1. The problem asks which logarithm property is demonstrated by the equation $$109g8 + 1096 = 109g48$$. 2. First, let's rewrite the equation in a clearer form assuming the notation means logarithms: $$\log 8 + \log 6 = \log 48$$. 3. Recall the **Product Property** of logarithms: $$\log a + \log b = \log (a \times b)$$. 4. Applying this property to the left side: $$\log 8 + \log 6 = \log (8 \times 6) = \log 48$$. 5. This matches the right side of the equation, confirming the equation demonstrates the **Product Property** of logarithms. Final answer: Product Property