I have just learned about the AM - GM inequality and I have done a couple of normal problems. However, I'm stuck in this one.. I feel like I have to rewrite it as a summation but I don't see how.
What is the minimum value of $\frac{x^2}{(x-9)}$ for $x>9$
Hint:
$$\frac{x^2}{x-9}=x+9+\frac{81}{x-9}$$
Your question can be re-written as:
Find out the minimum value of $\frac{(t+9)^2}{t}, t>0$. Re-arranging, $t+\frac{81}{t} + 18$. Now, apply AM-GM inequality.
Hint:
$$\frac{x^2}{x-9}=x-9+\frac{9(2x-9)}{x-9}$$
Now apply AM-GM for $x-9$ and $\frac{18x-81}{x-9}$.
