Week 2 Flashcards
What did Malthus argue?
Any technological growth for production food will lead to population growth. Higher population will reduce the average person back to the subsistence level.
According to Mathus’ theory, what will happen in the long run?
Population and consumption would grow over time but in the long run there would be no improvement in standard of living unless limits were put on population growth.
Write the aggregate production function and what does each variable mean? What are the 3 assumptions put in place.
How to write the population for next period?
Write an equation that tells how the population evolves over time in equilibrium as it gives the future population as a function of current population.
Using the graph below and explain why does population converse to a steady rate if population is below or above
What do we get?
Sketch these equations and explain how they are related?
In panel (a) c* determines the steady state quantity of land per worker l* as land is fixed. We can determine steady state population as N* = L/l. Standard of living in model is determined by c. Therefore long run standard of living is determined entirely by function g. (Nothing in Panel (a) affects c* so improved tech has no effect on long run living standards)
An economy initially in steady state with factor productivity z ‘subscript 1’ increases to z ‘subscript 2’ . Show the steady state effects
Show diagrammatically how the economy moves to a new steady state with regards to population and consumption adjusting with regards to consumption per worker and population.
Malthus’ proposition for population control would have effect of reducing rate of population growth for each level of consumption per worker. Show diagrammatically how the result of population control will affect function g(c).
The malthusian growth model was a good explanation for what 3 facts?
- Constant GDP per capita
- Population growth is higher when living standards rise
- Mainly an agricultural economy
What 3 things does malthusian model fail to take into consideration?
- Sustained growth in GDP per capita
- Demographic transition, decline is growth rate of population
- Structural transition from agricultural economy to services
What does the Solow model tell us?
- What causes living standards to rise over time
- What happens to the level and growth rate of aggregate income when the savings rate or population growth rate rises.
According to the solow model how is the population in the next period modeled and explain each variable along with the assumption for population.
How is consumption modeled in the solow model and explain each variable.
Write the aggregate production function for the solow model and how it evolved to per worker production function. Draw the per worker production function.
Y = zF(K,N)
Which then becomes to
Y/N = zF(K/N,1)
then
y = zf(k)
How is depreciation modeled in solow model and explain each variable.
Capital market is in equilibrium when what two variables are equal?
Start from the equilibrium condition and end up to the equation stating stock of capital in future period which is equal to quantity of saving this period plus quantity of capital this period post depreciation.
Write the equation for law of motion for capital per capita, and what does it determine?
Draw the graph of the equation for law of motion for capital per capita with the steady state.
What is the quantity of output per worker that converses to a constant from the per worker production function?
