Take the 2-minute tour ×
Stack Overflow is a question and answer site for professional and enthusiast programmers. It's 100% free, no registration required.

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

Solve[eq==0,s^2]

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];
z/.sol

-(b/a)

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

share|improve this question
1  
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)}
share|improve this answer
3  
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
share|improve this answer
1  
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
1  
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

Your Answer

 
discard

By posting your answer, you agree to the privacy policy and terms of service.

Not the answer you're looking for? Browse other questions tagged or ask your own question.