A trader purchases a watch and a wall clock for 390 rupees. He sell them making a profit of 10 % on the watch and 15% on the wall clock. He earns a profit of 51.50 rupees. The difference between the original prices of the wall clock and the watch is equal to
Answers
Answer:
Let the cost of the watch = x rupees. Then,
Cost of the clock = (390 – x)
Given, 10% of x + 15% of (390 – x) = 51.50
=>x/10 + 15 × (390 – x) = 51.50
=> x/10 + {15 × (390 – x)} ÷ 100 = 51.50
=> 10x + 5850 – 15x = 5150
=> 5x = 700
=> x = 140
Therefore, watch of clock = (390 – 140) = 250 rupees.
Therefore, required difference = 250 – 140
= 110
So the difference between the original prices of the wall clock and the watch is equal to 110 rupees.
Given :
A trader purchases a watch and a wall clock for 390 rupees. He sell them making a profit of 10 % on the watch and 15% on the wall clock. He earns a profit of 51.50 rupees.
To find :
What is the difference between the original prices of the wall clock and the watch is equal to.
Calculations :
→ x/10 + 15 (390 - x)/100 = 51.50
→ 10x + 5850 - 15x = 5150
→ 5x = 700
→ 700/5x
→ 140
Let's, substitute the above equation :
→ 390 - 140
→ 250
Therefore, the cost of the clock is equal to 250.
→ 250 - 140
→ 110
Therefore, 110 is difference between the original price of the wall clock.