A total of 54 adults and students show up for the play. Adult tickets cost $8 and kid tickets cost $5 and the total money collected
was $360. How many of each type of ticket were sold?
It’s using substitution or elimination to find the number of kids and adults. Really need help!!

If find that "substitution" works well for "mixture" problems like this. Usually, you will want to substitute for the lower-priced item, so that you're solving for the number of higher-priced items.

Let "a" and "k" stand for the number of adult and kid tickets, respectively.

a + k = 54 . . . . . . total number of tickets sold

8a +5k = 360 . . . total revenue

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To substitute for k, we solve the first equation for k:

k = 54 -a

Now, we substitute that into the second equation:

8a +5(54 -a) = 360

3a = 90 . . . . . . . . . . . subtract 270 from both sides; collect terms

a = 30 . . . . . . . . . . . . divide by 3

k = 54 -30 = 24 . . . . . use the above formula for k

The number of kids was 24; the number of adults was 30.

A total of 54 adults and students show up for the play. Adult tickets cost $8 and kid tickets cost $5 and the total money collected was $360. How many of each type of ticket were sold? It’s using substitution or elimination to find the number of kids and adults. Really need help!!

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A total of 54 adults and students show up for the play. Adult tickets cost $8 and kid tickets cost $5 and the total money collected
was $360. How many of each type of ticket were sold?
It’s using substitution or elimination to find the number of kids and adults. Really need help!!