To rewrite the polynomial \((x+8)(x-2)\) using the Distributive Property (also known as the FOIL method for binomials), we will distribute each term in the first parentheses to each term in the second parentheses:
- First: \(x \cdot x = x^2\)
- Outer: \(x \cdot (-2) = -2x\)
- Inner: \(8 \cdot x = 8x\)
- Last: \(8 \cdot (-2) = -16\)
Now, combine all these results:
\[ x^2 - 2x + 8x - 16 \]
Next, combine the like terms \(-2x\) and \(8x\):
\[ x^2 + 6x - 16 \]
Thus, the polynomial \((x+8)(x-2)\) rewritten using the Distributive Property is:
\[ x^2 + 6x - 16 \]