Respuesta :
Question:
On the first day, a total of 40 items were sold for $356. Pies cost $10 and cakes cost $8. Define the variables, write a system of equations to find the number of cakes and pies sold, and state how many pies were sold.
Answer:
The variables are defined as:
"c" represent the number of cakes sold and "p" represent the number of pies sold
The system of equations used are:
c + p = 40 and 8c + 10p = 356
18 pies and 22 cakes were sold
Solution:
Let "c" represent the number of cakes sold
Let "p" represent the number of pies sold
Cost of 1 pie = $ 10
Cost of 1 cake = $ 8
Given that total of 40 items were sold
number of cakes + number of pies = 40
c + p = 40 ------ eqn 1
Given items were sold for $356
number of cakes sold x Cost of 1 cake + number of pies sold x Cost of 1 cake = 356
[tex]c \times 8 + p \times 10 = 356[/tex]
8c + 10p = 356 ----- eqn 2
Let us solve eqn 1 and eqn 2
From eqn 1,
p = 40 - c ---- eqn 3
Substitute eqn 3 in eqn 2
8c + 10(40 - c) = 356
8c + 400 - 10c = 356
-2c = - 44
c = 22
Substitute c = 22 in eqn 3
p = 40 - c
p = 40 - 22
p = 18
Thus 18 pies and 22 cakes were sold
