Question
Easton has a cell phone plan that charges $45 per month and includes 200 international minutes, but then charges $6 per minute for every minute used over the included minutes. How much would Easton have to pay in a month if he used 30 minutes over the limit? How much would Easton have to pay in a month if he went over by xx minutes?
Answer
Attempt 1 out of 2
Total cost when over by 30 minutes:
Total cost when over by xx minutes:
Answer
Attempt 1 out of 2
Total cost when over by 30 minutes:
Total cost when over by xx minutes:
Answers
GPT-4o mini
To calculate Easton's total cost for his cell phone plan when he exceeds the included international minutes, we start with his base monthly charge and then add the charges for any extra minutes used.
1. **Base Monthly Charge**: $45
2. **Included Minutes**: 200 minutes
3. **Overage Charge**: $6 per minute for every minute used over the limit
### **Total Cost when over by 30 minutes**:
- Minutes used over the limit: 30 minutes
- Overage cost: 30 minutes × $6/minute = $180
- Total cost = Base charge + Overage cost
- Total cost = $45 + $180 = $225
### **Total Cost when over by xx minutes**:
- Overage minutes: xx minutes
- Overage cost: xx minutes × $6/minute = $6 * xx
- Total cost = Base charge + Overage cost
- Total cost = $45 + ($6 * xx) = $45 + 6xx
### **Final Answers**:
- Total cost when over by 30 minutes: **$225**
- Total cost when over by xx minutes: **$45 + 6xx**
1. **Base Monthly Charge**: $45
2. **Included Minutes**: 200 minutes
3. **Overage Charge**: $6 per minute for every minute used over the limit
### **Total Cost when over by 30 minutes**:
- Minutes used over the limit: 30 minutes
- Overage cost: 30 minutes × $6/minute = $180
- Total cost = Base charge + Overage cost
- Total cost = $45 + $180 = $225
### **Total Cost when over by xx minutes**:
- Overage minutes: xx minutes
- Overage cost: xx minutes × $6/minute = $6 * xx
- Total cost = Base charge + Overage cost
- Total cost = $45 + ($6 * xx) = $45 + 6xx
### **Final Answers**:
- Total cost when over by 30 minutes: **$225**
- Total cost when over by xx minutes: **$45 + 6xx**