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प्रश्न
Gagan invested 80% of his savings in 10% Rs. 100 shares at 20% premium and the rest of his savings in 20% Rs. 50 shares at 20% discount. If his incomes from these shares is Rs. 5,600, calculate:
- his investment in shares on the whole.
- the number of shares of first kind that he bought.
- percentage return, on the shares bought, on the whole.
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उत्तर
i. Let the total savings be Rs. x.
For 1st part:
N.V of each share = Rs. 100
M.V of each share = `100 + 20/100 (100)` = Rs. 120
Number of shares bought = `(0.8x)/120` ...(Investment = Rs. x)
Dividend on each share = 10% of 100 = Rs. 10 ...(Rate = 10%)
Total dividend = `10 xx (0.8x)/120 = Rs. (0.8x)/12`
For 2nd part:
N.V of each share = Rs. 50
M.V of each share = `50 - 20/100 (50)` = Rs. 40
Number of shares bought = `(0.2x)/40` ...(Investment = Rs. x)
Dividend on each share = 20% of 50 = Rs. 10 ...(Rate = 20%)
Total dividend = `10 xx (0.2x)/40 = (0.2x)/4`
Given that dividends (incomes) from both investments are Rs. 5,600
`\implies (0.8x)/12 + (0.2x)/4 = 5600`
`\implies (0.8x + 0.6x)/12 = 5600`
`\implies x = (5600 xx 12)/1.4`
`\implies` x = 48,000
Thus, his investment in shares on the whole is Rs. 48,000
ii. So, number of shares bought
= `(0.8x)/120`
= `(0.8 xx 48000)/120`
= Rs. 320
iii. The total dividend (return)
= `(0.8x)/12 + (0.2x)/4`
= `(0.8(48000))/12 + (0.2(48000))/4`
= 0.8 × 4000 + 0.2 × 12000
= Rs. 5,600
Percentage return = `5600/(48000) xx 100`
= `11 2/3`%
