Answer:
[tex]\large\boxed{\large\boxed{\text{54 lattes were sold}}}[/tex]
Explanation:
This is a typical problem to solve with a system of two linear equations.
1. Name the variables:
2. First equation:
- Lattes for $4 ⇒ sale from L lattes = 4L
- Cappuccinos for $3. ⇒ sale fro C cappuccinos = 3C
- Last Friday, the sales totaled $252 ⇒ 4L + 3C = 252
First equation: 4L + 3C = 252
3. Second equation:
- The number of lattes sold was 6 more than 4 times the number of cappuccinos ⇒L = 6 + 4C
Second equation: L = 6 + 4C
4. Solve the system:
Substitute L on the first equation with 6 + 4C
Solve:
- Distributive property: 24 + 16C + 3C= 252
- Add like terms: 24 + 19C = 252
- Subtraction property of equalities: 19C = 252 - 24
- Do the operation: 19C = 228
- Division property of equalities: C = 228 / 19
Subsitute C = 12 in L = 6 + 4C
- L = 6 + 4(12) = 6+ 48 = 54
Answer: 54 lattes were sold
