Answer:
B) $56,130
Explanation:
The cash flow statement shows how the company's operating, investing and financing activities affect the flow of cash by generation or use.
The investing activities section is where the purchase of fixed assets and the amount received for the disposal of these assets are accounted for.
Given that a gain was realized and the book value of the asset was given, the amount received for the disposal
= $5,278 + $50,852
= $56,130
This is the amount that will be reported in the investing activities section of the statement of cash flows as an inflow.
Answer:
Option c) how a consumer might trade off different levels of consumption of each of two goods, while staying at the same utility level.
Explanation:
This is the very definition of an indifference curve. The points in an indifference curve are the combinations of the quantities (level of consumption) of two different goods which will produce the very same utility to the consumer. The consumer will perceive any of those combinations as having the same utility for him.
For example, a usual graph of various indifference curves will look like the graph attached.
In this graph the combination of 2 pairs of shoes and 15 pants will be perceived as having the same utility as the combination of 5 pairs of shoes and 4 pants. Both are combinations in the same indifference curve, the green one, and the utility of any combination lying in that green curve will be rated the same: u = 1.
The proportion of the optimal risky portfolio that should be invested in stock A is 0%.
Using this formula
Stock A optimal risky portfolio=[(Wa-RFR )×SDB²]-[(Wb-RFR)×SDA×SDB×CC] ÷ [(Wa-RFR )×SDB²+(Wb-RFR)SDA²]- [(Wa-RFR +Wb-RFR )×SDA×SDB×CC]
Where:
Stock A Expected Return (Wa) =16%
Stock A Standard Deviation (SDA)= 18.0%
Stock B Expected Return (Wb)= 12%
Stock B Standard Deviation(SDB) = 3%
Correlation Coefficient for Stock A and B (CC) = 0.50
Risk Free rate of return(RFR) = 10%
Let plug in the formula
Stock A optimal risky portfolio=[(.16-.10)×.03²]-[(.12-.10)×.18×.03×0.50]÷ [(.16-.10 )×.03²+(.12-.10)×.18²]- [(.16-.10 +.12-.10 )×.18×.03×0.50]
Stock A optimal risky portfolio=(0.000054-0.000054)÷(0.000702-0.000216)
Stock A optimal risky portfolio=0÷0.000486×100%
Stock A optimal risky portfolio=0%
Inconclusion the proportion of the optimal risky portfolio that should be invested in stock A is 0%.
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