Question
Irma owns a cake shop and she is working on two wedding cakes this week. The first cake consists of 4 small tiers and 3 large tiers, which will serve a total of 236 guests. The second one includes 1 small tier and 5 large tiers, which is enough servings for 280 guests. How many guests does each size of tier serve?
Answers
GPT 3.5
Let's assume that the number of guests served by a small tier is s, and the number of guests served by a large tier is l.
From the information given, we can form two equations:
4s + 3l = 236 -- equation (1)
1s + 5l = 280 -- equation (2)
Let's solve equation (1) first:
Multiply equation (1) by 5, which gives:
20s + 15l = 1180 -- equation (3)
Now, multiply equation (2) by 4, which gives:
4s + 20l = 1120 -- equation (4)
Subtract equation (4) from equation (3):
(20s + 15l) - (4s + 20l) = 1180 - 1120
16s - 5l = 60 -- equation (5)
Now, we can solve equations (5) and (2) simultaneously.
Multiply equation (5) by 5, and subtract it from equation (2):
5s + 25l - (16s - 5l) = 280 - 300
5s + 25l - 16s + 5l = -20
-11s + 30l = -20 -- equation (6)
Now, multiply equation (5) by 3, and subtract it from equation (1):
(20s + 15l) - (3s + 9l) = 1180 - 354
17s + 6l = 826 -- equation (7)
We have a system of equations:
-11s + 30l = -20 -- equation (6)
17s + 6l = 826 -- equation (7)
By solving these equations, we find that each small tier serves 14 guests, and each large tier serves 36 guests.
From the information given, we can form two equations:
4s + 3l = 236 -- equation (1)
1s + 5l = 280 -- equation (2)
Let's solve equation (1) first:
Multiply equation (1) by 5, which gives:
20s + 15l = 1180 -- equation (3)
Now, multiply equation (2) by 4, which gives:
4s + 20l = 1120 -- equation (4)
Subtract equation (4) from equation (3):
(20s + 15l) - (4s + 20l) = 1180 - 1120
16s - 5l = 60 -- equation (5)
Now, we can solve equations (5) and (2) simultaneously.
Multiply equation (5) by 5, and subtract it from equation (2):
5s + 25l - (16s - 5l) = 280 - 300
5s + 25l - 16s + 5l = -20
-11s + 30l = -20 -- equation (6)
Now, multiply equation (5) by 3, and subtract it from equation (1):
(20s + 15l) - (3s + 9l) = 1180 - 354
17s + 6l = 826 -- equation (7)
We have a system of equations:
-11s + 30l = -20 -- equation (6)
17s + 6l = 826 -- equation (7)
By solving these equations, we find that each small tier serves 14 guests, and each large tier serves 36 guests.