Answer:
the portfolio's return will be Ep(r)= 9.2 %
Explanation:
if the stock lies on the security market line , then the expected return will be
Ep(r) = rf + β*( E(M)- rf)
where
Ep(r) = expected return of the portfolio
rf= risk free return
E(M) = expected return of the market
β = portfolio's beta
then
Ep(r) = rf + β*( E(M)- rf)
E(M) = (Ep(r) - rf ) / β + rf
replacing values
E(M) = (Ep(r) - rf ) / β + rf
E(M) = ( 17.2% - 3.2%) /1.4 + 3.2% = 13.2%
since the stock and the risk free asset belongs to the security market line , a combination of both will also lie in this line, then the previous equation of expected return also applies.
Thus for a portfolio of β=0.6
Ep(r) = rf + β*( E(M)- rf) = 3.2% + 0.6*(13.2%-3.2%) = 9.2 %
Ep(r)= 9.2 %
Answer:
the degree of operating leverage is 5
Explanation:
The computation of the degree of operating leverage is given below:
= Contribution margin ÷ EBIT
= (Sales - Variable expense) ÷ (Sales - Variable expense - Fixed expense)
= ($670,000 - $420,000) ÷ ($670,000 - $420,000 - $200,000)
= $250,000 ÷ $50,000
= 5
Hence, the degree of operating leverage is 5
Answer: Answer is 1
Explanation:
In a market economy, a high price is a signal for producers to supply more and consumers to buy less.
Answer:
False
Explanation:
Contribution margin per unit = Sales - variable cost
Contribution margin per unit (Model A) = $432 - $404
Contribution margin per unit (Model A) = $28 per unit
Contribution margin per unit (Model B) = $410 - $304
Contribution margin per unit (Model B) = $106 per unit
False, Contribution margin per unit (Model B) is higher so, motivated to push sales of Model A will be false.
Break-even in units = Fixed cost / Contribution margin per unit
Break-even in units (Model A) = Fixed cost / $28
Break-even in units (Model B) = Fixed cost / $106
