Answer:
The weighted average interest rate that Colgate faced on its short-term borrowings in 2013 was:
2.2%.
Explanation:
On page 62 of its 10-K annual report for the fiscal year ended December 31, 2013, it specifically reported that "the weighted-average interest rate on short-term borrowings of $13 in 2013 and $54 in 2012 included in Notes and loans payable in the Consolidated Balance Sheets as of December 31, 2013 and 2012 was 2.2% and 1.0%, respectively." To calculate the weighted-average interest rate, we multiply each loan amount by its interest rate to obtain the "per loan weight factor." Then add the per loan weight factors together. Add the loan amounts together. Divide the "total per loan weight factor" by the "total loan amount," and then multiply by 100 to calculate the weighted average.
Hello,
The sensitivity of consumers to price changes is measured by the <span>price elasticity of demand
Hope this helps
~HotTwizzlers</span>
D is the answer I’m sure of it
Answer:
The correct option is a. $61.25.
Explanation:
Note: The correct cost function of the farmer is as follows:
C(Q) = 0.05Q^2 ……………….. (1)
Differentiating equation
MC = C’(Q) = 0.1Q
P = Expected price = (25% * $3) + (50% * $3.50) + (25% * $4) = $3.50 ……. (2)
Since profit is maximized when MC = P, we equate equations (1) and solve for Q which is the expected profit-maximizing quantity as follows:
0.1Q = 3.50
Q = 3.50 / 0.1 = 35
Substituting Q = 35 into equation (1), we have:
C(Q) = 0.05 * 35^2 = $61.25
R(Q) = Maximum expected revenue = P * Q = $3.50 * 350 = $122.50
The farmer's maximum expected profit = R(Q) - C(Q) = $122.50 - $61.25 = $61.25
Therefore, the correct option is a. $61.25.
Answer:
The answer is 0.0707
Explanation:
Solution
Given that:
Probability Return Probability(return-expected return)^2
0.25 25 0.25(25-15)^2=25
0.5 15 0.5(15-15)^2=0
0.25 5 0.25(5-15)^2=25
Total = 25 +0 + 25
= 50
Thus
The next step is to find the standard deviation which is given below:
Standard deviation=[total probability (return-expected return)^2/total probability]^(1/2)
=(50)^(1/2)
=0.0707
Hence the standard deviation is 0.0707.
Note: The expected return is =15%
