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Given a expression (polynomial, or any equation in general) such as

a s^2+b = 0

I want to solve for s^2, to get s^2 = -b/a. We all know that one can't just write


because s^2 is not a 'variable'. only s is a 'variable'. So what I do is

eq  = a s^2+b;
sol = First@Solve[eq==0/.s^2->z,z];


I was wondering if there is a way to do the above, without the intermediate variable substitution? I tried many commands, but no success (reduce, collect, eliminate, factor. etc...).

thanks --Nasser

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What is wrong with the intermediate variable? It seems like a good solution to me - even if it is 2 lines. –  Sam Magura May 28 '11 at 23:36
@Sam, I never said something is wrong? Just was wondering if there is a command that can do it without the intermediate subs. –  Nasser May 28 '11 at 23:42

2 Answers 2

up vote 3 down vote accepted

One way is to solve for s and then square it...

eq=a s^2+b;
sol=#^2 &@ (s/.Solve[eq==0,s])//DeleteDuplicates

Out[1]= {-(b/a)}
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Slightly more direct, I think, would be DeleteDuplicates[s^2 /. Solve[a*s^2 + b == 0, s]] Out[89]= {-(b/a)} –  Daniel Lichtblau May 29 '11 at 2:56

You could use the Notation package, but it leads to other issues. So here is your original equation:

In[1]:= Solve[b + a s^2 == 0, s^2]
During evaluation of In[1]:= Solve::ivar: s^2 is not a valid variable. >>
Out[1]= Solve[b + a s^2 == 0, s^2]

Now Symbolize s^2 so that the normal Mathematica evaluator treats it like any other symbol

In[2]:= Needs["Notation`"]
In[3]:= Symbolize[ParsedBoxWrapper[SuperscriptBox["s", "2"]]]

In[4]:= Solve[b + a s^2 == 0, s^2]

Out[4]= {{s^2 -> -(b/a)}}

The problem is that s^2 really is treated as just another symbol, eg

In[6]:= Sqrt[s^2] // PowerExpand
Out[6]= Sqrt[s^2]

A work around is to replace s^2 with s*s, since Symbolize only acts on user inputed expressions (ie at the level of interpreting inputted Box structures)

In[7]:= Sqrt[s^2] /. s^2 -> s s // PowerExpand
Out[7]= s
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Note that In[3] above was created with the Notation Palette - so you don't see all of the Box stuff in the Mathematica notebook. –  Simon May 29 '11 at 1:22
Simon, if you can make the Symbolize operation temporary as in Block or Module I will vote for this. Otherwise, it seems like hitting a nail with a sledgehammer. –  Mr.Wizard May 29 '11 at 7:44
@Mr.Wizard: I never said it was a good solution... –  Simon May 29 '11 at 10:00

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