population of two small cities A and C are 16,000 and 12,800 respectively . Ratio of population of city A to that of B is 4:5. Three manufactures, X,Y and Z supply cycles in these three cities. These manufactured cyceles in the ratio of 22:19:20(X:Y:Z) by assuming that each person will buy one cycle and 60% 75^ and 80% of the cycle manufactured by X,Y and Z. respectively are sold and selling price of each cycle is Rs. 8,000. (a) "Supply"=("Revenu")/("Selling price of a cycle") (b) "Demand %"=("Number of cycles ordered by customers")/("Total number of cycles remainded with manufacturer") What is the revenue generatd from city B, if each person of city A and C purchased a cycle ?

population of two small cities A and C are 16,000 and 12,800 respectiv

1.	population of two small cities A and C are 16,000 and 12,800 respectively . Ratio of population of city A to that of B is 4:5. Three manufactures, X,Y and Z supply cycles in these three cities. These manufactured cyceles in the ratio of 22:19:20(X:Y:Z) by assuming that each person will buy one cycle and 60% 75^ and 80% of the cycle manufactured by X,Y and Z. respectively are sold and selling price of each cycle is Rs. 8,000. (a) "Supply"=("Revenu")/("Selling price of a cycle") (b) "Demand %"=("Number of cycles ordered by customers")/("Total number of cycles remainded with manufacturer") What is the revenue generatd from city B, if each person of city A and C purchased a cycle ?
Answer» `8.424` crore `4.768` crore `6.348` crore `9.00` crore Solution :Total populaton in A and C is 16000 and 12800 POPULATION in `B rarr (16000)/(4)xx5=20,000` CYCLE manufactured by X,Y and Z =16000+12800+2000=48000 Total cycle manufactured by X `=(48800)/(61)xx22=17600` By Y `=(48800)/(61)xx19=15200` By `Z=(48800)/(61)xx20=16000` Cycle supplied by `X=(60)/(100)xx17600=10560` By `Y=(75)/(100)xx15200=11400` By `Z=(80)/(100)xx16000=12800` Cycle supplied by B `=10560+11400+12800-16000-12800=5960` Revenue `=8000xx5960=47680000=4.768` cr.