Similar to what @Ignacio said, the cause is the function being called once. The problem with this vs other functions like `sin`

is the conditional. The `if`

statement is evaluated when the function is called and not preserved as a symbolic statement. That is, the `u > -1 and u < 1`

^{[1]} is evaluated on the first function call and `result`

is treated accordingly (i.e. left at `0`

).

As an illustration of what is happening:

```
sage: x = var('x')
sage: print ":)" if x > 0 else ":("
:(
```

There is no way to get around this in general^{[2]}, because Python has to evaluate the condition in the `if`

statement to work out which code path to take when the function is called.

### Best case solution

There is a solution that should work (but doesn't yet). Sage provides `Piecewise`

, so you can define `f`

as:

```
f = Piecewise([((-5, -1), ConstantFunction(0)),
((-1, 1), x*x),
((1, 5), ConstantFunction(0))],
x)
```

Unfortunately, the implementation of `Piecewise`

is as yet incomplete, and severely lacking, so the only way to plot this seems to be:

```
f.plot()
```

(Limitations: trying to call `f`

with a variable causes errors; it doesn't work with the conventional `plot`

; you can't restrict the domain in `Piecewise.plot`

, it plots the whole thing (hence why I restricted it to ±5); it doesn't cope with infinite intervals.)

### Working solution

You could also just detect whether the argument to `f`

is a number or variable and do the appropriate action based on that:

```
def f(u):
try:
float(u) # see it's a number by trying to convert
return u*u if -1 < u < 1 else 0.0
except TypeError: # the conversion failed
if callable(f):
return lambda uu: f(u(uu))
else:
return f
```

Note the `callable`

call, it checks to see if `u`

is a function (in some sense), if so returns the composition of `f`

with `u`

.

This version allows us to do things like:

```
sage: f(10)
0.0
sage: f(x)(0.5)
0.25
sage: f(x+3)(-2.2)
0.64
```

and it also works perfectly fine with `plot`

, in either form. (Although it warns about `DeprecationWarnings`

because of the `u(uu)`

syntax; there are ways to get around this using `u.variables`

but they are fairly awkward.)

**Note**: This "working" solution is quite fragile, and very suboptimal; the `Piecewise`

version would be the correct solution, if it worked.

[1]: Python actually allows you to write this as `-1 < u < 1`

. Pretty cool.

[2]: Although in some special cases you can, e.g. if you know `x > 0`

, then you can use `assume(x > 0)`

which means the example will print `:)`

.