Question
calculate the unit rate: 10/5 mile in every 1/10 hour
Answers
Answer
3/2 mile in every 1/8 hour
Answer
2/5 mile in every 8/10 hour
Answer
5/2 mile in every 1/10 hour
Answer
wrong
Answer
1/10 mile in every 2/5 hour
Answered by
GPT 3.5
To find the unit rate, divide the distance (in this case, 10/5 miles) by the time (in this case, 1/10 hour).
The calculation will be: (10/5 miles) / (1/10 hour)
To divide fractions, you invert the second fraction and then multiply them.
So the unit rate is: (10/5 miles) * (10/1 hour)
This simplifies to: 20 miles per hour
The calculation will be: (10/5 miles) / (1/10 hour)
To divide fractions, you invert the second fraction and then multiply them.
So the unit rate is: (10/5 miles) * (10/1 hour)
This simplifies to: 20 miles per hour
Answered by
GPT 3.5
To find the unit rate, divide the distance (in this case, 3/2 miles) by the time (in this case, 1/8 hour).
The calculation will be: (3/2 miles) / (1/8 hour)
To divide fractions, you invert the second fraction and then multiply them.
So the unit rate is: (3/2 miles) * (8/1 hour)
This simplifies to: 12 miles per hour
The calculation will be: (3/2 miles) / (1/8 hour)
To divide fractions, you invert the second fraction and then multiply them.
So the unit rate is: (3/2 miles) * (8/1 hour)
This simplifies to: 12 miles per hour
Answered by
GPT 3.5
To find the unit rate, divide the distance (in this case, 2/5 mile) by the time (in this case, 8/10 hour).
The calculation will be: (2/5 mile) / (8/10 hour)
To divide fractions, you invert the second fraction and then multiply them.
So the unit rate is: (2/5 mile) * (10/8 hour)
Simplifying the fractions gives us: (1/5 mile) * (5/4 hour)
The unit rate is: 5/20 mile per hour
Simplifying further by dividing both the numerator and denominator by 5:
The unit rate simplifies to: 1/4 mile per hour
The calculation will be: (2/5 mile) / (8/10 hour)
To divide fractions, you invert the second fraction and then multiply them.
So the unit rate is: (2/5 mile) * (10/8 hour)
Simplifying the fractions gives us: (1/5 mile) * (5/4 hour)
The unit rate is: 5/20 mile per hour
Simplifying further by dividing both the numerator and denominator by 5:
The unit rate simplifies to: 1/4 mile per hour
Answered by
GPT 3.5
To find the unit rate, divide the distance (in this case, 5/2 mile) by the time (in this case, 1/10 hour).
The calculation will be: (5/2 mile) / (1/10 hour)
To divide fractions, you invert the second fraction and then multiply them.
So the unit rate is: (5/2 mile) * (10/1 hour)
This simplifies to: 25/2 mile per hour
To further simplify, you can divide both the numerator and denominator by 2:
The unit rate is: 12.5 mile per hour.
The calculation will be: (5/2 mile) / (1/10 hour)
To divide fractions, you invert the second fraction and then multiply them.
So the unit rate is: (5/2 mile) * (10/1 hour)
This simplifies to: 25/2 mile per hour
To further simplify, you can divide both the numerator and denominator by 2:
The unit rate is: 12.5 mile per hour.
Answered by
GPT 3.5
Apologies for the incorrect response.
To find the unit rate, divide the distance (in this case, 5/2 mile) by the time (in this case, 1/10 hour).
The calculation will be: (5/2 mile) ÷ (1/10 hour)
To divide fractions, you invert the second fraction and then multiply them.
So the unit rate is: (5/2 mile) × (10/1 hour)
This simplifies to: (5/2) × 10 = 50/2 = 25 mile per hour.
Therefore, the correct unit rate is 25 miles per hour.
To find the unit rate, divide the distance (in this case, 5/2 mile) by the time (in this case, 1/10 hour).
The calculation will be: (5/2 mile) ÷ (1/10 hour)
To divide fractions, you invert the second fraction and then multiply them.
So the unit rate is: (5/2 mile) × (10/1 hour)
This simplifies to: (5/2) × 10 = 50/2 = 25 mile per hour.
Therefore, the correct unit rate is 25 miles per hour.
Answered by
GPT 3.5
To find the unit rate, divide the distance (in this case, 1/10 mile) by the time (in this case, 2/5 hour).
The calculation will be: (1/10 mile) / (2/5 hour)
To divide fractions, you invert the second fraction and then multiply them.
So the unit rate is: (1/10 mile) * (5/2 hour)
Simplifying the fractions gives us: (1/10) * (5/2) = 5/20
The unit rate simplifies to: 1/4 mile per hour
The calculation will be: (1/10 mile) / (2/5 hour)
To divide fractions, you invert the second fraction and then multiply them.
So the unit rate is: (1/10 mile) * (5/2 hour)
Simplifying the fractions gives us: (1/10) * (5/2) = 5/20
The unit rate simplifies to: 1/4 mile per hour
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