Brian buys a computer for £3100.
It depreciates at a rate of 5% per year.
How much will it be worth in 5 years?
Give your answer to the nearest penny where appropriate.
Answers
Answer:
you can either calculate 5% of each yr value and subtract it from 3100 or find effective depreciation in 5 years
effective depreciation is 22.63%
get (100-22.63)*3100/100=2398.72$
Step-by-step explanation:
Step-by-step explanation:
the computer costs 3100.
every year it loses 5% of its value.
how much will it be worth in 5 years.
if it loses 5% each year, then each succeeding year it is worth 95% of what it was the year before.
therefore, after 1 year is it worth .95 * what it was when you bought it.
the year after that it is worth .95 * .95.
the year after that it is worth .95 * .95 * .95.
at the end of the fifth year it is worth .95 * .95 * .95 * .95 * .95 of what it was when you bought it.
.95 ^ 5 * 3100 = 2398.720906.
the formula to use for this would be f = p * (1 + r) ^ n
f is the future value.
p is the present value.
r is the interest rate per time period (years in this case).
n is the number of time periods (years in this case).
when p = 3100 and r = -.05 and n = 5, the formula becomes:
f = 3100 * (1 - .05) ^ 5 which becomes f = 3100 * .95 ^ 5 which becomes f = 2398.720906.
to the nearest penny, the answer is 2398.72.