Answer:
$6414.27
Explanation:
P= C ( 1+r )^t
Where C = $2000, r =6% and t = 20years
P = 2000 ( 1 + 6/100 )^20
P = 2000 ( 1+0.06 )^20
P = 2000 ( 1.06 )^20
P = 2000×3.20713
P = 6414.2709
P = $6414.27
Lorenz curve shows income distribution, hence the correct answer is (D).
Explanation: Lorenz curve is the graphical distribution of the income distribution or wealth distribution. It is also known as probability plot. It has a line of equality (always 45 degrees) which depicts the fair means of income distribution and data when plotted on the curve tells that how much inequality prevails. Horizontal axis shows the increasing share of population and vertical axis shows the increasing percentage of total income received.
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Answer:
a. True
Explanation:
from the CAPM formula we can derive the statemeent as true.
risk free = 0.05
market rate = 0.12
premium market = (market rate - risk free) 0.07
beta(non diversifiable risk) = 0
Ke 0.05000
As the beta multiplies the difference between the market rate and risk-free rate a beta of zero will nulify the second part of the equation leaving only the risk-free rate. This means the portfolio is not expose to volatility
You can check on your account online or when you get your statement it will have all the charges from that billing period.
Answer:
Market price of Bond = $4603.116669 rounded off to $4603.12
Explanation:
To calculate the price of the bond, we need to first calculate the coupon payment per period. We assume that the interest rate provided is stated in annual terms. As the bond is a semi annual bond, the coupon payment, number of periods and semi annual YTM will be,
Coupon Payment (C) = 5000 * 0.0363 * 1/2 = $90.75
Total periods (n)= 23 * 2 = 46
r = 4.17% * 1/2 = 2.085% or 0.02085
The formula to calculate the price of the bonds today is attached.
Bond Price = 90.75 * [( 1 - (1+0.02085)^-46) / 0.02085] + 5000 / (1+0.02085)^46
Bond Price = $4603.116669 rounded off to $4603.12