Question
It cost Angel $6.75 to send 75 text messages. How much does it cost to send one text?
Answers
Answer
Aubree practices the piano 1197 minutes in 3 weeks. At what rate did she practice, in minutes per day?
Answer
Nathan practices the piano 1260 minutes in 3 weeks. At what rate did she practice, in minutes per day?
Answer
At the neighborhood grocery, 0, point, 50.5 pounds of salmon cost dollar sign, 3, point, 4, 5$3.45. Gianna spent dollar sign, 19, point, 3, 2$19.32 on salmon. How many pounds of salmon did she buy, to the nearest hundredth of a pound?
Answered by
GPT 3.5
To find the cost of sending one text message, you would divide the total cost by the number of text messages sent:
$6.75 ÷ 75 messages = $0.09 per text message
Therefore, it costs $0.09 to send one text message.
$6.75 ÷ 75 messages = $0.09 per text message
Therefore, it costs $0.09 to send one text message.
Answered by
GPT 3.5
To find the rate at which Aubree practiced the piano in minutes per day, you would divide the total number of practice minutes by the total number of days she practiced:
3 weeks = 7 days/week x 3 = 21 days
Rate = 1197 minutes ÷ 21 days = 57 minutes per day
Therefore, Aubree practiced the piano at a rate of 57 minutes per day.
3 weeks = 7 days/week x 3 = 21 days
Rate = 1197 minutes ÷ 21 days = 57 minutes per day
Therefore, Aubree practiced the piano at a rate of 57 minutes per day.
Answered by
GPT 3.5
To find the rate at which Nathan practiced the piano in minutes per day, you would divide the total number of practice minutes by the total number of days he practiced:
3 weeks = 7 days/week x 3 = 21 days
Rate = 1260 minutes ÷ 21 days = 60 minutes per day
Therefore, Nathan practiced the piano at a rate of 60 minutes per day.
3 weeks = 7 days/week x 3 = 21 days
Rate = 1260 minutes ÷ 21 days = 60 minutes per day
Therefore, Nathan practiced the piano at a rate of 60 minutes per day.
Answered by
GPT 3.5
To find out how many pounds of salmon Gianna bought, we first need to determine the cost per pound:
Cost per pound = Cost / Weight
Cost per pound = $3.45 / 0.50 = $6.90 per pound
Now we can find out how many pounds Gianna bought:
Pounds bought = Total cost / Cost per pound
Pounds bought = $19.32 / $6.90 = 2.80 pounds
Therefore, to the nearest hundredth of a pound, Gianna bought 2.80 pounds of salmon.
Cost per pound = Cost / Weight
Cost per pound = $3.45 / 0.50 = $6.90 per pound
Now we can find out how many pounds Gianna bought:
Pounds bought = Total cost / Cost per pound
Pounds bought = $19.32 / $6.90 = 2.80 pounds
Therefore, to the nearest hundredth of a pound, Gianna bought 2.80 pounds of salmon.
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