From the FAQ:

**Why does SymPy say that two equal expressions are unequal?**

The equality operator (==) tests whether expressions have identical form, not whether they are mathematically equivalent.

To make equality testing useful in basic cases, SymPy tries to rewrite mathematically equivalent expressions to a canonical form when evaluating them. For example, SymPy evaluates both x+x and -(-2*x) to 2*x, and x*x to x**2.

The simplest example where the default transformations fail to generate a canonical form is for nonlinear polynomials, which can be represented in both factored and expanded form. Although clearly `a(1+b) = a+ab`

mathematically, SymPy gives:

```
>>> bool(a*(1+b) == a + a*b) False
```

Likewise, SymPy fails to detect that the difference is zero:

```
>>> bool(a*(1+b) - (a+a*b) == 0) False
```

If you want to determine the mathematical equivalence of nontrivial expressions, you should apply a more advanced simplification routine to both sides of the equation. In the case of polynomials, expressions can be rewritten in a canonical form by expanding them fully. This is done using the `.expand()`

method in SymPy:

```
>>> A, B = a*(1+b), a + a*b
>>> bool(A.expand() == B.expand()) True
>>> (A - B).expand() 0
```

If `.expand()`

does not help, try `simplify()`

, `trigsimp()`

, etc, which attempt more advanced transformations. For example,

```
>>> trigsimp(cos(x)**2 + sin(x)**2) == 1 True
```