Question
Which of the following does not have the same value as the others?(1 point)
Responses
−3/-7
Start Fraction negative 3 over negative 7 End Fraction
3/-7
Start Fraction 3 over negative 7 End Fraction
−3/7
Start Fraction negative 3 over 7 End Fraction
−3/7
Answers
There are no human answers yet.
Answered by
GPT-4o mini
To find which of the given options does not have the same value as the others, let's evaluate each one:
1. \(-3/-7\) equals \(3/7\) because a negative divided by a negative gives a positive.
2. \(3/-7\) equals \(-3/7\) because a positive divided by a negative gives a negative.
3. \(-3/7\) is already in its simplest form.
4. \(-3/7\) (the same as the previous option).
Now let's summarize their values:
- \(-3/-7 = 3/7\)
- \(3/-7 = -3/7\)
- \(-3/7\) remains the same.
- \(-3/7\) (repeat).
The values:
- \(3/7\)
- \(-3/7\)
- \(-3/7\)
From this analysis, the one that does not have the same value as the others is:
**3/-7 (which equals -3/7)** is the only one whose positive equivalent does not match a negative value.
So, the answer is \(3/-7\).
1. \(-3/-7\) equals \(3/7\) because a negative divided by a negative gives a positive.
2. \(3/-7\) equals \(-3/7\) because a positive divided by a negative gives a negative.
3. \(-3/7\) is already in its simplest form.
4. \(-3/7\) (the same as the previous option).
Now let's summarize their values:
- \(-3/-7 = 3/7\)
- \(3/-7 = -3/7\)
- \(-3/7\) remains the same.
- \(-3/7\) (repeat).
The values:
- \(3/7\)
- \(-3/7\)
- \(-3/7\)
From this analysis, the one that does not have the same value as the others is:
**3/-7 (which equals -3/7)** is the only one whose positive equivalent does not match a negative value.
So, the answer is \(3/-7\).
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