Both functions have a y-intercept at \left(0, -1\right).

Also, both functions have an x-intercept at \left(1, 0\right).

The second function has an additional x-intercept at \left(-1,0 \right).

On the right side, both functions take larger and larger positive values as x gets further from zero. That is, as x \to \infty, y \to \infty for both functions.

On the left side, the first function takes larger and larger negative values as x gets further from zero. That is, as x \to -\infty, y \to -\infty for the first function.

On the other hand, the second function takes larger and larger positive values as x gets further from zero on the left side. That is, as x \to -\infty, y \to \infty for the second function.

Note that although both functions tend towards infinity to the right, the way they do so is different. The first function increases at a constant rate, while the second function increases at an increasing rate.

The first function is positive for x > 1 and negative for x < 1.

The second function is positive for both x > 1 and x < -1, and is negative for -1 < x < 1.

A linear function has a constant rate of change. It also has no turning points, with at most one x-intercept.

The first function is linear, while the second function is non-linear.