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Question
The ratio of the annual income of A and B is 5 : 4 and the ratio of their expenditures is 11 : 8. If each saves ₹ 4000. Find their annual incomes.
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Solution
Given:
- Ratio of annual incomes of A and B = 5 : 4
- Ratio of their expenditures = 11 : 8
- Each saves ₹ 4000
Step-wise calculation:
1. Let the annual income of A = 5x and the annual income of B = 4x.
2. Let the annual expenditure of A = 11y and the annual expenditure of B = 8y.
3. Since savings are income minus expenditure, the savings of each = ₹ 4000, so:
For A: 5x – 11y = 4000 ...(i)
For B: 4x – 8y = 4000 ...(ii)
4. Multiply equation (i) by 4 and equation (ii) by 5 to equalize the x terms:
20x – 44y = 16000
20x – 40y = 20000
5. Subtract the second equation from the first:
(20x – 44y) – (20x – 40y) = 16000 – 20000
–44y + 40y = –4000
–4y = –4000
y = 1000
6. Substitute y = 1000 in (ii):
4x – 8(1000) = 4000
4x – 8000 = 4000
4x = 12000
x = 3000
7. Calculate annual incomes:
Income of A = 5x
Income of A = 5 × 3000
Income of A = ₹ 15000
Income of B = 4x
Income of B = 4 × 3000
Income of B = ₹ 12000
The annual income of A is ₹ 15,000 and the annual income of B is ₹ 12,000.
