Answer:
a. 0.75% per month
b. 2.25% per quarter
c. 4.5% semi- annually
d. 9% yearly
Explanation:
a. Computing the effective interest rate per payment period for the payment schedule which is monthly:
Effective rate (monthly) = Nominal rate (r) / Compounded monthly (m)
where
r is 9%
m is 12
Putting the values above:
= 9% / 12
= 0.75% per month
b. Computing the effective interest rate per payment period for the payment schedule which is quarterly:
Effective rate (quarterly) = Nominal rate (r) / Compounded quarterly (m)
where
r is 9%
m is 4
Putting the values above:
= 9% / 4
= 2.25% per quarter
c. Computing the effective interest rate per payment period for the payment schedule which is semi- annually:
Effective rate (semi- annually) = Nominal rate (r) / Compounded quarterly (m)
where
r is 9%
m is 2 (every 6 months)
Putting the values above:
= 9% / 2
= 4.5% semi- annually
d. Computing the effective interest rate per payment period for the payment schedule which is annually:
Effective rate (annually) = Nominal rate (r) / Compounded yearly (m)
where
r is 9%
m is 1 (end of the year)
Putting the values above:
= 9% / 1
= 9% yearly
Answer:
The correct answer is True.
Explanation:
Economic efficiency is the efficiency with which an economic system uses productive resources to meet its needs. According to Todaro the concept means in matters of "production, use the factors of production in combinations of lower cost, in consumption, allocation of expenses that maximize consumer satisfaction (utility)".
Economic or income equality, social equality and cultural equality would be achieved if economic, social and cultural rights - second generation human rights - are fulfilled. Equity or equal resources is essential both to fully exercise civil and political rights and to have a decent life.
Option 1: PV = $400,000
Option 2: Receive (FV) $432,000 in one year
PV = FV(1/(1+i)^n), where i= 8% = 0.08, n = 1 year
PV = 432,000(1/(1+0.08)^1) = $400,000
Option 3: Receive (A) $40,000 each year fro 20 years
PV= A{[1-(1+i)^-n]/i} where, n = 20 years
PV = 40,000{[1-(1+0.08)^-20]/0.08} = $392,725.90
Option 4: Receive (A) $36,000 each year from 30 years
PV = 36,000{[1-(1+0.08)^-30]/0.08} = $405,280.20
On the basis of present value computations above, option 4 is the best option for Kerry Blales. This option has the highest present value of $405,280.20
Answer:
Jet blue= thanks frequent customers with small gesturer
Tesla= meet your customers where they r at
