Question
Download Solution PDFOn a deposit of ₹1,50,000, R gets ₹2,000 as interest on simple rate of interest in a year. How much amount (in ₹) should he deposit to get interest of ₹4,500?
Answer (Detailed Solution Below)
Detailed Solution
Download Solution PDFGiven:
Principal Amount (P) = ₹1,50,000
Interest (I) = ₹2,000
Time (T) = 1 year
Formula Used:
Simple Interest, I = \(\frac{P × R × T}{100}\)
Calculation:
Using the given data to find the rate of interest (R):
⇒ \(2,000 = \frac{1,50,000 × R × 1}{100}\)
⇒ 2,000 = 1,500 × R
⇒ \(R = \frac{2,000}{1,500}\)
⇒ \(R = \frac{4}{3}\)%
Now, we need to find the principal amount (Pnew) to get an interest of ₹4,500:
Interest (Inew) = ₹4,500
⇒ \(4,500 = \frac{Pnew × \frac{4}{3} × 1}{100}\)
⇒ \(4,500 = \frac{4}{300} × Pnew \)
⇒ \(4,500 = \frac{2}{150} × Pnew \)
⇒ \(4,500 = \frac{Pnew}{75}\)
⇒ Pnew = 4,500 × 75
⇒ Pnew = 3,37,500
The amount he should deposit to get interest of ₹4,500 is ₹3,37,500.
Last updated on Jul 15, 2025
-> SSC Selection Phase 13 Exam Dates have been announced on 15th July 2025.
-> The SSC Phase 13 CBT Exam is scheduled for 24th, 25th, 26th, 28th, 29th, 30th, 31st July and 1st August, 2025.
-> The Staff Selection Commission had officially released the SSC Selection Post Phase 13 Notification 2025 on its official website at ssc.gov.in.
-> A total number of 2423 Vacancies have been announced for various selection posts under Government of India.
-> The SSC Selection Post Phase 13 exam is conducted for recruitment to posts of Matriculation, Higher Secondary, and Graduate Levels.
-> The selection process includes a CBT and Document Verification.
-> Some of the posts offered through this exam include Laboratory Assistant, Deputy Ranger, Upper Division Clerk (UDC), and more.
-> Enhance your exam preparation with the SSC Selection Post Previous Year Papers & SSC Selection Post Mock Tests for practice & revision.