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If I want to count the number of times that ^ occurs in an expression x, that's easy:

Count[x, _Power, {0, Infinity}]

Suppose I want to count only instances of -1 raised to some power. How can I do that?

I had tried

Count[(-1)^n + 2^n, _Power[-1, _], {0, Infinity}]

and even

Count[Plus[Power[-1, n], Power[2, n]], _Power[-1, _], {0, Infinity}]

but both gave 0.

The origin of the question: I'm building a ComplexityFunction that allows certain expressions like Power[-1, anyComplicatedExpressionHere] and Sqrt[5] (relevant to my problem) but heavily penalizes other uses of Power and Sqrt.

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The code should be Count[x, _Power, {0, Infinity}]. – Sasha Jul 1 '11 at 17:19
Just a small note that Power does not always correspond to a ^ somewhere in the expression, e.g. 1/x is Power[x,-1] in FullForm. Just be aware that there are a few quirks like this, in case it's relevant to your problem. – Szabolcs Jul 1 '11 at 18:21

3 Answers 3

up vote 6 down vote accepted

You would do Count[x,Power[-1,_], {0, Infinity}]

In[4]:= RandomInteger[{-1, 1}, 10]^RandomChoice[{x, y, z}, 10]

Out[4]= {(-1)^x, (-1)^x, 0^y, 0^z, (-1)^z, 1, 1, 1, (-1)^y, 0^x}

In[5]:= Count[%, (-1)^_, {0, Infinity}]

Out[5]= 4
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Interesting. I tried Count[(-1)^n + 2^n, _Power[-1, _], {0, \[Infinity]}] before I posted and it gave 0. – Charles Jul 1 '11 at 17:30
This is because _Power matches Power[___] and so your pattern was looking for Power[___][-1,_] and there is none. Your pattern would match (a^b)[-1,n], which has full form Power[a,b][-1,n]. The correct pattern should be Power[-1,_]. – Sasha Jul 1 '11 at 17:39
Thanks for the explanation, that helps. – Charles Jul 1 '11 at 17:40

What is about

Count[expr, Power[-1, _], {0, Infinity}]

P.S. Example in the question is not correct. I think you probably mean

Count[x, _Power, {0, Infinity}]
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Count[x, Power[-1, _], Infinity]
  • the level specification of Infinity includes all levels 1 through infinity
  • pattern Power[-1, _] will only match the the instances of Power when the radix is -1
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