Answer:
A) skewed to the right with a mean of $4000 and a standard deviation of $450.
Explanation:
While the days are picked at random, the size of the sample is enough to represent the reality. Among the random pick those days of football game will be picked too and will skewed to the right the distribution
The distribution will not change into normal as the reality is that distribution of revenue is not normally distributed among the days of the year.
Answer:
The answer to this question varies depending on what their role is in the hive. For example, many worker bees eat the same exact foods such as honey, pollen, and nectar. However, the elusive queen bees (less common in a hive) are typically fed a different diet while growing up to change their overall larval development.
Answer:
2. (i) demand-side; (ii) both; (iii) supply-side; (iv) supply-side; (v) both
Explanation:
a. $1,000 per person tax reduction ⇒ focus on aggregate demand (more money for consumers to spend)
b. a 5% reduction in all tax rates ⇒ focus on both aggregate demand and supply (more money for consumers and suppliers)
c. Pell Grants, which are government subsidies for college education ⇒ focus on aggregate supply (more money for suppliers of college education)
d. government-sponsored prizes for new scientific discoveries ⇒ focus on aggregate supply (more money for suppliers of new scientific discoveries)
e. an increase in unemployment compensation ⇒ focus on both aggregate demand and supply (more money for consumers resulting in higher prices and lower output)
Answer:
The option E is correct
Explanation:
Solution
Given that:
The output manufactured to Q = 5Lk
Where L= Labor quantity
k=Capital quantity
The price of K= $12
The price of L =$6
Now,
We find the combination of both K and L that will produce 4,000 units of output.
MPL/MPK is defined as the cost minimizing combination = w/r
Thus,
MPL/MPK = D(Q)/dl = 5k
same will be done for L,
MPL/MPK = D(Q)/dk = 5L
We divide 5K and 5L
So,
5k/5L =$6/$12
k/L = 1/2
Thus,
k =L/2
Now, when we substitute the value L = 2k in Q we have the following below:
Q = 5k * (2k)
Given that Q = 4000
So,
4000=10k2
4000=k2
we divide
k =20
L = 2k = 2820
= 40
Therefore, L =40, k = 20