Show that if function $f$ satisfies $f(x)\geq f(x+yf(x))(y+1)$ for $x,y>0$ then $f(x)>0$ is false. It is clear that $f$ is non-increasing but I can't show that it will pass OX and not assuming $f$ is differentiable.
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2Is $f$ continuous? – V.S.e.H. Sep 30 '23 at 16:48
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It isn't stated, so it can be not – Rhegf2wffw Sep 30 '23 at 17:09