If I have functions $f,g,h > 0$ and $f\le g+h$ then:
$$\frac f{f+1}\le \frac g{g+1}+\frac h{h+1}, x \in R$$
I have been trying to find out whether it's true or not but I haven't succeeded.
If I have functions $f,g,h > 0$ and $f\le g+h$ then:
$$\frac f{f+1}\le \frac g{g+1}+\frac h{h+1}, x \in R$$
I have been trying to find out whether it's true or not but I haven't succeeded.