Question 5 10 pts Find the value of X1, the first in the following arithmetic gradient...
The future worth in year 10 of an arithmetic gradient cash flow series for years 1 through 10 is $500,000. If the gradient, G, increases each year at $3,000 per year, determine the present worth of the uniform series only, at an interest rate of 10% per year.
O pts Question 2 If a solar panel system has an increasing annual maintenance cost (an arithmetic gradient) of $500 per year over an 8 year period THAT STARTS AT YEAR 4, then what is the present value based on 10% interest? To be clear: the total period is 12 years with an 8 year gradient starting in year 4. O pts Question 3 If we add an $800 uniform annual payment to the solar panel system of problem #2...
The future worth in year 10 of an arithmetic gradient cash flow series for years 1 through 10 is $675,000. If the gradient increase each year, G, is $1750, determine the cash flow in year 1 at an interest rate of 8% per year.
The future worth in year 10 of an arithmetic gradient cash flow series for years 1 through 10 is $700,000. If the gradient increase each year, G, is $2750, determine the cash flow in year 1 at an interest rate of 10% per year.
The future worth in year 10 of an arithmetic gradient cash flow series for years 1 through 10 is $575,000. If the gradient increase each year, G, is $1750, determine the cash flow in year 1 at an interest rate of 11% per year. The cash flow in year 1 is $ .
An arithmetic cash flow gradient series equals $450 in year 1, $550 in year 2, and amounts increasing by $100 per year through year 13. At i = 6% per year, determine the present worth of the cash flow series in year The present worth of the cash flow series in year O is $ .
An arithmetic cash flow gradient series equals $600 in year 1, $700 in year 2, and amounts increasing by $100 per year through year 10. At i = 9% per year, determine the present worth of the cash flow series in year 0. The present worth of the cash flow series in year 0 is $
Referencing the Relations for Discrete Cash Flows with End of Period Compounding posted as a guide, and given: an arithmetic gradient value, G = $5,000, an interest rate, i=10% per year, and a time period, n=5 years, and a Present Worth, P=?, that is unknown, (a) construct a cash flow diagram (CFD), and (b) calculate the unknown Present Worth, P=?, using the Arithmetic Gradient Present Worth formula, showing all algebraic steps in your Solution.
1. Find the numerical value of the following factor by
interpolation
(P/F, 14.75%, 8 )
2. A cash flow sequence starts in year 1 at $9000 and decreases
by $250 each year through year 12. (a) Determine the value of the
gradient G; (b) determine the amount of cash flow at the end of
year 8; and (c) determine the value of n for the gradient.
3. Amazon is considering purchasing a sophisticated computer system
to “cube” a book’s dimensions—measure...
An arithmetic cash flow gradient series equals $650 in year 1, $750 in year 2, and amounts increasing by $100 per year through year 10. At i = 9% per year, determine the present worth of the cash flow series in year 0.