Consider a series of $79 end-of -period CFs spanning 2050-2056. The interest rate is 1.4%. What is the equivalent value of this series at the beginning of 2062? (answer: $618.30)
Please show work
Consider a series of $79 end-of -period CFs spanning 2050-2056. The interest rate is 1.4%. What...
Consider a series of $113 end-of-period CFs spanning 2050-2056 and a $50 CF at the beginning of 2042. The interest rate is 2.5%. What is the equivalent value of these CFs at the end of 2035?
Consider a series of end-of -period CFs spanning 2045-2056, which decrease by a fixed amount each period. The amount of the first CF in the series is $1,097 and the decrement is $73. The interest rate is 2.6%. What is the equivalent value of this series at the beginning of 2045? (answer: $7,318.57) Please show all work written out with formulas. I need to know how to arrive at the answer thanks.
Consider a series of $135 end of -period CFs spanning 2053-2057. The interest rate is 1.2%. What is the equivalent value of this series at the end of 2046? (answer: $606.37) Please show work
Consider a series of $12,564 end-of-period CFs spanning 2015-2024. The interest rate is 5%. What is the equivalent value of this series at the beginning 2015? (answer: $97,015.88) This is the answer but i do not know the formula to get this answer. Thanks.
Consider a series of $98 end-of-period CFs spanning 2052-2055 and a $52 CF at the end of 2040. The interest rate is 2.3%. What is the equivalent value of these CFs at the beginning of 2060?
Consider a series of $109 end-of-period CFs spanning 2053-2057 and a $107 CF at the beg of 2065. The interest rate is 2%. What is the equivalent value of these CFs at the beg of 2046?
Consider a $29,070 CF at the end of 2039. The interest rate is 6.8%. What is the equivalent uniform amount for a series of end-of-year CFs spanning 2012-2039? (answer: $372.31) What formula do they use to get this value?
Consider a cashflow of $1,382 at the beginning of 2069. What is the equivalent uniform amount for a series of end-of-year cash flows from 2052-2056? (i = 2.1%) Show work on paper, not excel.
Problem 1.4 (10 points) Consider a series of payments of $1,000 at the random arrival times of a Poisson process with parameter λ > O. If the (continuously compounded) interest rate is >0, then the present value at time 0 of a payment of $1,000 at time t is given by 1,000e-r Show that the expected total present value at time 0 of the series of payments made by time t>0 is given by $1,000x(1-e-')/r.
Problem 1.4 (10 points) Consider...
Consider the cash flow series shown below. What value of C makes
the inflow series equivalent
to the outflow series at an interest rate of 6% compounded
annually?