Answer:
The equivalent present worth of the series is $4,182.21
Explanation:
Fix periodic payments for a specific period of time are annuity payment and the payments made at the start of each period is known as advance annuity.
As per given data
Inflation per year = 18.3% / 5 = 3.66%
numbers of period = 5 years
Payment per period = $897.63
Use following formula to calculate the present value of annuity payments
PV of annuity = P x ( 1 - ( 1 + r )^-n / r
Where
P = Payment per period = $897.63
r = rate in of interest = 3.66%
n = numbers of periods = 5 years
Placing values in the formula
Equivalent present worth of the series = $897.63 + $897.63 x ( 1 - ( 1 + 3.66% )^-(5-1) / 3.66% )
Equivalent present worth of the series = $4,182.21
Answer:
C Services are provided by both private and public sectors.
Explanation:
In a mixed economy, the private sector has the freedom to participate in economic activities, although the government has a role to play. A mixed economy allows the private sector to own the factors of production hence are free to decide what business they wish to run. Consumers have the liberty to select their suppliers. There is competition in the market place as profits motivate entrepreneurs.
The government is involved in the provision of public goods such as roads, hospitals, and schools. It provides regulatory services to the private sector to ensure fairness in the economy.
Answer:
75 shares
Explanation:
In this specific scenario, it seems that Kevin is treated to 75 shares prior to the redemption. This is calculated by adding the 50 shares that Kevin holds directly prior to the redemption itself as well as the 25 extra shares that are held by AMI. These 25 shares are 50% of the total 50 shares that AMI holds since Kevin is a 50% partner.
Answer:
Bond Price = $877.3835955 rounded off to $877.380
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 an annual bond, the coupon payment, number of periods and r or YTM will be,
Coupon Payment (C) = 0.064 * 1000 = $64
Total periods (n)= 25
r or YTM = 7.5% or 0.075
The formula to calculate the price of the bonds today is attached.
Bond Price = 64 * [( 1 - (1+0.075)^-25) / 0.075] + 1000 / (1+0.075)^25
Bond Price = $877.3835955 rounded off to $877.380
