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Numbers

Numbers. Compound Interest Compound interest includes the new percentage each time the increase is worked out. Numbers. If I have £3,000 in a bank account and I receive 4% interest each year, how much does this increase after 1 year, 2 years and 3 years?. Numbers. Year 1 4% = 0.04

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Numbers

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  1. Numbers Compound Interest Compound interest includes the new percentage each time the increase is worked out.

  2. Numbers If I have £3,000 in a bank account and I receive 4% interest each year, how much does this increase after 1 year, 2 years and 3 years?

  3. Numbers Year 1 4% = 0.04 £3,000 x 0.04 = £120 After 1 year I now have £3,120 in my account.

  4. Numbers Year 2 4% = 0.04 £3,120 x 0.04 = £124.80 After 2 years I now have £3,244.80 in my account.

  5. Numbers Year 3 4% = 0.04 £3,244.80 x 0.04 = £129.79 After 3 years I now have £3,374.59 in my account.

  6. Numbers £3,000 initial deposit + 4% (£120) each year Year 1 - £3,120 Year 2 - £3,240 Year 3 - £3,360

  7. Numbers £3,120 £3,000 initial deposit + 4% compound interest Year 1 - £3,120 Year 2 - £3,244.80 Year 3 - £3,374.59 £3,240 £3,360

  8. Numbers A Bank offers interest of 2.75% each month. With £1,500 deposited, how much will there be in the account after 1 year?

  9. Numbers We would need to have to work out the new amount each month, this would take a very long time. There is a quicker way…

  10. Numbers The formula below lets us work this out in one complete calculation: A = P(1+r)n

  11. Numbers A = P(1+r)n A = total amount P = initial amount r = multiplier n = number of months

  12. Numbers A = P(1+r)n A= £1,500 (1 + 0.0275)12 A= £1,500 (1.0275)12 A = £1,500 x 1.38 A = £2077.17

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