If `f:R to R` be defined by `f(x) =2x+sinx ` for `x in R`, then check the nature of the function.

If f:R to R is defined by f(x)=|x|, then

Let a function f:R to R be defined by f(x)=2x+cosx+sinx " for " x in R . Then find the nature of f(x) .

f:R rarr R defined by f(x)=x^(2)+5

The function f: R to R defined by f(x) = 4x + 7 is

Let f:R to R be defined as f (x) =( 9x ^(2) -x +4)/( x ^(2) _ x+4). Then the range of the function f (x) is

If f:R rarr R is defined by f(x)=3x+2 define f[f(x)]

If f : R to R be a function such that f(x)=x^(3)+x^(2)+3x +sinx, then discuss the nature of the function.

The function f:R to R is defined by f(x)=cos^(2)x+sin^(4)x for x in R . Then the range of f(x) is

If f:R to R be the function defined by f(x) = sin(3x+2) AA x in R. Then, f is invertible.