `y=f(x), y=g(x) , y=h(x)` be three invertible functions defined from `R to R ` Then `y=f(x)+g(x)+h(x)` is

Let y=f(x),y=g(x),y=h(x) be three invertible functions defined from R rarr R Then y=f(x)+g(x)+h(x) is

If f,g,\ h are three functions defined from R\ to\ R as follows: the range of h(x)=x2+1

If f,g,\ h are three functions defined from R\ to\ R as follows: the range of h(x)=x^2+1

If f,g,\ h are three functions defined from R\ to\ R as follows: the range of h(x)=x^2+1

If f,g,\ h are three functions defined from R\ to\ R as follows: Find the range of f(x)=x^2

If f,g,\ h are three functions defined from R\ to\ R as follows: Find the range of f(x)=x^2

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 g (y) is inverse of function f :R to R given by f (x)=x+3, then g (y)=

If g (y) is inverse of function f :R to R given by f (x)=x+3, then g (y)=

Suppose f, g, and h be three real valued function defined on R. Let f(x) = 2x + |x|, g(x) = (1)/(3)(2x-|x|) and h(x) = f(g(x)) The domain of definition of the function l (x) = sin^(-1) ( f(x) - g (x) ) is equal to