Use the distributive property to find the product. $$ \begin{aligned} 8 \cdot 3.8 & =8 \cdot(3+\square)+(8 \cdot \square) \ & =(8 \cdot \square) \ & =\square \square \square)\end{aligned} $$

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To solve the problem using the distributive property, we start with the expression $$ 8 \cdot 3.8 $$.

1. **Break down $$ 3.8 $$**: We can express $$ 3.8 $$ as $$ 3 + 0.8 $$.
   
   So, we rewrite the expression:
   $$
   8 \cdot 3.8 = 8 \cdot (3 + 0.8)
   $$

2. **Apply the distributive property**: According to the distributive property, we can distribute $$ 8 $$ across the sum:
   $$
   8 \cdot (3 + 0.8) = 8 \cdot 3 + 8 \cdot 0.8
   $$

3. **Calculate each term**:
   - First, calculate $$ 8 \cdot 3 $$:
     $$
     8 \cdot 3 = 24
     $$
   - Next, calculate $$ 8 \cdot 0.8 $$:
     $$
     8 \cdot 0.8 = 6.4
     $$

4. **Combine the results**:
   $$
   8 \cdot 3.8 = 24 + 6.4 = 30.4
   $$

Thus, the final product is:
$$
8 \cdot 3.8 = 30.4
$$

In the original format, we can fill in the blanks:
$$
\begin{aligned}
8 \cdot 3.8 & = 8 \cdot (3 + 0.8) + (8 \cdot 0.8) \
& = 24 + 6.4 \
& = 30.4
\end{aligned}
$$

So, the completed expression is:
$$
\begin{aligned}
8 \cdot 3.8 & = 8 \cdot (3 + 0.8) + (8 \cdot 0.8) \
& = 30.4
\end{aligned}
$$
$$ 8 \cdot 3.8 = 30.4 $$

Use the distributive property to find the product. \[ \begin{aligned} 8 \cdot 3.8 & =8 \cdot(3+\square)+(8 \cdot \square) \\ & =(8 \cdot \square) \\ & =\square \square \square)\end{aligned} \]

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