If a portfolio is comprised of two stocks. Stock A comprises 65% of the portfolio and has a beta of 1.21. The portfolio beta is 1.119.
<h3>Portfolio beta</h3>
Using this formula
Portfolio beta=(Stock A portfolio×beta)+[(1-Stock A porfolio)× Stock B beta]
Let plug in the formula
βp = (.65 × 1.21) + [(1 - .65) × .95]
βp = (.7865) + [.35 × .95]
βp= .7865+ .3325
βp = 1.119
Therefore the portfolio beta is 1.119.
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The value of the subject land is $84,000.
Given,
75,000 / 250,000 = 0.30
280,000 * 0.30 = 84,000
Land value is the measure of the way lots a plot of land is worth, now not counting any buildings but including improvements inclusive of better drainage. when a landowner can pay taxes on her actual property, a part of what is taxed is the fee of the land, in addition to whatever structures sit down atop it.
To measure the price of land use the traditional value approach: Use RS means statistics on prices to calculate the fee of the belongings as though it has been new. Subtract depreciation. The result is an estimate of the fee of the modern structure. Subtract from sale fee to get land cost.
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<em>Your question is incomplete. Please read below to find the missing content.</em>
The subject property has a total value of $280,000 by the sales comparison approach. A competitive neighborhood nearby has home sales with a median value of $250,000, and recent lot sales at $75,000. By allocation, what would be the value of the subject land?
$68,000
$76,000
$84,000
$92,500
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Answer:
Okay
Explanation:
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Answer:
$4,420.35
Explanation:
Bond Price = ![C x [1 - (1 + r)^{-n} / r] + F / (1 + r)^{n}](https://tex.z-dn.net/?f=C%20x%20%5B1%20-%20%281%20%2B%20r%29%5E%7B-n%7D%20%2F%20r%5D%20%2B%20F%20%2F%20%281%20%2B%20r%29%5E%7Bn%7D)
Where:
- C = Coupon
- r = Yield to Maturity
- n = compounding periods to maturity
Now we plug the amounts into the formula =
![Bond Price = $140 x [1 - (1 + 0.034)^{-32} / 0.034] + $5,000 / (1 + 0.034)^{32}](https://tex.z-dn.net/?f=Bond%20Price%20%3D%20%24140%20x%20%5B1%20-%20%281%20%2B%200.034%29%5E%7B-32%7D%20%2F%200.034%5D%20%2B%20%245%2C000%20%2F%20%281%20%2B%200.034%29%5E%7B32%7D)
