Answer:
For this calculation we need to use the Effective Annual Yield Formula.
EY = (1 + r/n)^n - 1
Where:
- EY = Effective annual yield
- r = coupon rate
- n = number o periods the coupon rate is compounded per year
Plugging the amounts into the formula we obtain:
EY = (1 + 0.06/2)^2 - 1
EY = 0.062
EY = 6.2%
To obtain the effective semi-annual yield, we simply divide the effective annual yield by two:
= 0.062/2
=0.031
Effective semi-annual yield = 3.1%
In this case, we would not invest in the bond because the effective semi-annual yield does not reach the required 4%.
Explanation:
Answer:
The answer is 5%
Explanation:
Solution
Given that:
A stock with a beta =2.0
The expected rate of return =21%
Market return turnout = 8%
Now,
Rf = risk free return
Rp = risk premium =Rm -Rf
β = 2.0
Thus
The expected return R = Rf +β *Rp
= Rf +β * (Rm -Rf)
R = Rf +2.0 (Rm -Rf)
=Rf + 2 times risk premium
So,
The market turns by 8%
R = Rf +2.0 (Rm -8%-Rf)
=Rf + 2 Rm-16%-2Rf
Then
The expected return is reduced by 16%
Hence,
21% -16% =5%
Therefore the expected rate of return on the stock is 5%
Answer:
<em>Pay </em><em>the </em><em>balance</em><em> </em><em>in </em><em>full </em><em>at </em><em>the </em><em>end </em><em>of </em><em>the </em><em>month</em><em> </em><em>and </em><em>no </em><em>interest</em><em> </em><em>is </em><em>charged.</em><em> </em>
Answer:
i dont now you have to geve me more infoemation sorry
Answer:
$20,650.00
Explanation:
In the equity market, when shares are being bought there are usually bids submitted that will determine the buying price, so bid price is the price at which a share is bought. In this case it is $103.25.
When selling shares the price at which it is sold is the ask price.
Therefore the price for buying the IBM shares= Bid price* Quantity
= 103.25 * 200= $20,650
