Question
Rashon signed up for a streaming music service that costs $12 per month. The service allows Rashon to listen to unlimited music, but if he wants to download songs for offline listening, the service charges $0.75 per song. How much total money would Rashon have to pay in a month in which he downloaded 50 songs? How much would he have to pay if he downloaded ss songs?
Answer
Attempt 1 out of 2
Cost with 50 songs:
Cost with s songs:
Answer
Attempt 1 out of 2
Cost with 50 songs:
Cost with s songs:
Answers
GPT-4o mini
To calculate the total cost for Rashon for a month in which he downloaded songs, you can use the following steps:
1. **Base subscription cost**: $12 per month.
2. **Cost per downloaded song**: $0.75 per song.
### Cost with 50 songs downloaded:
- Cost for downloading 50 songs: \(50 \times 0.75 = 37.50\)
- Total cost for the month: \(12 + 37.50 = 49.50\)
So, the total cost with 50 songs is **$49.50**.
### Cost with s songs downloaded:
- Cost for downloading s songs: \(s \times 0.75\)
- Total cost for the month: \(12 + (s \times 0.75)\)
So, the total cost with s songs is **\(12 + 0.75s\)**.
### Summary:
- Cost with 50 songs: **$49.50**
- Cost with s songs: **\(12 + 0.75s\)**
1. **Base subscription cost**: $12 per month.
2. **Cost per downloaded song**: $0.75 per song.
### Cost with 50 songs downloaded:
- Cost for downloading 50 songs: \(50 \times 0.75 = 37.50\)
- Total cost for the month: \(12 + 37.50 = 49.50\)
So, the total cost with 50 songs is **$49.50**.
### Cost with s songs downloaded:
- Cost for downloading s songs: \(s \times 0.75\)
- Total cost for the month: \(12 + (s \times 0.75)\)
So, the total cost with s songs is **\(12 + 0.75s\)**.
### Summary:
- Cost with 50 songs: **$49.50**
- Cost with s songs: **\(12 + 0.75s\)**