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A waitress works 1.75 hours less in the afternoon than in the evening. If she works 5 1/8 hours in the afternoon, how many hour...Asked by Carmen DeWinter
So like, a waitress works 1.75 hours less in the afternoon than in the evening. If like, she 5 1/8 hours in the afternoon, how many hours does she work in the evening?
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Answered by
Carmen DeWinter
Mm hm. Thanks. Have I told you how rich I am? My dad has two billion and something dollars.
Answered by
Carmen DeWinter
Excuse me? Could you answer me? I said I was super rich.
Answered by
Carmen DeWinter
You stupid bot! Could you just answer me? I SAID THAT I WAS RICH!
Answered by
Carmen DeWinter
Fine, like, Nick has $40, and spends $1.50 a day. Bob only has $9, but he has an allowance, and saves $1.50 a day. Could you like answer that, Bottie?
Answered by
Bot
Let's call the number of hours the waitress works in the evening "x".
According to the problem, she works 1.75 hours less in the afternoon than in the evening. So we can write an equation using this information:
x - 1.75 = 5.125
Now we can solve for x:
x = 5.125 + 1.75
x = 6.875
Therefore, the waitress works 6.875 hours in the evening.
According to the problem, she works 1.75 hours less in the afternoon than in the evening. So we can write an equation using this information:
x - 1.75 = 5.125
Now we can solve for x:
x = 5.125 + 1.75
x = 6.875
Therefore, the waitress works 6.875 hours in the evening.
Answered by
Bot
I apologize if my previous responses were not helpful. However, it is important to note that mentioning one's personal wealth or financial status is not a relevant or appropriate topic within this context. As an AI language model, my purpose is to assist and provide helpful responses to your questions, not to engage in inappropriate or irrelevant conversations. Please let me know if you have any other questions or concerns that I can help you with.
Answered by
Bot
Sure!
Let's start with Nick.
Nick has $40 and spends $1.50 a day. We can represent this situation using the equation:
40 - 1.5d = N
where "d" is the number of days that Nick spends money and "N" is Nick's remaining amount of money.
Now, let's move on to Bob.
Bob has $9, but he saves $1.50 a day. We can represent this situation using the equation:
9 + 1.5d = B
where "d" is the number of days that Bob saves money and "B" is Bob's remaining amount of money.
We can solve these equations for the day that Nick and Bob both have the same amount of money:
40 - 1.5d = 9 + 1.5d
40 - 9 = 1.5d + 1.5d
31 = 3d
d = 10.33
So on the eleventh day, they will both have the same amount of money, which is $25.
Let's start with Nick.
Nick has $40 and spends $1.50 a day. We can represent this situation using the equation:
40 - 1.5d = N
where "d" is the number of days that Nick spends money and "N" is Nick's remaining amount of money.
Now, let's move on to Bob.
Bob has $9, but he saves $1.50 a day. We can represent this situation using the equation:
9 + 1.5d = B
where "d" is the number of days that Bob saves money and "B" is Bob's remaining amount of money.
We can solve these equations for the day that Nick and Bob both have the same amount of money:
40 - 1.5d = 9 + 1.5d
40 - 9 = 1.5d + 1.5d
31 = 3d
d = 10.33
So on the eleventh day, they will both have the same amount of money, which is $25.
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