The amount of effort that you put into your courses increases the marginal
cost of your education.
Marginal cost refers to the incremental cost which is accrued as a result of
increase in goods and services.
In this scenario, amount of effort put into courses entails more time and
money spent from buying of books and other materials. This therefore
depicts an increase in the incremental and marginal cost.
Read more about Marginal cost here brainly.com/question/16615264
Answer:
A. Increase cash by $120,000 and increase contributed capital by $120,000
Explanation:
when a company issues common stock then the company's cash balance and shareholders fund increases.
in this case, the company issued 2,500 shares of common stock at price $48;
The effect increase cash = 2,500*48
= $120,000
The effect increase contributed capital = 2,500*48
= $120,000
Therefore, The the correct balance sheet effect is, increase cash by $120,000 and increase contributed capital by $120,000.
Based on the returns on Digital Cheese and Executive Fruit, the variance and standard deviation of each stock is:
Variance:
- Digital cheese = 56.8
- Executive fruit = 34.8
Standard deviation:
- Digital cheese = 7.5
- Executive fruit = 5.9
This means that Digital Cheese is riskier if held alone.
<h3 /><h3>What are the variances and standard deviations of the stock?</h3>
Using a spreadsheet, one can order the given returns and then find the variance using mathematical functions.
When this is done, the variances on Digital cheese and Executive fruit would be 56.8 and 34.8 respectively.
You can then take the square roots of these variances to find the standard deviations as 7.5 and 5.9 respectively.
Because Digital Fruit has a higher standard deviation, it is considered to be riskier in terms of returns.
Find out more on the standard deviation of returns at brainly.com/question/17191184.
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Answer:
That A Newborn Fawn Is Randomly Selected. Round All Answers To Two Decimal Places A. The Mean Of This Distribution Is B. The Standard Deviation Is C. The Probability That The Fawn Will Weigh More Than 2.8 Kg. D. Suppose That It Is Known That The Fawn Weighs Less
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Suppose that the weight of an newborn fawn is uniformly distributed between 2 and 4 kg. Suppose that a newborn fawn is randomly selected. Round all answers to two decimal places
A. The mean of this distribution is
B. The standard deviation is
C. The probability that the fawn will weigh more than 2.8 kg.
D. Suppose that it is known that the fawn weighs less than 3.5 kg. Find the probability that the fawn weights more than 3 kg.
E. Find the 90th percentile for the weight of fawns.
Explanation:
please mark me as a brainless
The correct answer is government, i just took the test lol
