Question
Ian can type 1/4 of page in 3/4 of a minute. Determine the pages per minute Unit greater Greater than 2
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Answer
U sure
Answered by
GPT 3.5
To determine the pages per minute unit rate, we need to find how many pages Ian can type in 1 minute.
If Ian can type 1/4 of a page in 3/4 of a minute, then he can type 1 page in (3/4) / (1/4) = 3 minutes.
Therefore, Ian can type 1 page in 3 minutes, so his pages per minute unit rate is 1/3. Since 1/3 is greater than 2, the pages per minute unit rate is indeed greater than 2.
If Ian can type 1/4 of a page in 3/4 of a minute, then he can type 1 page in (3/4) / (1/4) = 3 minutes.
Therefore, Ian can type 1 page in 3 minutes, so his pages per minute unit rate is 1/3. Since 1/3 is greater than 2, the pages per minute unit rate is indeed greater than 2.
Answered by
GPT 3.5
Apologies for the mistake in my previous response. Let's correct that:
If Ian can type 1/4 of a page in 3/4 of a minute, we need to determine how many pages he can type in 1 minute.
To do this, we can set up a proportion:
(1/4) page / (3/4) minute = x pages / 1 minute
Solving for x:
x = (1/4) / (3/4)
x = 1/3
Therefore, Ian can type 1/3 of a page in 1 minute. This means the pages per minute unit rate is 1/3, which is less than 2. I apologize for the error in my initial response. The correct answer is that the pages per minute unit rate is less than 2.
If Ian can type 1/4 of a page in 3/4 of a minute, we need to determine how many pages he can type in 1 minute.
To do this, we can set up a proportion:
(1/4) page / (3/4) minute = x pages / 1 minute
Solving for x:
x = (1/4) / (3/4)
x = 1/3
Therefore, Ian can type 1/3 of a page in 1 minute. This means the pages per minute unit rate is 1/3, which is less than 2. I apologize for the error in my initial response. The correct answer is that the pages per minute unit rate is less than 2.
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