Katrina B.
asked • 09/21/18On the first day of ticket sales, the school sold 3 adult tickets and 9 student tickets for a total of $75. The second day, the school sold $67 by selling 8 adu
On the first day of ticket sales, the school sold 3 adult tickets and 9 student tickets for a total of $75. The second day, the school sold $67 by selling 8 adult and 5 student tickets. What is the price each of one adult and one student ticket?
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2 Answers By Expert Tutors
Charles K. answered • 09/08/19
Tutor
4.9
(226)
Retired College Professor Working With Students At All Levels
A total of 586 people attended a banquet at Disney. A total of $9,423.70 in revenue was collected. Student tickets cost $12.95 and Adult tickets cost $17.95. Find the number of student and adult tickets sold.
Let: Student tickets = S
Let: Adult tickets = A
Given: Student ticket prices = $12.95
Given: Adult ticket prices = $17.95
Given: Total tickets sold = 586
Given: Total revenue = $9,423.70
S + A = 586 (1)
12.95 S + 17.95 A = 9,423.70 (2)
Multiply equation (1) by –12.95
–12.95 S – 12.95 A = –12.95 (586)
12.95 S + 17.95 A = 9,423.70
–12.95 S – 12.95 A = –7,588.70
12.95 S + 17.95 A = 9,423.70
Add the two equations together. The S variables will drop out. That will leave us with A variables only. We then solve for A and substitute and solve for S.
5A = 1,835
Divide through by 5
A = 367 Adult tickets sold
Now substitute 367 for A and solve for S.
S + A = 586
S + 367 = 586
S = 219 Student tickets sold
Check 1
S + A = 586
219 + 367 = 586
586 = 586 Check
Check 2
12.95 S + 17.95 A = 9,423.70
12.95 (219) + 17.95 (367) = 9,423.70
2,836.05 + 6,587.65 = 9,423.70
9,423.70 = 9,423.70 Check
The final answer is, there were 219 Student tickets sold and 367 Adult tickets sold.
.
David M. answered • 09/21/18
Tutor
4.8
(122)
Dave "The Math Whiz"
We have 2 unknowns, the cost of adult tickets and the cost of student tickets. Therefore, we need 2 equations to solve for this.
Let's let x = the cost of an adult ticket
y = the cost of a student ticket
Eq. I On the first day, the number of adult tickets times the cost of an adult ticket plus the number of student tickets times the cost of a student tickets has to equal 75.
3x + 9y = 75
Eq. II Likewise, on the second day the number of adult tickets times the cost of an adult ticket plus the number of student tickets times the cost of a student ticket has to equal 67.
8x + 5y =67
We can use either the substitution or elimination methods to solve this. Let's use substitution. In Eq. I we can simplify it by dividing everything by 3:
3x + 9y = 75 Eq. I
(3x/3) + (9y/3) = 75/3 divide all by 3
x + 3y = 25 simplify
x = 25 - 3y isolate x
Using this value for x we can substitute it in Eq. II and solve for y:
8x + 5y = 67 Eq. II
8(25-3y) + 5y = 67 substitute for x
200-24y + 5y =67 simplify
200-67 = 24y-5y combine like terms
133 = 19y simplify
133/9 = y divide both sides to isolate y
7 = y answer
Use this value for y in either equation and solve for x. Let's use Eq. I:
3x + 9y = 75 Eq. I
3x +(9)(7) = 75 substitute for y
3x + 63 = 75 simplify
3x = 75 - 63 isolate x term
3x = 12 simplify
x = 4 answer
We have x = 4 and y = 7. Let's check our answers by putting these values in for each equation:
Eq. I 3x + 9y = 75
3(4) + 9(7) = 75
12 + 63 = 75
75 = 75
Check
Eq. II 8x + 5y = 67
8(4) + 5(7) = 67
32 + 35 = 67
67 = 67
Check
The cost of an adult ticket is $4 and the cost of a student ticket is $7.
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Katrina B.
09/21/18