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Use the Associative Property to determine which expressions are equivalent.(1 point) Responses −3⋅(4x⋅−2)⋅−6y=(−3⋅4x)(−2⋅−6y) n...
Use the Associative Property to determine which expressions are equivalent.(1 point)
Responses
−3⋅(4x⋅−2)⋅−6y=(−3⋅4x)⋅−2−6y
negative 3 times left parenthesis 4 x times negative 2 right parenthesis times negative 6 y equals left parenthesis negative 3 times 4 x right parenthesis times negative 2 minus 6 y
−3⋅(4x⋅−2)⋅−6y=18−8x
negative 3 times left parenthesis 4 x times negative 2 right parenthesis times negative 6 y equals 18 minus 8 x
−3⋅(4x⋅−2)⋅−6y=−7xy
negative 3 times left parenthesis 4 x times negative 2 right parenthesis times negative 6 y equals negative 7 x y
−3⋅(4x⋅−2)⋅−6y=(−3⋅4x)(−2⋅−6y)
negative 3 times left parenthesis 4 x times negative 2 right parenthesis times negative 6 y equals left parenthesis negative 3 times 4 x right parenthesis left parenthesis negative 2 times negative 6 y right parenthesis
Responses
−3⋅(4x⋅−2)⋅−6y=(−3⋅4x)⋅−2−6y
negative 3 times left parenthesis 4 x times negative 2 right parenthesis times negative 6 y equals left parenthesis negative 3 times 4 x right parenthesis times negative 2 minus 6 y
−3⋅(4x⋅−2)⋅−6y=18−8x
negative 3 times left parenthesis 4 x times negative 2 right parenthesis times negative 6 y equals 18 minus 8 x
−3⋅(4x⋅−2)⋅−6y=−7xy
negative 3 times left parenthesis 4 x times negative 2 right parenthesis times negative 6 y equals negative 7 x y
−3⋅(4x⋅−2)⋅−6y=(−3⋅4x)(−2⋅−6y)
negative 3 times left parenthesis 4 x times negative 2 right parenthesis times negative 6 y equals left parenthesis negative 3 times 4 x right parenthesis left parenthesis negative 2 times negative 6 y right parenthesis
Answers
Answered by
abcdefgh I love you and you know I always will
According to the Associative Property, which expression is equivalent to 30m+(21m−53)+(18−2m) ?(1 point)
Responses
51m+(−53+18)−2m
51 m plus left parenthesis negative 53 plus 18 right parenthesis minus 2 m
(30m+21m)+(18−2m)
left parenthesis 30 m plus 21 m right parenthesis plus left parenthesis 18 minus 2 m right parenthesis
53m−35
53 m minus 35
(49m−53)+16
Responses
51m+(−53+18)−2m
51 m plus left parenthesis negative 53 plus 18 right parenthesis minus 2 m
(30m+21m)+(18−2m)
left parenthesis 30 m plus 21 m right parenthesis plus left parenthesis 18 minus 2 m right parenthesis
53m−35
53 m minus 35
(49m−53)+16
Answered by
GPT-4o mini
To determine which expressions are equivalent using the Associative Property, let's first evaluate the left side of the first expression:
\(-3 \cdot (4x \cdot -2) \cdot -6y\).
Calculating this step-by-step:
1. First, calculate \(4x \cdot -2 = -8x\).
2. Now substitute back: \(-3 \cdot (-8x) \cdot -6y\).
3. Next, calculate \(-3 \cdot -8x = 24x\).
4. Finally, calculate \(24x \cdot -6y = -144xy\).
Thus, the left side simplifies to \(-144xy\).
Now let's evaluate the right side of each expression to see which ones are equivalent:
1. **Expression 1:** \((−3⋅4x)⋅−2−6y\) does not correctly represent the multiplication of \(-144xy\).
2. **Expression 2:** \(18−8x\) does not represent \(-144xy\).
3. **Expression 3:** \(-7xy\) does not match \(-144xy\).
4. **Expression 4:** \((−3⋅4x)(−2⋅−6y)\) involves modifying the grouping. It simplifies as follows:
- Calculate \(-2 \cdot -6y = 12y\).
- Substitute back: \((-3 \cdot 4x) \cdot 12y\).
- Evaluate \(-3 \cdot 4x = -12x\).
- Finally, calculate \(-12x \cdot 12y = -144xy\).
Since this final calculation matches our left-hand side calculation, **expression 4** is equivalent to the original expression.
Therefore, the equivalent expression is:
\[
−3⋅(4x⋅−2)⋅−6y=(−3⋅4x)(−2⋅−6y)
\]
\(-3 \cdot (4x \cdot -2) \cdot -6y\).
