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Question
Gopal has some Rs 100 shares of company A, paying 10% dividend. He sells a certain number of these shares at a discount of 20% and invests the proceeds in Rs 100 shares at Rs 60 of company B paying 20% dividend. If his income, from the shares, sold, increases by Rs 18,000, find the number of shares sold by Gopal.
Solution
Let the number of shares the man sold be x
N.V of share = Rs 100
Rate of dividend = 10%
Dividend on each share = 10% of Rs 100 = Rs 10
So the dividend on x shares = Rs 10 x X = Rs 10x
Selling price of each share = Rs 100 - 20% of Rs 100= Rs 80
Amount obtained on selling x shares = Rs 80 x X = Rs 80x
The proceeds he invested in Rs 100 shares at Rs 60 of company B paying 20% dividend
N.V of share = Rs 100
M.V of each share = Rs 60 = Rs 60
Number of shares bought by the man =` "Amount invested"/"M.V of each share"`
`= (80x)/60`
`= (4x)/3`
Dividend on each share = 20% of Rs 100 = Rs 20
Total dividend received = Dividebd on each share x Number of shares
`= 20 xx (4x)/3`
`= (80x)/3`
Increase in the income = Rs 18000
`=> (80x)/3 - 10x = 18000`
`=> (50x)/3 = 18000`
`x = Rs 1080`
Hence the number of shares sold by Gopal is Rs 1080.
