Consider the following expression:
$\sqrt{a x} \sqrt{b x}$
What do I use to make it simplify to:
$\sqrt{ab} x$
I tried actually everything (Simplify, FullSimplify, Collect and so on...) and such expressions remain unchanged.
Thanks in Advance and Regards,
Misery
You can try `PowerExpand``
Sqrt[a x] Sqrt[b x] // PowerExpand
Sqrt[a] Sqrt[b] x
I am answering this up to the letter: (1) combining powers of x, (2) grouping a and b under the same square root.
Simplify[Sqrt[a x] Sqrt[b x], Assumptions -> {a > 0, b > 0}]
Sqrt[a b] x
FullSimplify[Sqrt[a x] Sqrt[b x], Assumptions -> {a > 0, b > 0}]
Sqrt[a b] x
Refine[Sqrt[a x ] Sqrt[b x ], Assumptions -> {a > 0, b > 0}]
Sqrt[a b] x
Refine[Sqrt[a x ] Sqrt[b x ], a > 0 && b > 0]
Sqrt[a b] x
Simplify and FullSimplify, we can get the result with setting any 2 of the 3 variables as a nonnegative number, for example, {x >= 0, b > 0} is also available, but I don't know the exact reason…
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Simplify , FullSimplify and Refine won't work 囧: b = 2; Simplify[Sqrt[a x] Sqrt[b x], x > 0 && a > 0], the result is: Sqrt[2] Sqrt[a] x
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Sqrt[2 a] evaluates to Sqrt[2] Sqrt[a]. Thus even if Simplify should combine them, you'll never see that because subsequent evaluation will undo it.
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Sqrt[2 a] x?
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