Question
\( (-a \times b)(e \times-g) \) Which of the following expressions is an example of the commutative property? A. \( (-a+e)+(b-g) \) B. \( (-a-g) \times(b \times e) \) C. \( (-a \times e)(b \times-g) \) D. \( (-a+b)(e-g) \)
Ask by Hilton Harper. in South Africa
Mar 09,2025
Upstudy AI Solution
Tutor-Verified Answer
Answer
The commutative property is demonstrated in option C: \( (-a \times e)(b \times -g) \).
Solution
1. Consider the original expression:
\[
(-a \times b)(e \times -g)
\]
2. The commutative property of multiplication states that for any two numbers \( x \) and \( y \):
\[
x \times y = y \times x
\]
3. In the original expression, focus on the factors \( b \) and \( e \) in the two groups:
\[
(-a \times b)(e \times -g)
\]
Using the commutative property, we can swap \( b \) and \( e \). This gives:
\[
(-a \times e)(b \times -g)
\]
4. This new expression:
\[
(-a \times e)(b \times -g)
\]
is precisely the transformation described by the commutative property.
5. Comparing with the choices provided, option C:
\[
(-a \times e)(b \times -g)
\]
matches the expression we obtained using the commutative property.
Thus, the answer is C.
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Simplify this solution Beyond the Answer
The commutative property states that the order in which you add or multiply numbers does not change the result. In your given options, option C, \( (-a \times e)(b \times -g) \), showcases this property well because it allows you to rearrange the terms within the multiplication without altering the outcome. For instance, you can switch the order of \( -a \) and \( e \) or \( b \) and \( -g \) and the product remains the same. As for options A, B, and D, they involve addition and different arrangements of terms, but don't demonstrate the commutative property in multiplication accurately like option C does. So, choose wisely!
