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Which equations represent proportional relationships? Select all that apply. Responses 43=812 4 thirds is equal to 8 over 12 11...Question
Which equations represent proportional relationships?
Select all that apply.
Responses
43=812
4 thirds is equal to 8 over 12
11x4=16.5x6
11 x over 4 is equal to 16 point 5 x over 6
12=918
1 half is equal to 9 over 18
5x6.5=4x5.2
5 x over 6 point 5 is equal to 4 x over 5 point 2
which one is the clostest answer
Select all that apply.
Responses
43=812
4 thirds is equal to 8 over 12
11x4=16.5x6
11 x over 4 is equal to 16 point 5 x over 6
12=918
1 half is equal to 9 over 18
5x6.5=4x5.2
5 x over 6 point 5 is equal to 4 x over 5 point 2
which one is the clostest answer
Answers
There are no human answers yet.
Answered by
GPT-4o mini
To determine which equations represent proportional relationships, we need to examine if the two sides of each equation maintain a consistent ratio.
1. **43 = 812**: This does not represent a proportional relationship since the numbers are not in a consistent ratio.
2. **4/3 = 8/12**: This simplifies to \(4/3 = 2/3\) (since \(8/12\) reduces to \(2/3\)). This is not a valid equation, therefore not proportional.
3. **11x4 = 16.5x6**: If we divide both sides by \(x\) (assuming \(x \neq 0\)), we get the ratio \(11/16.5 = 6/4\). This simplifies to \(11/16.5 = 2/3\), which is not equal. Hence, this does not represent a proportional relationship.
4. **12 = 918**: This does not represent a proportional relationship since the numbers are not in a consistent ratio.
5. **5x6.5 = 4x5.2**: If we divide both sides by \(x\) (assuming \(x \neq 0\)), we are left with \(5/5.2 = 4/6.5\). This can be checked for equality and can be found to be consistent.
Based on this analysis:
- The example which represents a proportional relationship is **5x6.5 = 4x5.2**.
The other equations do not establish a proportional relationship. Therefore, the **closest answer** is **5x6.5 = 4x5.2**.
1. **43 = 812**: This does not represent a proportional relationship since the numbers are not in a consistent ratio.
2. **4/3 = 8/12**: This simplifies to \(4/3 = 2/3\) (since \(8/12\) reduces to \(2/3\)). This is not a valid equation, therefore not proportional.
3. **11x4 = 16.5x6**: If we divide both sides by \(x\) (assuming \(x \neq 0\)), we get the ratio \(11/16.5 = 6/4\). This simplifies to \(11/16.5 = 2/3\), which is not equal. Hence, this does not represent a proportional relationship.
4. **12 = 918**: This does not represent a proportional relationship since the numbers are not in a consistent ratio.
5. **5x6.5 = 4x5.2**: If we divide both sides by \(x\) (assuming \(x \neq 0\)), we are left with \(5/5.2 = 4/6.5\). This can be checked for equality and can be found to be consistent.
Based on this analysis:
- The example which represents a proportional relationship is **5x6.5 = 4x5.2**.
The other equations do not establish a proportional relationship. Therefore, the **closest answer** is **5x6.5 = 4x5.2**.
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