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44 votes
44 votes
Annabella wants to make the most economical decision so she chose the 3-year car loan so that after the loan is paid off to be able to invest in a structured saving account if Anabella put $200 into a saving account each month with an annual interest rate of 3.2% interest compounded monthly how much money would she have in her account after 2 years ​

User Linus Oleander
by
3.0k points

2 Answers

13 votes
13 votes

Explanation:

Given

  • P = $200,
  • t = 2 years,
  • n = 12,

  • \sf \: r = 3.2\% = (3.2)/(100) = 0.032

To find

  • Future value of saving

Solution

Use periodic compound formula:


\sf \: F=P\cfrac{(1+ (r)/(n))^(nt)-1}{(r)/(n)}

Substitute the values and calculate:


\sf \: F=200\cfrac{(1+ (0.032)/(12))^(12 * 2)-1}{(0.032)/(12)}


\sf \: F=200\cfrac{( ( 12 + 0.032)/(12))^(24)-1}{(0.032)/(12)}


\sf \: F=200\cfrac{( {11.002 }{})^(24)-1}{0.002}


\sf \: F=200 * 24.7506


\sf \: F=4950.12rounded

User Frawel
by
3.3k points
22 votes
22 votes

Answer:

  • Annabella will save $4950.11 after 2 years.

Explanation:

Given

  • Periodic payment P = $200,
  • Period t = 2 years,
  • Number of compounds, monthly n = 12,
  • Interest rate, r = 3.2% = 0.032.

To find

  • Future value of saving, F

Solution

Use periodic compound formula:


F=P\cfrac{(1+r/n)^(nt)-1}{r/n}

Substitute the values and calculate:


F=200\cfrac{(1+0.032/12)^(12*2)-1}{0.032/12} =4950.12 rounded

User FurryHead
by
3.2k points