Question
x/8 = 3(x+4)/2 which expression in the equation represents a product
Answers
GPT-4o mini
Let's start by rewriting the equation you provided:
\[
\frac{x}{8} = \frac{3(x+4)}{2}
\]
To identify which expression represents a product, we can look at the right side of the equation, where we have \(3(x + 4)\). This expression involves multiplication: \(3\) is being multiplied by \((x + 4)\). Therefore, the expression \(3(x + 4)\) represents a product.
To clarify further, if we expand that product:
\[
3(x + 4) = 3x + 12
\]
Here, both \(3\) and \((x + 4)\) are factors of the product.
Thus, the expression in the equation that represents a product is **\(3(x + 4)\)**.
\[
\frac{x}{8} = \frac{3(x+4)}{2}
\]
To identify which expression represents a product, we can look at the right side of the equation, where we have \(3(x + 4)\). This expression involves multiplication: \(3\) is being multiplied by \((x + 4)\). Therefore, the expression \(3(x + 4)\) represents a product.
To clarify further, if we expand that product:
\[
3(x + 4) = 3x + 12
\]
Here, both \(3\) and \((x + 4)\) are factors of the product.
Thus, the expression in the equation that represents a product is **\(3(x + 4)\)**.