INPUT: All integer, no validation or ranges needed. Although the user can enter whatever numbers they wish, consider a more 'realistic' scenario for input, e.g., 1. Input production cost (the cost to...

Extracted text: INPUT: All integer, no validation or ranges needed. Although the user can enter whatever numbers they wish, consider a more 'realistic' scenario for input, e.g., 1. Input production cost (the cost to management of setting up the play) Keep is sensible – maximum of £5000 maybe – but no validation needed; Keep it sensible – is a production costs of £100 realistic? 2. Input the price of one seat in band-A (band-A price is double band-B price) 3. Input the price of one seat in band-B (band-B is half the price of band-A price) Keep band-A and band-B seat prices sensible: Maybe keep them below £100 but no validation needed PROCESS: Part-1: Full house: All seats sold – no empty seats a) How many days to break-even based on all seats being sold Part-2: Part house: Only some seats sold – there are empty seats a) How many days for the production to break even if only some seats are sold Randomly allocate seats across band-A and band-B: Use the total as an expected average for each part-house: i.e. if you get, say 5 seats sold in band-A and 4 seats sold in band-B then the part- house total for one night will be: (5 * 20) + (4 * 10) = 100 +40 = £140 You can assume £140 is the average for every part-house night – there is no need to repeat the randomisation and then take an overall average


Extracted text: Requirements: The latest production of a science-fiction blockbuster has transferred to the stage. It is trialling in a small theatre so projection models can be tested for break-even analysis. Design, implement and execute a modularised program using a 2d-array to transform input to output information in the form of a 'dashboard’. The dashboard can be used by theatre management where they can input the cost of the production, followed by input of the price of a seat in band-A and the price of a seat in band-B. Problem Specification: STAGE seat number 1 3 4 6. 7 8 10 11 12 13 14 15 16 17 18 19 20 Row-1 = seats 1 to 5 band-A Row-2 = seats 6 to 10 band-A Seats in price-band-A cost twice as Row-3 = seats 11 to 15 band-B much as seats in price-band-B Row-4 = seats 16 to 20 band-B