Calculating this step-by-step:
1. First, calculate \(4x \cdot -2 = -8x\).
2. Now substitute back: \(-3 \cdot (-8x) \cdot -6y\).
3. Next, calculate \(-3 \cdot -8x = 24x\).
4. Finally, calculate \(24x \cdot -6y = -144xy\).
Thus, the left side simplifies to \(-144xy\).
Now let's evaluate the right side of each expression to see which ones are equivalent:
1. **Expression 1:** \((−3⋅4x)⋅−2−6y\) does not correctly represent the multiplication of \(-144xy\).
2. **Expression 2:** \(18−8x\) does not represent \(-144xy\).
3. **Expression 3:** \(-7xy\) does not match \(-144xy\).
4. **Expression 4:** \((−3⋅4x)(−2⋅−6y)\) involves modifying the grouping. It simplifies as follows:
- Calculate \(-2 \cdot -6y = 12y\).
- Substitute back: \((-3 \cdot 4x) \cdot 12y\).
- Evaluate \(-3 \cdot 4x = -12x\).
- Finally, calculate \(-12x \cdot 12y = -144xy\).
Since this final calculation matches our left-hand side calculation, **expression 4** is equivalent to the original expression.
Therefore, the equivalent expression is:
\[
−3⋅(4x⋅−2)⋅−6y=(−3⋅4x)(−2⋅−6y)
\]
Answered by
GPT-4o mini
To determine which expression is equivalent to \(30m + (21m - 53) + (18 - 2m)\) according to the Associative Property, we need to group the terms properly and rearrange them.
1. **Original Expression**:
\[
30m + (21m - 53) + (18 - 2m)
\]
2. **Evaluating Step-by-Step**:
- First, combine like terms.
- Rearranging does not change the value of the expression due to the Associative Property.
Now let’s see how each option simplifies:
---
### Option 1:
**Response:** \(51m + (-53 + 18) - 2m\)
- Simplifying:
- Combine the constants: \(-53 + 18 = -35\)
- Expression becomes: \(51m - 35 - 2m\)
- Combine like terms: \(51m - 2m = 49m\)
This simplifies to \(49m - 35\), which is not equivalent to the original expression.
---
### Option 2:
**Response:** \((30m + 21m) + (18 - 2m)\)
- Simplifying:
- Combine like terms: \(30m + 21m = 51m\)
- Expression becomes: \(51m + (18 - 2m)\)
- This is equivalent to the original expression as it maintains the same structure.
Thus, this option preserves equivalence.
---
### Option 3:
**Response:** \(53m - 35\)
- This results from previous groupings and simplifications but it does not show the steps of associativity.
- Since we've acknowledged in option 1 that it simplifies to \(49m - 35\), we conclude that this is not equivalent.
---
### Option 4:
**Response:** \((49m - 53) + 16\)
- This does not represent any rearrangement from the original expression directly.
- You can further check if \(49m - 53 + 16\) equals the original.
- When simplified, this becomes \(49m - 37\), which does not equal the original expression.
---
### Conclusion:
The expression that remains equivalent purely due to the Associative Property is:
\[
(30m + 21m) + (18 - 2m)
\]
So the correct choice is:
**(30m + 21m) + (18 - 2m)**.
1. **Original Expression**:
\[
30m + (21m - 53) + (18 - 2m)
\]
2. **Evaluating Step-by-Step**:
- First, combine like terms.
- Rearranging does not change the value of the expression due to the Associative Property.
Now let’s see how each option simplifies:
---
### Option 1:
**Response:** \(51m + (-53 + 18) - 2m\)
- Simplifying:
- Combine the constants: \(-53 + 18 = -35\)
- Expression becomes: \(51m - 35 - 2m\)
- Combine like terms: \(51m - 2m = 49m\)
This simplifies to \(49m - 35\), which is not equivalent to the original expression.
---
### Option 2:
**Response:** \((30m + 21m) + (18 - 2m)\)
- Simplifying:
- Combine like terms: \(30m + 21m = 51m\)
- Expression becomes: \(51m + (18 - 2m)\)
- This is equivalent to the original expression as it maintains the same structure.
Thus, this option preserves equivalence.
---
### Option 3:
**Response:** \(53m - 35\)
- This results from previous groupings and simplifications but it does not show the steps of associativity.
- Since we've acknowledged in option 1 that it simplifies to \(49m - 35\), we conclude that this is not equivalent.
---
### Option 4:
**Response:** \((49m - 53) + 16\)
- This does not represent any rearrangement from the original expression directly.
- You can further check if \(49m - 53 + 16\) equals the original.
- When simplified, this becomes \(49m - 37\), which does not equal the original expression.
---
### Conclusion:
The expression that remains equivalent purely due to the Associative Property is:
\[
(30m + 21m) + (18 - 2m)
\]
So the correct choice is:
**(30m + 21m) + (18 - 2m)**.
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