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3. A commodity $q$ is traded at price $p$ in a competitive market with price-taking consumers and firms. There are $N$ identical consumers each with income $Y = 50$. Each consumer has a utility function over numeraire consumption $c$ and commodity $q$ given by: $u(c, q) = c + 12q - \frac{1}{2}q^2$ There are $M$ identical firms each with cost function given by: $c(q) = 2 + 8q + \frac{1}{2}q^2$ The number of firms is fixed in the short run, but in the long run firms can freely enter or exit the market. Thus, the number of firms is flexible in the long run. a. Prove that the long run equilibrium price is equal to: $p = \delta + 2$ b. Prove that in the long run equilibrium, the total output of the commodity is $Q = N(10 - \delta)$ and that the output per consumer is: $q_d = 10 - \delta$ c. Prove that in the long run equilibrium, the utility of each consumer is: $u = 50 + \frac{1}{2}(10 - \delta)^2$ d. Real GDP is a measure of real output per person. Using this model as an example, explain how: i. Population growth (an increase in $N$) ii. Productivity growth (a decrease in $\delta$) affect real GDP, real GDP per capita, and consumer well-being.

          3. A commodity $q$ is traded at price $p$ in a competitive market with price-taking consumers and
firms.
There are $N$ identical consumers each with income $Y = 50$. Each consumer has a utility
function over numeraire consumption $c$ and commodity $q$ given by:
$u(c, q) = c + 12q - \frac{1}{2}q^2$
There are $M$ identical firms each with cost function given by:
$c(q) = 2 + 8q + \frac{1}{2}q^2$
The number of firms is fixed in the short run, but in the long run firms can freely enter or
exit the market. Thus, the number of firms is flexible in the long run.
a. Prove that the long run equilibrium price is equal to:
$p = \delta + 2$
b. Prove that in the long run equilibrium, the total output of the commodity is
$Q = N(10 - \delta)$
and that the output per consumer is:
$q_d = 10 - \delta$
c. Prove that in the long run equilibrium, the utility of each consumer is:
$u = 50 + \frac{1}{2}(10 - \delta)^2$
d. Real GDP is a measure of real output per person. Using this model as an example,
explain how:
i. Population growth (an increase in $N$)
ii. Productivity growth (a decrease in $\delta$)
affect real GDP, real GDP per capita, and consumer well-being.

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3. A commodity q is traded at price p in a competitive market with price-taking consumers and
firms.
There are N identical consumers each with income Y = 50. Each consumer has a utility
function over numeraire consumption c and commodity q given by:
u(c, q) = c + 12q - (1)/(2)q^2
There are M identical firms each with cost function given by:
c(q) = 2 + 8q + (1)/(2)q^2
The number of firms is fixed in the short run, but in the long run firms can freely enter or
exit the market. Thus, the number of firms is flexible in the long run.
a. Prove that the long run equilibrium price is equal to:
p = δ + 2
b. Prove that in the long run equilibrium, the total output of the commodity is
Q = N(10 - δ)
and that the output per consumer is:
qd = 10 - δ
c. Prove that in the long run equilibrium, the utility of each consumer is:
u = 50 + (1)/(2)(10 - δ)^2
d. Real GDP is a measure of real output per person. Using this model as an example,
explain how:
i. Population growth (an increase in N)
ii. Productivity growth (a decrease in δ)
affect real GDP, real GDP per capita, and consumer well-being.

Added by Sandra A.

Principles of Economics

Gregory Mankiw 8th Edition

Instant Answer

Solved by Expert Ameer Said

12/17/2021

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Step 1: In a competitive market, the price is determined by the intersection of the supply and demand curves. Show more…

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3. A commodity q is traded at price p in a competitive market with price-taking consumers and firms. There are N identical consumers each with income Y = 50. Each consumer has a utility function over numeraire consumption c and commodity q given by: $$u(c, q) = c + 12q - \frac{1}{2}q^2$$ There are M identical firms each with cost function given by: $$c(q) = 2 + 8q + \frac{1}{2}q^2$$ The number of firms is fixed in the short run, but in the long run firms can freely enter or exit the market. Thus, the number of firms is flexible in the long run. a. Prove that the long run equilibrium price is equal to: $$p = \delta + 2$$ b. Prove that in the long run equilibrium, the total output of the commodity is $$Q = N(10 - \delta)$$ and that the output per consumer is: $$q_d = 10 - \delta$$ c. Prove that in the long run equilibrium, the utility of each consumer is: $$u = 50 + \frac{1}{2}(10 - \delta)^2$$ d. Real GDP is a measure of real output per person. Using this model as an example, explain how: i. Population growth (an increase in N) ii. Productivity growth (a decrease in δ) affect real GDP, real GDP per capita, and consumer well-being.

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00:01 Alright, so here, let's suppose that the market demand for a product is given by, this is demand, a minus b, p, okay? and suppose that the typical perm's cost function is given by, this is the cost function, this is k plus aq plus bq square, okay? now, let in part a here, let a perfectly competitive industry is in long and equilibrium if there are no incentives, per profit maximizing perms to enter or to leave the industry, okay? and this will occur when the number of perms is such that p is equal to mc is equal to ac and b, each perma operates at the low point of its long run average cast curve so therefore in long run equilibrium ac is equal to mc are these are just c of q is equal to dc of q divided by d q divided by d q okay are this is just k over q plus a plus b kio this is equal to a plus two b kion are k square is equal to k over b or k is equal to square root k over b okay so let also in the long run equilibrium m c is equal to p are a plus 2 b kio is equal to p r a plus 2 b square root k over b is equal to p okay and a plus 2 square root k b is equal to p and here p is equal to a plus 2 square root k b okay now in part b here suppose that there are in part in the industry that is q is equal to n q at equilibrium and q d is q this is in q and therefore prime the demand function we have in q is equal to a minus b p or n is equal to a minus bp over q or n is equal to a minus bp divided by q right are n is equal to a minus b times a plus two square root k b divided by square root k over b okay so finally it will be equal to a minus b times a plus two square root k b divided by square root of k over b okay so the parameters is given this right now in part c here the number of parameters is a function of all the parameters is given as this this right is given as this and it is evident from this equation that n is the positively related with both a and b as a and b increases in also increases in vice versa right and here is the intercept of the demand curve this reflects the size of the market in his the larger a the larger will be the number of the pun in the industry okay and b represents the slope of the demand curve which gives the change in price due to change in quantity demanded does the larger will be the change in the price the lower will be b and the lower will be the number of perms in the market okay right now in part d here, in part d, the number of params is it is a minus b times this is minus here...

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