Final answer:
The marked price of the mobile in the shop is Rs 40,000. The discount amount is Rs 6000. Ramesh buys the computer for Rs 54,000 and bears a loss of 11.1%.
Step-by-step explanation:
To find the marked price of the mobile in the shop, we need to use the ratio given in the question. The ratio of the marked prices of the computer and the mobile is 3:2. Since the marked price of the computer is Rs 60,000, we can set up the following equation:
3/2 = 60000/x
Where x is the marked price of the mobile. Cross multiplying, we get:
3x = 2 * 60000
x = 2 * 60000 / 3
x = Rs 40,000
So, the marked price of the mobile in the shop is Rs 40,000.
To find the discount amount, we can multiply the marked price of the computer by the discount percentage. The discount percentage is 10%. So, the discount amount is:
10/100 * 60000 = Rs 6000
Therefore, the discount amount is Rs 6000.
To find the price at which Ramesh buys the computer, we need to subtract the discount amount from the marked price of the computer:
60000 - 6000 = Rs 54,000
So, Ramesh buys the computer for Rs 54,000.
To find the percent of loss Ramesh bears, we need to calculate the difference between the price at which he sells the computer and the price at which he buys it, divided by the price at which he buys it, and multiplied by 100. The loss percentage is:
(54000 - 48600) / 54000 * 100 = 11.1%
Therefore, Ramesh bears a loss of 11.1% on the computer.