f(x)=(x)/(5)+(5)/(x)(x!=0)" is increasing in "

f(x)=(x)/(5)+(5)/(x)(x ne0) is increasing in

Find the intervals in which f(x)=5x^(3/2)-3x^(5/2),x>0 is increasing or decreasing.

The function f(x)=x^(2)+2x-5 is increasing in the interval

Find the intervals in which f(x)=5x^(3//2)-3x^(5//2),\ \ x >0 is increasing or decreasing.

For every value of x the function f(x)=1/(5^(x)) is: a)Decreasing b)Increasing c)Neither Increasing nor decreasing d)Increasing for x > 0 and decreasing for x < 0

f:R rarr R,f(x) is differentiable such that f(x)=k(x^(5)+x).(kne0) Then f(x) is increasing . In the above question k can take value,

If the function f(x)=x^(2)-kx+5 is increasing on [2,4], then

The function f(x)=(1+x)^(5//x), f(0)=e^(5)" at x =0 is "

f:R rarr R,f(x) is differentiable such that f(f(x))=k(x^(5)+x),k!=0). Then f(x) is always increasing (b) decreasing either increasing or decreasing non-monotonic

Let f(x)=3x+5 then show f(x) is strictly increasing and f^(-1)(x) exists and is strictly increasing for "x"inR