5. A geometric series gradient has a positive cash flow of $1,000 at EOY 1, and...
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.
7) (30 points) First draw a cash flow diagram for the cash flow series given below. Then, write an expression (e.g., F-500(PA 5%, 3) + 100(FIG 5%, 3)) to compute the future value of the cash flow series at the end of year 10. You must use at least one uniform series factor, one arithmetic gradient series factor, and one geometric gradient series factor and 10% per year compounded annually. No calculations are needed. 10 Cash 1,000 3,000 3,300 -3,600...
QUESTION 5 Consider the following sequence of year-end cash flows: EOY 1 2 4 Cash Flow $1,000 $1,100 $1,200 $1,300 $1,400 What is the uniform annual equivalent (to the nearest whole dollar) if the interest rate is 2% per year? (Do not enter a dollar sign $ with your answer.) QUESTION 5 Consider the following sequence of year-end cash flows: EOY 1 2 4 Cash Flow $1,000 $1,100 $1,200 $1,300 $1,400 What is the uniform annual equivalent (to the nearest...
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.
Determine the present worth of a geometric gradient series 00.000 in year and increases of 6% each year throw interest rate is 10€ per year. = 50000 (1-(0.74378) ·50 000 a series with a cash flow /1+0.06 ) 0.1 -0.06 - gi 1 + 0.1 ugh year 8. The [15 marks] 3
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 $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 $ .
A cash flow series is increasing geometrically at the rate of 9% per year. The initial payment at EOY 1 is $4,000, with increasing annual payments ending at EOY 20. The interest rate is 16% compounded annually for the first seven years and 4% compounded annually for the remaining 13 years. Find the present amount that is equivalent to this cash flow.
QUESTION 5 Consider the following sequence of year-end cash flows: 5 2 3 4 EOY $2,600 $2.300 Cash Flow $1,400 $1,700 $2,000 What is the uniform annual equivalent (to the nearest whole dollar) if the intert rate is 4 % per year? (Do not enter a dollar sign $ with your answer.) QUESTION 5 Consider the following sequence of year-end cash flows: 5 2 3 4 EOY $2,600 $2.300 Cash Flow $1,400 $1,700 $2,000 What is the uniform annual equivalent...
The present worth of an uniform gradient decreasing series cash flow is KD 7000 . If the interest rate is 10% per year compounding annually and 8 annual payments with first payment is 1250 , calculate the g (decreasing amount)