# Difference between == and === in Mathematica

I was under the impression that `=` is an assignment, `==` is a numeric comparison, and `===` is a symbolic comparison (as well as in some other languages `==` being `equal to` and `===` being `identical to`. However, looking at the following it would appear that this is not necessarily the case...

``````In: x == x
Out: True

In: x === x
Out: True

In: 5 == 5
Out: True

In: 5 === 5
Out: True

In: x = 5
Out: 5

In: 5 == x
Out: True

In: 5 === x
Out: True

In: 5 5 == 5x
Out: True

In: 5 5 === 5x
Out: True

In: x == y
Out: x == y

In: x === y
Out: False

In: y = x
Out: 5

In: x == y
Out: True

In: x === y
Out: True
``````

So what exactly is the difference between == and === in Mathematica? I have been looking at the documentation but I still don't quite understand it.

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See this answer for additional information on numerical behavior of `Equal` and `SameQ`. –  Alexey Popkov Jul 24 '11 at 0:33

One important difference is that `===` always returns `True` or `False`. `==` can return unevaluated (which is why it's useful for representing equations.)

``````In[7]:= y == x^2 + 1

Out[7]= y == 1 + x^2

In[8]:= y === x^2 + 1

Out[8]= False
``````

There are some interesting cases where `==` returns unevaluated that are worth being aware of while programming. For example:

``````In[10]:= {} == 1

Out[10]= {} == 1
``````

which can affect things like `If[foo=={}, <true>, <false>]`.

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lhs===rhs yields True if the expression lhs is identical to rhs, and yields False otherwise.

and

lhs==rhs returns True if lhs and rhs are identical.

Reference from here and here.

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`==` and `===` are very similar in the sense that it returns `True` if the lhs and rhs are equal. One example where they differ is when you compare numbers in different representation formats.

``````In: 5.==5
Out: True

In: 5.===5
Out: False
``````

Although they are the same numerically, (which is why `==` returns `True`), they aren't exactly identical.

FYI, they are different functions internally. `==` is `Equal`, whereas `===` is `SameQ`.

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I direct you to section 2.5: Equality checks of an excellent book by Leonid Shifrin.

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`Equal` refers to semantic equality whereas `SameQ` is syntactic equality. For instance, `Sin[x]^2+Cos[x]^2` and `1` are the same number, so they are equal semantically. Since this can not be determined without more transformations, `Equal` returns unevaluated. However, actual expressions are different, so `SameQ` gives `False`.

``````Sin[x]^2 + Cos[x]^2 == 1
Sin[x]^2 + Cos[x]^2 === 1
Simplify[Sin[x]^2 + Cos[x]^2 == 1]
``````

Note that there's special handling of `Real` numbers, `SameQ[a,b]` can return `True` if `a` and `b` differ in the last binary digit. To do more restrictive identity testing, use `Order[a,b]==0`

``````a = 1. + 2^-52;
b = 1.;
a === b
Order[a, b]==0
``````

`SameQ` can return `True` for expressions that are syntactically different because expression heads may sort arguments automatically. You can prevent automatic sorting by using holding attributes. For instance

``````c + d === d + c
SetAttributes[SameQ, HoldAll]
c + d === d + c
``````
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Could you please include an example of SameQ[a,b] can return True if a and b differ in the last binary digit.? Thanks! –  belisarius Mar 13 '11 at 22:20
Added example, using the fact that mantissa of double has 53 digits –  Yaroslav Bulatov Mar 14 '11 at 0:47
Got it now, thanks. I was testing with 2^-53 ... silly me. –  belisarius Mar 14 '11 at 1:34