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------------------------------------------------ The coach took his soccer team for ice cream to celebrate their win. The single-scoop ice cream cones were $2.75, and the double-scoop ice cream cones were $5.25. The coach bought 15 ice cream cones and spent a total of $61.25. How many double-scoop ice cream cones did he buy?

The coach bought 8 double-scoop ice cream cones. This was determined by setting up a system of equations using the prices and total amount spent and solving for the number of double-scoop cones.

We know that the coach bought 15 ice cream cones in total and spent $61.25. Let's say the number of single-scoop cones is 's' and the number of double-scoop cones is 'd'.

We can write two equations based on the above information:

1. s + d = 15 (total number of cones)

2. 2.75s + 5.25d = 61.25 (total cost of the cones)

From the first equation, we can express 's' as 's = 15 - d'. Substitute that into the second equation, we get:
2.75(15-d) + 5.25d = 61.25.
Expanding and simplifying:
41.25 + 2.5d = 61.25,
which gives us:
2.5d = 20,
and dividing both sides by 2.5 yields:
d = 8.

Therefore, the coach bought 8 double-scoop ice cream cones.

sftgffghhh sftgffghhh · Answer 2 · 2024-10-29T17:25:07-04:00

sftgffghhh sftgffghhh

29-10-2024

Answer:

5

Step-by-step explanation:

I tried to do it in my head.

Sorry if it wrong

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