Question 1
A train can accommodate at most 80 passengers, economy class (x) and first-
class (y) passengers. To avoid making a loss the train must carry at least ten
economy class passengers and at least twenty first class passengers. Due to the
number of complementary items the first-class passengers receive, the number
of first-class passengers should be at most three times the number of economy
class passengers.
First class tickets cost N$5000 while economy class tickets cost N$3000.
i) State/ describe what the variables x and y represent.
ii) State the objective function.
iii) List the constraints.
iv) Draw and clearly label the constraints on graph paper.
v) Clearly show and label the feasible region.
vi) From the graph deduce the number of economy and first-class tickets
that should be sold to make as much money as possible.
vii) Work out the maximum amount of money from ticket sales that the
train company will make.
(i) X and Y represent the number of passenger's in train.
Let, X= Economy class
Y=First class
(ii) Objective function-
Z= 5000x+3000y
(iii)
Total number of passengers in train is 80
So "\\Rightarrow X+Y\\le80~~~~~~~-(1)"
"3x\\ge y\n\\\\\nx\\ge10\\\\y\\ge25"
(iv)
The Graph is-
(v) The feasible region is shown in the graph-
(vi) There are total 4 situation in this case when values of X and Y varies and these are
Hence we get The maximum value of z at x=20,y=60
Hence Ticket sold for economy class= 20, No. of tickets for first class=60
(vii) The maximum amount Z at(20,60)=280000
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