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NO LINKS!! How much money, invested at an interest rate of r% per year compounded continuously, will amount to A dollars after t years? (Round your answer to the nearest cent.) Part 2v​

NO LINKS!! How much money, invested at an interest rate of r% per year compounded-example-1
User Kirstine
by
3.1k points

2 Answers

7 votes
7 votes

Answer:

$120,821.88 (nearest cent)

Explanation:

Continuous Compounding Formula


\large \text{$ \sf A=Pe^(rt) $}

where:

  • A = Final amount.
  • P = Principal amount.
  • e = Euler's number (constant).
  • r = Annual interest rate (in decimal form).
  • t = Time (in years).

Given values:

  • A = $200,000
  • r = 3.6% = 0.036
  • t = 14 years

Substitute the given values into the formula and solve for P:


\implies \sf 200000=P \cdot e^(0.036 \cdot 14)


\implies \sf 200000=P \cdot e^(0.504)


\implies \sf P=(200000)/(e^(0.504))


\implies \sf P=120821.8766...

Therefore, the principal amount invested was $120,821.88 (nearest cent).

User BegemoT
by
2.1k points
22 votes
22 votes

Answer:

  • $120821.83

Explanation:

Use continuous compound equation:


  • A = P*e^(rt), where A- future amount, P- invested amount, t- time, r- rate

Given

  • A = $200000,
  • r = 3.6% = 0.036,
  • t = 14 years.

Plug in and solve for P


  • 200000 = P*e^(0.036*14)

  • 200000=P*1.65533

  • P=200000/1.65533

  • P=120821.83

User Woofmeow
by
2.3k points
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