To clear a dead, a person agrees to pay 1000 now, another thousand years from now and another 1000 into years. If the future payments are discounted at 8% compounded quarterly, what is the present value of these payments?

To calculate the present value of the future payments, we need to discount each payment back to the present using the formula for compound interest:

PV = FV / (1 + r)^n

Where:
PV = Present value
FV = Future value
r = Interest rate per compounding period
n = Number of compounding periods

In this case, we are given:
FV1 = 1000 (paid now)
FV2 = 1000 (paid in another thousand years)
FV3 = 1000 (paid into years)
r = 8% compounded quarterly

First, let's calculate the number of compounding periods for each future payment:
Number of compounding periods for FV1 (paid now) = 1 (compounded quarterly)
Number of compounding periods for FV2 (paid in another thousand years) = 1000 * 4 (since it is compounded quarterly)
Number of compounding periods for FV3 (paid into years) = 1000 * 4^2 (since it is compounded quarterly)

Now, let's calculate the present value (PV) for each future payment:
PV1 = FV1 / (1 + r)^n1 = 1000 / (1 + 0.08/4)^1 = $1000
PV2 = FV2 / (1 + r)^n2 = 1000 / (1 + 0.08/4)^(1000 * 4) ≈ $13.38
PV3 = FV3 / (1 + r)^n3 = 1000 / (1 + 0.08/4)^(1000 * 4^2) ≈ $0.18

Finally, let's sum up the present values of all future payments to find the overall present value:
Overall Present Value (PV) = PV1 + PV2 + PV3 ≈ $1000 + $13.38 + $0.18 ≈ $1013.56

Therefore, the present value of these future payments is approximately $1013.56.