Which of the following correctly demonstrates the use of the Commutative Property of Multiplication?(1 point)
Responses
11(b+z)=11b+11z
11 left parenthesis b plus z right parenthesis equals 11 b plus 11 z
3(b10+4)=3(4+b10)3
3 left parenthesis b superscript 10 baseline plus 4 right parenthesis equals 3 left parenthesis 4 plus b superscript 10 baseline right parenthesis 3
2(b10+z11)=(b10+z11)⋅2
2 left parenthesis b superscript 10 baseline plus z superscript 11 baseline right parenthesis equals left parenthesis b superscript 10 baseline plus z superscript 11 baseline right parenthesis times 2
z^11⋅2=z^11+2
Responses
11(b+z)=11b+11z
11 left parenthesis b plus z right parenthesis equals 11 b plus 11 z
3(b10+4)=3(4+b10)3
3 left parenthesis b superscript 10 baseline plus 4 right parenthesis equals 3 left parenthesis 4 plus b superscript 10 baseline right parenthesis 3
2(b10+z11)=(b10+z11)⋅2
2 left parenthesis b superscript 10 baseline plus z superscript 11 baseline right parenthesis equals left parenthesis b superscript 10 baseline plus z superscript 11 baseline right parenthesis times 2
z^11⋅2=z^11+2
Answers
Answered by
abcdegh I love you and you know I always will
Use the Commutative Property to determine the missing step in proving the equivalence of 12a+10+a=10+a+12a .
Step 1: [missing]
Step 2: 10+13a=10+13a
Step 3: The expressions are equivalent because they both equal the same value.
(1 point)
Responses
12a+10+a−10=10+a+12a−10
d plus 10 plus a equals 10 plus a plus d
12a+10=10+12a
d plus 10 plus a equals 10 plus a plus d
12a+10+a−a=10+a+12a−a
d plus 10 plus a equals 10 plus a plus d
10+12a+a=10+13a
Step 1: [missing]
Step 2: 10+13a=10+13a
Step 3: The expressions are equivalent because they both equal the same value.
(1 point)
Responses
12a+10+a−10=10+a+12a−10
d plus 10 plus a equals 10 plus a plus d
12a+10=10+12a
d plus 10 plus a equals 10 plus a plus d
12a+10+a−a=10+a+12a−a
d plus 10 plus a equals 10 plus a plus d
10+12a+a=10+13a
Answered by
GPT-4o mini
The correct demonstration of the Commutative Property of Multiplication is:
**z^11⋅2=z^11+2**
However, this statement is actually incorrect because it states that the multiplication of \( z^{11} \) and \( 2 \) equals the addition of \( z^{11} \) and \( 2 \), which is not true.
None of the provided options correctly showcase the Commutative Property of Multiplication in its true form. The Commutative Property states that \( a \cdot b = b \cdot a \). A correct example would illustrate something like \( 2 \cdot 3 = 3 \cdot 2 \).
If you need further clarification or adjustments, please provide more context or additional options.
**z^11⋅2=z^11+2**
However, this statement is actually incorrect because it states that the multiplication of \( z^{11} \) and \( 2 \) equals the addition of \( z^{11} \) and \( 2 \), which is not true.
None of the provided options correctly showcase the Commutative Property of Multiplication in its true form. The Commutative Property states that \( a \cdot b = b \cdot a \). A correct example would illustrate something like \( 2 \cdot 3 = 3 \cdot 2 \).
If you need further clarification or adjustments, please provide more context or additional options.
Answered by
GPT-4o mini
To use the Commutative Property in this context, we are rearranging the terms of the expression. The Commutative Property states that the order in which two numbers are added (or multiplied) does not affect their sum (or product).
Given that the goal is to show \( 12a + 10 + a = 10 + a + 12a \), the missing step involves rearranging the terms on the left side of the equation.
The correct missing step would be:
**10 + 12a + a = 10 + a + 12a**
Here's a breakdown of how it fits into the overall proof:
- **Step 1**: Rearranging the terms using the Commutative Property: \( 12a + 10 + a \) becomes \( 10 + a + 12a \).
- **Step 2**: Combine like terms: \( 10 + 13a = 10 + 13a \).
- **Step 3**: Conclude that the expressions are equivalent because they both equal the same value.
So the correct response that fits as the missing step is:
**10 + 12a + a = 10 + a + 12a**.
Please ensure to select a suitable response from the provided options that matches this explanation.
Given that the goal is to show \( 12a + 10 + a = 10 + a + 12a \), the missing step involves rearranging the terms on the left side of the equation.
The correct missing step would be:
**10 + 12a + a = 10 + a + 12a**
Here's a breakdown of how it fits into the overall proof:
- **Step 1**: Rearranging the terms using the Commutative Property: \( 12a + 10 + a \) becomes \( 10 + a + 12a \).
- **Step 2**: Combine like terms: \( 10 + 13a = 10 + 13a \).
- **Step 3**: Conclude that the expressions are equivalent because they both equal the same value.
So the correct response that fits as the missing step is:
**10 + 12a + a = 10 + a + 12a**.
Please ensure to select a suitable response from the provided options that matches this explanation.
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