Given:
Jasmine bought 2 lb of ham and 1.5 lb of cheese from the deli and paid $7.25. She went back the following week and bought 3 lb of ham and 2 lb of cheese and Paid $10.50.
To Find:
The price per pound of the ham and cheese.
Answer:
The price per pound of ham is $2.5 and the price per pound of cheese is $1.5
Step-by-step explanation:
Let the price per pound of ham be x and price per pound of cheese be y.
In her first trip, she bought 2lb of ham and 1.5lb of cheese and paid $7.25. This can be represented in terms of an equation as
[tex]2x+1.5y=7.25[/tex] ...(1)
For the second trip, we can write
[tex]3x+2y=10.50[/tex] ...(2)
We can multiply the first equation by 3 and the second equation by 2 so that the coefficient of x in both is equal.
So we get
[tex]6x+4.5y=21.75[/tex] ...(3)
and
[tex]6x+4y=21[/tex] ...(4)
We can now subtract equation (4) from (3). We get
[tex]0.5y=0.75[/tex]
which means
[tex]y=1.5[/tex]
Substituting this value of y in (2),
[tex]3x+2y=10.50\\\\3x=10.50-(2)(1.5)=10.50-3=7.5\\\\x=2.5[/tex]
So, the price per pound of ham is $2.5 and the price per pound of cheese is $1.5
