# A problem when wrongly using Dot command in Mma

``````In[1]:= SameQ[Dot[1, 2], 1.2]
TrueQ[Dot[1, 2] == 1.2]

a = 1; b = 2;
SameQ[Dot[a, b], a.b]
TrueQ[Dot[a, b] == a.b]

Out[1]= False

Out[2]= False

Out[4]= True

Out[5]= True
``````

I know this uses `Dot` command wrong. Anybody can give me a clear reson for the above different results?

thanks!

-

When you write `1.2`, Mma understands a number (aka 6/5), but if you write `{1, 1}.{2, 2} or a.b` Mma understands a scalar product, as usual in any book using vectors.

HTH!

-

It can be informative to view an expression under `Hold` and `FullForm`:

``````a = 1; b = 2;
SameQ[Dot[a, b], a.b]] //Hold //FullForm
``````
`    Hold[SameQ[Dot[a, b], Dot[a, b]]]`

With this combination of commands, Mathematica parses but does not evaluate the expression (`Hold`), and then shows the long pseudo-internal form of the expression (`FullForm`).

In this case, you can see that the second term `a.b` is parsed as `Dot[a, b]` before any evaluation happens.

When `.` appears with numerals as in `1.2` it is interpreted specially as a decimal point. This is similar to other numeric entry formats such as: `1*^6` which is recognized directly as `1000000`:

``````1*^6 //Hold //FullForm
``````

Compare trying to enter:

``````a = 1;

a*^6
``````
-
`a.b` is interpreted as `Dot[a,b]` and then variables `a` and `b` are substituted, meaning `Dot[1,2]` and thus equality holds. This is not the same as `1.2` where the dot stands for the decimal separator and not for the inline operator of `Dot`.