answersLogoWhite

0


Top Answer
User Avatar
Wiki User
Answered 2009-09-29 22:41:34

Your question lacks the info necessary to answer it.

How many tickets were sold in total?

What percentage of either student or adult tickets sales were sold?

Your question cannot be answered as written.

001
๐Ÿ™
0
๐Ÿคจ
0
๐Ÿ˜ฎ
0
๐Ÿ˜‚
0
User Avatar

Your Answer

Loading...

Still have questions?

Related Questions

A total of 725 tickets were sold for the school play There were 75 more student tickets sold than adult tickets How many adult tickets were sold?

325 Tickets sold to adults 400 tickets sold to students


A total of 700 tickets were sold for the school play There were 50 more student tickets sold than adult tickets How many adult tickets were sold?

700/2 = 350350 - 25 = 325325 adult tickets700 - 325 = 375375 kids tickets


The tickets for a movie were 10 for an adult and 4 for a student. Find the total income from the sale of 87 adult tickets and 135 student tickets?

870 + 540 = 1410


19 At a local theater adult tickets cost 8 and student tickets cost 5 At a recent show 500 tickets were sold for a total of 3475 How many adult tickets were sold?

Adults: 325 Student: 175


At a local theatre adult tickets cost 8 and student tickets cost 5 at a recent show 500 were sold for a total of 3475 how many adult tickets were sold?

answer is 325 adult tickets were sold ( fmtickets.com )


Adult tickets for a game cost 4 each and student tickets cost 2 each total of 920 tickets worth 2446 were sold how many student tickets were sold?

If A is number of adult tickets, and B is number of student tickets, we get a system of two equations for two unknowns: 4A+2B=2446 A+B=920 By solving this system, we obtain B=617


Sold 325 tickets to a game Adult tickets were 5 each and student tickets were 2 each How many of each type of ticket were sold is 995 was made?

Let A be the number of adult tickets sold. As 325 tickets in total were sold, the number sold to students was 325 - A. The income from the sale of adult tickets = A x 5 = 5A The income from the sale of student tickets = (325 - A) x 2 = 650 - 2A Total Income = 995 = 5A + 650 - 2A = 3A + 650 3A = 995 - 650 = 345 A = 115, therefore S = 325 - 115 = 210. 115 Adult tickets were sold and 210 Student tickets.


At a local theater adult tickets cost 8 and student tickets cost 5 At a recent show 500 tickets were sold for a total of 3475 How many adult tickets were sold?

a=# of adult tickets, s=# of student tickets 8a+5s=3475 a+s=500 Solve for s in this equation: s=500-a Now substitute 500-a in for s in the equation 8a+5s=3475: 8a+5(500-a)=3475 8a+2500-5a=3475 3a=975 a=325 ans. There were 325 adult tickets sold.


Two hundred tickets for the school play were sold Tickets cost 2 for students and 3 for adults The total amount collected was 490 How many student tickets were sold?

110


Two hundred tickets for the school play were sold tickets cost 2 for students and 3 for adults the total amount collected w 490 how many student tickets sold?

110 students, 90 adults.


A total of 237 tickets were sold for a school play if twice as many kids tickets were sold than adults how many adult tickets were sold?

237/3= 79 so 79 goes into 237 3 times which means if we add 79 together we would get the number of kids tickets sold and the remaining 79 would be adult tickets sold 79+79=158 158 kids tickets were sold 79 adult tickets were sold


At a local theater adult tickets cost 8 and student tickets cost 5 At a recent show 500 tickets were sold for a total of 475 How many adult tickets were sold?

Something is wrong with the math here, if you sold each ticket for only a dollar each, you should have at least 500 dollars but you only have 475. I think someone is flagrantly skimming money in your boxoffice.


Admission tickets to a motion pictures theater were priced at 4 for adults and 3 for students If 810 tickets were sold and total recipients were 2853 how many of each type of ticket were sold?

x=adult y=student x+y=810 4x+3y=2853 3240-y=2853 y=387 x=423 check: 4*423=1692 3*387=1161 add together 2853 423 adult tickets 387 student tickets


A school sold 52 adult tickets and 96 students tickets to all ran all school pasta dinnerThe adult ticket cost 6 and the students ticket cost 4 each Which amount is the most reasonable total?

