The cost of one drink is $2.50 and cost of one popcorn is $3.75
Explanation
Suppose, the cost of one drink is [tex]x[/tex] dollar and cost of one popcorn is [tex]y[/tex] dollar.
Given that, total cost for 2 drinks and 2 popcorns is $12.50 and total cost for 6 drinks and 5 popcorns is $33.75
So, the system of equations will be......
[tex]2x+2y=12.50 ..................................... (1)\\ \\ 6x+5y= 33.75 ..................................... (2)[/tex]
Multiplying equation (1) by -3 , we will get.....
[tex]-3(2x+2y)=-3(12.50)\\ \\ -6x-6y=-37.50 ..................................... (3)[/tex]
Now, adding equation (2) and equation (3) , we will get ............
[tex]5y-6y=33.75-37.50\\ \\ -y=-3.75\\ \\ y=3.75[/tex]
Plugging this [tex]y=3.75[/tex] into equation (1) ......
[tex]2x+2(3.75)=12.50\\ \\ 2x+7.50=12.50\\ \\ 2x=12.50-7.50=5\\ \\ x=\frac{5}{2}=2.50[/tex]
So, the cost of one drink is $2.50 and cost of one popcorn is $3.75
