Step-by-step explanation:
Let us assume the total number of small buses needed = x
The capacity of 1 small bus = 40
So, the capacity of x buses = 40(x) = 40 x
Let us assume the total number of big buses needed = y
The capacity of 1 big bus = 50
So, the capacity of y buses = 50(y) = 50 y
Also, the total students travelling = 400
So, the number of students traveling by (Small bus + Big bus) = 400
⇒ 40 x + 50 y = 400 ..... (1)
Also, the total number of drivers available = 9
⇒ x + y = 9 ..... (2)
Also, x ≤ 8, y ≤ 10
Now, solving both equations, we get:
40 x + 50 y = 400 ..... (1)
x + y = 9 ⇒ y = (9-x) put in (1)
40 x + 50 y = 400 ⇒ 40 x + 50 (9-x) = 400
or, 40 x + 450 - 50 x = 400
or, - 10 x =- 50
or, x = 5 ⇒ y = (9-x) = 9- 5 = 4
Hence the number of small buses used = 5
The number of big buses used = 4
5 small buses and 4 large buses are needed to get a total cost of $6200.
Let x represent the number of small buses and y represent the number of big buses.
Since there are 400 students and 10 buses of 50 seats each and 8 buses of 40 seats, hence:
40x + 50y = 400 (1)
Also there are 9 drivers available, hence:
x + y = 9 (2)
Therefore x = 5, y = 4
Then cost for a large bus is $800 and $600 for the small bus, hence:
Total cost = 600x + 800y = 600(5) + 800(4) = $6200
Therefore 5 small buses and 4 large buses are needed to get a total cost of $6200.
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