6:38 AM
Is vertical height of Simplifying $\frac{\frac{a-b}{\sqrt a+\sqrt b}+\sqrt b}{\frac{a-b}{\sqrt a+\sqrt b}-\sqrt a}$ too big. Would it be better as: $\left(\frac{a-b}{\sqrt a+\sqrt b}+\sqrt b\right)/\left(\frac{a-b}{\sqrt a+\sqrt b}-\sqrt a\right)$ or something similar?

6:52 AM

2 hours later…
9:00 AM
D1, D2, D3.
D4, D5, D6.
D7, D8, D9.
C1, C2, C3.
C4, C5, C6.

5 hours later…
2:16 PM
@MartinSleziak I might suggest removing the expression from the title entirely, and cooking up something more descriptive, such as "Simplifying a complicated fraction involving radicals"

2:48 PM
I think this question can be closed. There is no context (or even motivation) for the inequality. And it is unlikely that the question will ever be improved, because the user account (formerly known as “FatsWallers”) does not exist anymore.

3:04 PM
@MartinSleziak I don't like the current one. The other should be fine. I am also happy with what @Xander said though I can see the merit of having the question in the title.

3 hours later…
6:24 PM
I have edited the question to (...)/(...) so that the height of the title is now smaller. Feel free to edit the title further, if needed. Simplifying $\left(\frac{a-b}{\sqrt a+\sqrt b}+\sqrt b\right)/\left(\frac{a-b}{\sqrt a+\sqrt b}-\sqrt a\right)$ math.stackexchange.com/posts/2003554/revisions