# Sympy: Simplifying square roots of squares

Sympy does not seem to be able to simplify an expression where the square root of a square of a variable is involved:

``````In [28]: a = x**2
In [29]: b = a**(1/2)
In [30]: b
Out[30]:
0.5
⎛ 2⎞
⎝x ⎠
In [31]: b.simplify()
Out[31]:
0.5
⎛ 2⎞
⎝x ⎠
``````

I do not get this to work with other variants of `simplify`, in particular I would have thought that `b.powsimp()` should work.

``````In [32]: b.powsimp()
Out[32]:
0.5
⎛ 2⎞
⎝x ⎠
``````

Does anyone know why this does not work, or what I am doing wrong?

-

There are two problems with your example.

First `sqrt(x**2)==x` only for positive real numbers.

Second, for SymPy `1/2` and `0.5` are not the same things. The first is a `Rational` instance, the second is a `float` instance.

Finally, an example:

``````>>> x = Symbol('x', real=True)
>>> (x**2)**(1./2)
∣x∣**1.0
>>> (x**2)**(S(1)/2) # S() is short for sympify()
∣x∣
``````

`sympify` transforms python objects to more adequate SymPy objects.

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Thank you! Annoyingly simple and obvious, though. :) –  Karl Yngve Lervåg Oct 10 '12 at 10:51
Although: Is not `(-1)**2 = 1**2`, such that `sqrt(x**2)==x` is true for both positive AND negative real numbers? Further, for any positive real number `x`, `sqrt(x)` has both a positive and negative part? –  Karl Yngve Lervåg Oct 10 '12 at 10:59
@KarlYngveLervåg, `(-1)**2 = 1**2` does not have much to do with the value of `sqrt(x**2)`. Moreover, while there are indeed two solutions to `x**2=a`, `sqrt(a)` has a single value (the positive solution). Check en.wikipedia.org/wiki/… –  Krastanov Oct 10 '12 at 16:55
My point was only that if `x` is real, then `x**2` is necessarily positive. Anyway, again thanks for very helpful input! –  Karl Yngve Lervåg Oct 11 '12 at 17:30

I assume you declare `x` as `x = Symbol('x')`. If you change it to `x = Symbol('x', real=True)` the expression should be simplified. You can find the reason why you have to explicitly state that your variable is `real` in the sympy bugtracker.

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The function you want is `powdenest`. If passed the `force=True` parameter, it will ignore assumptions
``````>>> powdenest(sqrt(x**2), force=True)
Thanks, `powdenest` seems useful. –  Karl Yngve Lervåg Oct 10 '12 at 10:53