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प्रश्न
Refer to question 11. How many of circuits of Type A and of Type B, should be produced by the manufacturer so as to maximise his profit? Determine the maximum profit.
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उत्तर
As per the solution of Question No. 11
We have Maximise Z = 50x + 60y
Subject to the contraints
2x + y ≤ 20 ......(i)
x + 2y ≤ 12 .......(ii)
x + 3y ≤ 15 .......(iv)
x ≥ 0, y ≥ 0 .......(iv)
Let us draw the table for the above statements
Table for (i)
| x | 0 | 10 |
| y | 20 | 0 |
Table for (ii)
| x | 0 | 10 |
| y | 20 | 0 |
Table for (ii)
| x | 0 | 15 |
| y | 5 | 0 |
Solving equation (i) and (ii) we get,
x = `28/3`
y = `4/3`
∴ `"B"(38/3, 4/3)` is the corner
Solving equation (ii) and (iii) we get,
x = 6, y = 3
∴ C(6, 3) is the corner
Solving equation (i) and (iii) we get,
x = 9, y = 2 .....(Not included in the feasible region)
Here, OABCD is the feasible region.
So, the corner points are O(0, 0), A(10, 0), `"B"(28/3, 4/3)`, C(6, 3) and D(0, 5).
Let us evaluate the value of Z
| Corner points | Corresponding values of Z = 50x + 60y | |
| O(0, 0) | Z = 50(0) + 60(0) = 0 | |
| A(10, 0) | Z = 50(10) + 60(0) = 500 | |
| `"B"(28/3, 4/3)` |
Z = `50(28/3) + 60(4/3)` = `1400/3 + 240/3` = `1640/3` = 546.6 |
← Maximum |
| C(6, 3) | Z = 50(6) + 60(3) = 480 | |
| D(0, 5) | Z = 50(0) + 60(5) = 300 |
Here, the maximum profit is ₹ 546.6 which is not possible for number of items in fraction.
Hence, the maximum profit for the manufacturer is ₹ 480 at (6, 3).
Type A = 6 and Type B = 3.
