Answer:
hope this helps
Assume that you hold a well-diversified portfolio that has an expected return of 11.0% and a beta of 1.20. You are in the process of buying 1,000 shares of Alpha Corp at $10 a share and adding it to your portfolio. Alpha has an expected return of 21.5% and a beta of 1.70. The total value of your current portfolio is $90,000. What will the expected return and beta on the portfolio be after the purchase of the Alpha stock? Do not round your intermediate calculations.
Old portfolio return
11.0%
Old portfolio beta
1.20
New stock return
21.5%
New stock beta
1.70
% of portfolio in new stock = $ in New / ($ in old + $ in new) = $10,000/$100,000=
10%
New expected portfolio return = rp = 0.1 × 21.5% + 0.9 × 11% =
12.05%
New expected portfolio beta = bp = 0.1 × 1.70 + 0.9 × 1.20 =
1.25
Explanation:
Answer:
It is more profitable to sell the units as-is.
Explanation:
Giving the following information:
Number of units= 12,600
Varto has two alternatives for these items:
(1) they can be sold to a wholesaler for $13 each
(2) they can be processed further for $272,300 and then sold for $34 each.
The first cost of $31 is a sunk cost, it will remain no matter which option is chosen. We will not take it into account for the decision making process.
Option 1:
Effect on income= 12,600*13= $163,800
Option 2:
Effect on income= 12,600*34 - 272,300= $156,100
It is more profitable to sell the units as-is.
Answer:
$522,000
Explanation:
The computation of the Kendall Ford's total investment spending in 2018 is shown below:
= Dealership spent + repairing cost + unsold cars and trucks were valued i.e closing cost - unsold cars and trucks were valued i.e opening cost
= $20,000 + $2,000 + $900,000 - $400,000
= $522,000
The $600,000 would be ignored and the rest cost are taken for the computation
The correct answer is the Life Cycle Fund.
The Life Cycle Fund is a mutual fund that is automatically adjusted during the life of the fund. The fund managers work to balance the investments in the fund to match an investor's age and risk tolerance as the investor gets closer to retirement.