Use properties of logarithms to evaluate the expression. $$ \log 50+\log 2 $$ $$ \square $$ $$ \square $$

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UpStudy AI · Accepted Answer

1. Use the property of logarithms:  
   $$
   \log a + \log b = \log (a \cdot b)
   $$
   Therefore,  
   $$
   \log 50 + \log 2 = \log(50 \times 2)
   $$

2. Multiply the numbers inside the logarithm:  
   $$
   50 \times 2 = 100
   $$
   So the expression becomes:  
   $$
   \log 100
   $$

3. If the logarithm is base 10 (common logarithm), then:  
   $$
   \log 100 = 2 \quad \text{(since } 10^2 = 100\text{)}
   $$

$$\square \quad \log 100$$

$$\square \quad 2$$
$$\log 100 = 2$$

Use properties of logarithms to evaluate the expression. \( \log 50+\log 2 \) \( \square \) \( \square \)

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