Compound Interest Explained in One Minute
Summary
TLDRThe script compares the investment strategies of John and Lisa, who both invest $1,000 at a 10% annual interest rate. John withdraws his $100 interest each year, leaving him with $4,000 after 30 years. Lisa reinvests her interest, earning compound interest, and accumulates $17,449.40, illustrating the power of compounding over time.
Takeaways
- 🏦 John and Lisa both invest $1,000 in a bank offering a 10% annual return.
- 💸 John withdraws the interest each year, leaving his principal intact.
- 💰 Lisa reinvests her interest, allowing it to compound over 30 years.
- 🔢 After one year, John has $1,100, taking out $100 interest, leaving $1,000 principal.
- 📈 Lisa's account grows to $1,100 after one year, without withdrawing interest.
- 📊 In subsequent years, Lisa earns interest on the accumulated amount, not just the initial principal.
- 💲 By the 30th year, Lisa's account has grown to $17,449.40, significantly more than John's.
- 📉 John's account remains at $1,100 each year, taking out $100 interest, ending with $4,000 total after 30 years.
- 📚 The power of compounding is evident as Lisa's investment grows four times more than John's.
- 💡 The example illustrates the importance of reinvesting interest for long-term financial growth.
Q & A
What is the annual interest rate offered by the bank in the script?
-The bank offers an annual interest rate of 10%.
How much does John invest in the bank?
-John invests $1,000, which is referred to as the principal.
What does John choose to do with the interest earned each year?
-John chooses to spend the interest each year and keeps only the principal in the bank.
How much interest does John earn in the first year?
-John earns $100 in interest in the first year, which is 10% of his $1,000 principal.
How much money does John have in his account after 30 years if he withdraws the interest each year?
-After 30 years, John will have $4,000 in total, which includes his initial principal of $1,000 and the interest of $100 per year for 30 years.
What is Lisa's investment strategy compared to John's?
-Lisa chooses to save for 30 years without withdrawing the interest, allowing it to compound annually.
How does the interest earned by Lisa differ from John's after the first year?
-After the first year, Lisa earns interest not only on her initial $1,000 but also on the interest earned in the first year, resulting in more than $100 for the second year.
What is the formula for calculating the amount in Lisa's account after each year?
-The amount in Lisa's account after each year is calculated by taking the previous year's total and adding 10% of that total.
How much does Lisa have in her account after 30 years?
-After 30 years, Lisa has $17,449.40 in her account.
What is the difference in the final amount between John and Lisa after 30 years?
-After 30 years, Lisa has over four times more money than John, with $17,449.40 compared to John's $4,000.
What is the key concept illustrated by the difference in the final amounts between John and Lisa?
-The key concept illustrated is the power of compound interest, where reinvesting the interest can lead to significantly higher returns over time compared to withdrawing it annually.
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