Simplify. $$ \frac{z^{2}-4 z+4}{z^{2}-4} $$

Question

UpStudy AI · Accepted Answer

To simplify the expression:

$$
\frac{z^{2} - 4z + 4}{z^{2} - 4}
$$

**Step 1: Factor the numerator and the denominator.**

- **Numerator:** $$ z^{2} - 4z + 4 $$ is a perfect square trinomial. It can be factored as:
  $$
  z^{2} - 4z + 4 = (z - 2)^2
  $$

- **Denominator:** $$ z^{2} - 4 $$ is a difference of squares. It can be factored as:
  $$
  z^{2} - 4 = (z - 2)(z + 2)
  $$

**Step 2: Rewrite the expression with the factored forms.**
$$
\frac{(z - 2)^2}{(z - 2)(z + 2)}
$$

**Step 3: Simplify by canceling the common factor $$(z - 2)$$.**
$$
\frac{(z - 2)\cancel{(z - 2)}}{\cancel{(z - 2)}(z + 2)} = \frac{z - 2}{z + 2}
$$

**Final Simplified Form:**
$$
\frac{z - 2}{z + 2}
$$

**Note:** This simplification is valid as long as $$ z \neq 2 $$ and $$ z \neq -2 $$ to prevent division by zero.

**Answer:**
After simplifying, the expression is (z – 2) divided by (z + 2). Thus,

(z − 2)/(z + 2)
$$ \frac{z - 2}{z + 2} $$

Simplify. \[ \frac{z^{2}-4 z+4}{z^{2}-4} \]