"http://wiki.answers.com/Q/A_school_sold_52_adult_tickets_and_96_students_tickets_to_all_ran_all_school_pasta_dinnerThe_adult_ticket_cost_6_and_the_students_ticket_cost_4_each_Which_amount_is_the_most_reasonable_total" [http://wiki.answers.com/help/answering_questions


Michelle sold tickets for the basketball gameEach adult costs 3.00 and each student ticket cost 1.50 There were 105 tickets sold for a total of 250.00How many of each type of ticket were sold?

Sounds like a system of equations. X = adult ticket Y = student ticket Change all to pennies for convenience. X + Y = 105 300X + 150Y = 25000 -150(X + Y = 105) - 150X - 150Y = - 15750 300X + 150Y = 25000 -----------------------------------add them 150X = 9250 X = 62 adult tickets ------------------------ Y = 43 student tickets -------------------------- Those two prices added together = $250.50 So, we are a little off. I rounded the adult ticket number, but pieces of tickets can not be sold, so check work.


How much would it cost to get 1 day tickets for 7 adults and 3 kids to Disneyland?

1-Day Park Hopper$940 total ($97 each for adult tickets, $87 each for child tickets)1-Day 1-Park$690 total ($72 each for adult tickets, $62 each for child tickets)


If the students sold a total of 895 tickets all together how many did ech student sell?

There are several possible solutions. For example, one student may have sold all 895 tickets, and all the other students may have sold nothing.If you want the AVERAGE sales per student, you need to divide the total number of tickets sold, by the number of students (which you didn't specify in the question).


At a spring concert tickets for adults cost 4 and tickets for students cost 2.50 How many of each kind of tickets were purchased if 125 tickets were bought for 413.00?

67 adult ticket 58 student tickets total cost $413 total tickets 125 just set up a set of simultaneous equations such as if number of adult tickets is x and number of student tickets is y x+y=125 since 125 tickets are being bought then multiply amount of tickets by ticket cost 4x+2.5y=413 both equations are true so the easiest way to solve it is by solving the first equation first by saying x=125-y plug this new value of x into the second equation by replacing x 4(125-y) +2.5y=413 solve this equation for y then plug the value of y back into x=125-y to find the value for x


The movie charges 4.00 for each child ticket and 7.00 for each adult ticket the Art Calub purchased a total of 20 tickets and spent 101.00 How many of each type of ticket did the club buy?

7 Adult tickets 13 Child tickets


1797 concert tickets were sold for a total of 4848 If students paid 2 and non-students paid 3 how many student tickets were sold?

543


Tickets went on sale for the school play A total of 232 tickets were available for sale 38 tickets were sold during the first week What percent of the tickets were sold on the first week?

38 x 100/232 = 16.38%


At a basketball game adult tickets were sold at 7.50 each and student tickets at 3.50 each if 205 were sold and 1317.50 was collected how many tickets if each kind were sold?

The formula to determine the total money is nA + mC = 1317.50 where n is the number of adult tickets sold and A is the price of the adult tickets and m OS the number of child tickets and C is the price of a child ticket. Substituting in the actual prices we get... eq 1. n*7.50 + m * 3.50 = 1317.50 eq 2. n+m = 205 rearranging eq 2 we get n = 205 - m substituting this into eq 1 we get.. (205 -m) * 7.5 + m * 3.5 = 1317.50 Simplifying we get 1537.5 - 7.5m + 3.5m = 1317.50 1537.5 - 1317.5 = 4m 220 = 4m 55 = m substituting into eqn 2 we get n + 55 = 205 n = 150. Therefor 150 Adult tickets were sold 55 Child tickets were sold


The university sold 556 tickets for a play tickets cost 22 dollars per adult and 12 dollars per senior citizen if the total were 8492 dollars how many senior citizen tickets?

(22*182)+(12*374) = 8492$


A charity sells tickets for a fund raising dinner Each adult's ticket costs 10 and each child's ticket costs 5 A total of 1050 was raised by selling 130 tickets How many adult and child tickets?

10 adults & 10 children's


For a theater play the school sold 120 blue tickets for students and 80 red tickets for adults What percent of the tickets were sold to students?

Total 200 of which students got 120 so percentage is 120/2...