How to find supremum and infimum of $\{x, y \ge 1 : \frac{xy}{3x + 2y + 1}\}$? I suspect that $\frac{1}{6}$ is infimum and supremum does not exist, but I dont know how to prove it using only the definition of sup/inf.
Asked
Active
Viewed 285 times
1 Answers
0
Observe it as $$f(x):= \frac{xy}{3x + 2y + 1}$$ with parameter $y$. It is easy to see that $f$ is increasing for $x\geq 0$ (draw a graph). So $$f(x) \geq f(1)= {y\over 2y+4} =: g(y)$$
But $g$ is also increasing for $y> -2$ so $$g(y) \geq g(1) ={1\over 6}$$ So this infimum is actualy minumum.
nonuser
- 90,026
-
@user376343 I see this is pointless conversation. Just follow the unstructions I wrote. – nonuser Oct 22 '18 at 10:57