Answer:
1.10
Explanation:
The computation of portfolio's beta is shown below:-
= Stock A Beta × Invested in Stock A ÷ Total value + Stock B Beta × (Total value - Invested in Stock A) ÷ Invested in Stock A
= 0.75 × $47,500 ÷ $100,000 + 1.42 × ($100,000 - $47,500) ÷ $100,000
= 0.75 × $47,500 ÷ $100,000 + 1.42 × $52,500 ÷ $100,000
= 0.75 × 0.475 + 1.42 × 0.525
= 0.35625 + 0.7455
= 1.10175
or
= 1.10
Therefore for computing the portfolio beta we simply applied the above formula.
Answer:
D. Price will rise, quantity purchased will fall, and gross revenues will fall.
Explanation:
It will lead to a higher price of the good as the management has to take into consideration the amount to wages to be paid to the workers, thus increasing the price of the goods. This will result to a lower demand at a higher price because the price increases and competitions will take advantage of the situation and that will also reduce the revenue of the firm.
Answer:
Correct option is E.
Explanation:
There is not enough information to calculate the amount.
Net operating asset= Operating Assets - Operating Liabilities
=$5489 Million - $2066 Million
=$3423 Million
Hence Average net operating assets can't be calculated by given information.
Answer:
(A)Fv= $864.2
(B) Fv= $1302.05
(C) Fv= $2003.4
(D) Fv= $96817.21
Explanation:
Giving the following information:
Initial investment= $550
We will use the final value formula:
FV=Present value*(1+i)^n
(A) 9% compounded annually for 5 years.
Fv= 550*(1.09)^5=$864.2
(B) 9% compounded semiannually for 5 years.
Fv= 550*(1.09)^10= $1302.05
(C) 9% compounded quarterly for 5 years.
Fv= 550*(1.09)^15= $2003.4
(D) 9% compounded monthly for 5 years.
Fv= 550*(1.09)^60=$96817.21