Function `f(x)=a^x` is increasing on `R` , if (a) `a >0` (b) `a<0` (c) `01`

Function f(x)=a^x is increasing on R , if (a) a >0 (b) a 1

Function f(x)=a^x is increasing on R , if (a) a >0 (b) a 1

Function f(x)=(log)_a x is increasing on R , if (a) a 1 (c) a 0

Function f(x)=(log)_a x is increasing on R , if (a) 0 1 (c) a 0

The function f(x)=x^9+3x^7+64 is increasing on (a) R (b) (-oo,\ 0) (c) (0,\ oo) (d) R_0

The function f(x)=x^(9)+3x^(7)+64 is increasing on (a) R(b)(-oo,0)(c)(0,oo) (d) R_(0)

Is the function f(x)=x^(2), x in R increasing?

Show that the function f(x)=a^(x),a>1 is strictly increasing on R.

The function f(x)=x^(2)e^(-x) is monotonic increasing when (a) x in R-[0,2](b)^(@)0

Statement 1: The function f(x)=x In x is increasing in ((1)/(e),oo) Statement 2: If both f(x) and g(x) are increasing in (a,b), then f(x)g(x) must be increasing in (a,b).