# How to check if expression contains a Complex expression?

Is there a way to check if an expression contains complex expressions / imaginary numbers?

The documentation says that you can't check if an expression contains `I` because of how it is interpreted. I have also tried `ImaginaryQ[expr_] := expr != Conjugate[expr]` and `Simplify[expr] =!= Simplify[Conjugate[expr]]`, but it does not yield accurate results. I have also tried to use MemberQ[expr, Complex], but that does not seem to work either.

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Do you need to check for expressions like `(-1)^(1/3)` or just explicit `Complex[a, b] == a + I b` objects which Yoda's answer addresses? –  Simon Jun 29 '11 at 22:16

``````ImaginaryQ[expr_] := ! FreeQ[expr, _Complex]
``````

Using it on two of your examples:

``````imExpr = a Sin[a + 2 I];
ImaginaryQ@imExpr
(* True *)

reExpr = a Sin[a^2 + a];
ImaginaryQ@reExpr
(* False *)
``````
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That works perfectly! But why is the form argument for FreeQ a pattern, _Complex, instead of just a symbol, Complex? –  eacousineau Jul 4 '11 at 3:58
`Complex` is the head for all complex numbers & expressions. So we use a pattern `_Complex` to capture anything with that `Head`. If you used the symbol `Complex` instead, this example: `FreeQ[{a,b,Complex},Complex]` will return `False`, eventhough `Complex` is not a complex number... `FreeQ[{a,b,Complex},_Complex]` returns `True` as it should. –  yoda Jul 4 '11 at 4:06

To be clear as to why `MemberQ[expr,Complex]` will not necessarily return `True` for reals (and may or may not return `True` for complex expressions). `MemberQ` is not asking if something is a member of the set of reals or anything like that.

`MemberQ[expr,form]` returns `True` if one of the elements of level 1 of `expr` matches `form`. Level 1 is what you get second from top if you do `TreeForm`. Also, by default, `MemberQ` does not look at heads. Thus:

``````l = List[1 + I];
(*
->
True
False
*)
``````

(the `Heads->True` part is to make `MemberQ` also look at heads of expressions). To understand why, look at `TreeForm@l` and `Treeform[List@l]`:

Thus, there is a `Complex` at the first level in the first case, and no `Complex` at level 1 in the second. This is why we get `True` and `False` above. One can use

``````MemberQ[List@l, Complex, -1, Heads -> True]
(*
-> True
*)
``````

to match on all levels.

Finally, to see that `MemberQ` really is a structural question, try `MemberQ[1 + Exp[3*I], Complex, Heads -> True]` which gives `False` even though the first argument is obviously complex.

So to sum up, `MemberQ` has little to do with mathematics; it's a construct to test patterns in lists (or any expression, the head does not matter).

In any case, if one is going to use structural tests, `FreeQ` is the easiest way, while `Element` is the way to do this with mathematical tests.

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@yoda sure, I wouldn't use `Element` either as I think of it as an assertion rather than a test. I was commenting on the answer stating that `MemberQ[expr, Complex]` should not be used because that should give `True` for real numbers, which I felt reflected a lack of distinction between structural and mathematical operations (ie, `MemberQ` is not about being or not being a member of a mathematical set) –  acl Jun 29 '11 at 19:03
@yoda: If Mathematica were smart enough, `Not[Element[a + b I, Reals]]` would return something like `b = 0`. I would think `Element[a + I b, Complexes]` would return `True`. (All this is assuming that we tell Math'ca that `a` and `b` are `Reals`.) –  Charles Jun 29 '11 at 19:04
Yes of course. I meant to post that to the other answer. I've done that and removed this :) –  yoda Jun 29 '11 at 19:05
Good explanation! –  Charles Jun 29 '11 at 19:08
@Charles Thanks! By the way, what you want is more what `Reduce` does than `Elements`; thus `Reduce[a + b*I \[Element] Reals, {a, b}]` or `Reduce[a + b*I \[Element] Reals && a \[Element] Reals && b \[Element] Reals, {a, b}]` –  acl Jun 29 '11 at 19:12
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I would not use `MemberQ[expr, Complex]` because that should give `True` for real numbers. Or rather, `Element[expr, Complexes]` would—I'm not sure what, if anything, your version would do. What about

``````Not[Element[expr, Reals]]
``````

or

``````Im[expr] != 0
``````

?

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`MemberQ[expr, Complex]` does not return `True` for reals because it is a structural question, not a mathematical one –  acl Jun 29 '11 at 17:50
@Charles: The command is `Im` –  yoda Jun 29 '11 at 18:47
@yoda: Thanks, corrected. Mathematica is something like my 10th language and I get confused every so often. –  Charles Jun 29 '11 at 18:50
@Charles: Yes, that's a mistake I make often too :) For me it's more common with `Real` because, `Real` is a valid head in Mathematica and the syntax coloring won't highlight it, whereas I catch `Imag` instantly because it's undefined and shows up as blue. –  yoda Jun 29 '11 at 18:54
@yoda, @Charles and how about `Trace` vs `Tr`, especially with something along the lines of `f[i_] := i^2; Trace[Table[f[i], {i, 1, 10}, {j, 1, 10}]]` (page of stuff) vs `f[i_] := i^2; Tr[Table[f[i], {i, 1, 10}, {j, 1, 10}]]` (385)... –  acl Jun 29 '11 at 18:58