Anu’s Amusement Center has collected the following data for operations for the year. Total revenues $ 1,980,000 Total fixed costs $ 652,400 Total variable costs $ 1,056,000 Total tickets sold 66,000 Required: - Qammunity

Anu’s Amusement Center has collected the following data for operations for the year. Total revenues $ 1,980,000 Total fixed costs $ 652,400 Total variable costs $ 1,056,000 Total tickets sold 66,000 Required:

asked Apr 10, 2020 107k views

Anu’s Amusement Center has collected the following data for operations for the year. Total revenues $ 1,980,000 Total fixed costs $ 652,400 Total variable costs $ 1,056,000 Total tickets sold 66,000 Required: a. What is the average selling price for a ticket? b. What is the average variable cost per ticket? c. What is the average contribution margin per ticket? (Do not round intermediate calculations.) d. What is the break-even point? (Do not round intermediate calculations.) e. Anu has decided that unless the operation can earn at least $306,600 in operating profits, she will close it down. What number of tickets must be sold for Anu’s Amusements to make a $306,600 operating profit for the year on ticket sales? (Do not round intermediate calculations.)

by Shayaa

8.0k points

1 Answer

Answer:

a. Average selling price per unit = $30

b. Average variable cost = $16

c. Average Contribution margin per ticket = $14

d. Break Even Point = 46,600 Tickets

e. For profit of $306,600 = 68,500 tickets

Step-by-step explanation:

As for the provided information we have,

a. Average selling price per unit =
$(Total\ Sales\ Revenue)/(Number\ of\ Units)$

Provided total sales revenue = $1,980,000

Number of units = $66,000

Thus, average selling price =
(1,980,000)/(66,000) = 30 = $30 per unit.

b. Average variable cost =
$(Total\ variable\ cost)/(Number\ of\ units)$

Provided total variable cost = $1,056,000

Number of units = $66,000

Thus, average variable cost per unit =
(1,056,000)/(66,000) = 16 = $16 per unit

c. Average Contribution margin per ticket = Average selling price per ticket - Average variable cost per ticket = $30 - $16 = $14 per unit.

Alternatively it can be calculated as
$(Total\ sales - Total\ variable\ cost)/(Number\ of\ units)$ =
(1,980,000 - 1,056,000)/(66,000) = 14

d. Break Even Point =
$(Fixed\ Cost)/(Contribution\ per\ unit)$

Fixed cost = $652,400

Contribution per unit = $14 per unit

Break even point =
(652,400)/(14) = 46,600 = 46,600 Tickets

e. In this case desired profit = $306,600

Fixed cost = $652,400

Total amount to be recovered through contribution = $306,600 + $652,400 = $959,000

Thus, number of tickets to be sold =
(959,000)/(14) = 68,500

That is 68,500 tickets.

Ianmayo answered Apr 13, 2020

8.7k points

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