Endowment of time and money.

Present vs. Future Consumption

Endowment of money in different time periods (an "income stream")

Leisure vs. Consumption

Working = trading time for money

Saving = trading present consumption for future consumption

Borrowing = trading future consumption for present consumption

Determine the budget line

Analyze preferences

Solve for optimal choice

Comparative statics: analyze net supply and demand

You trade \(L\) hours of labor for some amount of consumption, \(\Delta C\). 

You start with 24 hours of leisure and \(M\) dollars.

You end up consuming \(R = 24 - L\) hours of leisure,
and \(C = M + \Delta C\) dollars worth of consumption.

You earn \(\Delta C = wL\) dollars in addition to the \(M\) you had.

...and you consume \(R = 24 - L\) hours of leisure.

This is just an endowment budget line

We've just derived the budget constraint in terms of leisure and consumption as well:

Maximize utility as usual, with one caveat:
you can only sell your leisure time, not buy it.

Your endowment is an income stream of \(m_1\) dollars now and \(m_2\) dollars in the future.

If you save at interest rate \(r\),
for each dollar you save today,
you get \(1 + r\) dollars in the future.

You can either save some of your current income, or borrow against your future income.

If you borrow at interest rate \(r\),
for each dollar you borrow today,
you have to repay \(1 + r\) dollars in the future.

Two "goods" are present consumption \(c_1\) and future consumption \(c_2\).

Examples:

Save if MRS at endowment < \(1 + r\)

Borrow if MRS at endowment > \(1 + r\)

(high interest rates or low MRS)

(low interest rates or high MRS)

If we assume \(v(c)\) exhibits diminishing marginal utility:
MRS is higher if you have less money today (\(m_1\) is low)
and/or more money tomorrow (\(m_2\) is high)

MRS is lower if you are more paitient (\(\beta\) is high)