Announcing Stack Overflow Documentation

We started with Q&A. Technical documentation is next, and we need your help.

Whether you're a beginner or an experienced developer, you can contribute.

Sign up and start helping → Learn more about Documentation →

I'm currently doing some normalization along the lines of:

J = Integrate[Psi[x, 0]^2, {x, 0, a}]
sol = Solve[J == 1, A]
A /. sol

For this type of normalization, the negative square root is extraneous. The result of this calculation is:

In[49]:= J = Integrate[Psi[x, 0]^2, {x, 0, a}]
Out[49]= 2 A^2

In[68]:= sol = Solve[J == 1, A]
Out[68]= {{A -> -(1/Sqrt[2])}, {A -> 1/Sqrt[2]}}

Even if I try giving it an Assuming[...] or Simplify[...], it still gives me the same results:

In[69]:= sol =  Assuming[A > 0, Solve[J == 1, A]]
Out[69]= {{A -> -(1/Sqrt[2])}, {A -> 1/Sqrt[2]}}

In[70]:= sol =  FullSimplify[Solve[J == 1, A], A > 0]
Out[70]= {{A -> -(1/Sqrt[2])}, {A -> 1/Sqrt[2]}}

Can anyone tell me what I'm doing wrong here?

I'm running Mathematica 7 on Windows 7 64-bit.

share|improve this question
up vote 4 down vote accepted

Solve doesn't work like this. You might try Reduce, instead, e.g.

In[1]:= Reduce[{x^2 == 1, x > 0}, x]
Out[1]= x == 1

It's then a little tricky to transform this output to replacement rules, at least in the general case, because Reduce might use arbitrary many logical connectives. In this case, we could just hack:

In[2]:= Solve[Reduce[{x^2 == 1, x > 0}, x], x]
Out[2]= {{x->1}}
share|improve this answer

ToRules does what the box says: converts equations (as in Reduce output) to rules. In your case:

In[1]:= ToRules[Reduce[{x^2==1,x>0},x]]
Out[1]= {x->1}

In[2]:= {ToRules[Reduce[{x^2==1},x]]}
Out[2]= {{x->-1},{x->1}}  

For more complex cases, I have often found it useful to just check the value of the symbolic solutions after pluging in typical parameter values. This is not foolproof, of course, but if you know there is one and only one solution then it is a simple and efficient method:

Select[%,((x/.#)/.{someparameter-> 0.1})>0&]

Out[3]= {{x->-Sqrt[someparameter]},{x->Sqrt[someparameter]}}
Out[4]= {{x->Sqrt[someparameter]}}
share|improve this answer
Great, thank! I'd forgotten about ToRules. – Scott Morrison Jul 5 '10 at 12:52

Your Answer


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.