Growth Calculations

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Purposes:

Understand relationship among nominal GDP, real GDP, and inflation
Become comfortable with calculating processes that involve compound growth
Understand how ratios, such as output per worker, are affected by different rates of growth of numerator and denominator

Interest on a bank deposit

Y₀ is the money you deposit
n is the number of years you put the money on deposit
r is the annual interest rate, expressed as a decimal
Y_n is the balance you end up with

[1] Y_n = Y₀(1+r)ⁿ

Can solve for any variable, as long as we know the other three.

Example of solving for the ending balance. Suppose that:

we deposit $1000; Y₀ = 1000
interest rate is 10 percent; r = .10
4 years; n = 4

ending balance, Y₄ = $1464.10

In a spreadsheet, such as Microsoft Excel, you use the formula +1000*(1+.10)^4

Next example--Solve for beginning balance. Same example as before, except we want to know how much to deposit now in order to have $1600 in four years.

1600 = Y₀(1+0.10)⁴

Divide 1600 by (1.1)⁴ to get $1092.82

Next example--Solve for interest rate. Suppose you start with $1000 and end up with $1600 after four years. What was the interest rate?

1600 = 1000(1+r)⁴

Three steps:

Divide both sides by 1000
1.6 = (1+r)⁴
Get rid of the exponent by taking both sides to the 1/n power
(1.6)^(1/4) = (1+r) = 1.125
Solve for r and convert to percent: r = .125 = 12.5 percent

Final example--Solving for the number of years. Suppose you start with $1000, the interest rate is 10 percent, and you want to know how long it will take until you have $2000. Here, we use logs (you can use either regular logs or natural logs).

logY_t = logY₀ + t[log(1+r)]

Solving for t gives

t = (logY_t - logY₀)/log(1+r)

In our example

t = (log[2000] - log[1000])/log[1+.10] = 7.27 years

For problem set, note that:

real GDP = (nominal GDP)/(price index)
real GDP per capita = (real GDP)/(population)

In general, a ratio increases when the numerator grows faster than the denominator, and vice-versa.