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	Tutorials relating to the topic of Discount rate.

The present value of future cash flows

The present value V of a cash flow ${\displaystyle c_{t}}$ occuring after an interval of t years at a dicount rate of r is given by:

${\displaystyle V={\frac {c_{t}}{(1+r)^{t}}}}$

The net present expected value of a future cash flow that has z possible values is given by calculating the value of ${\displaystyle c_{t}}$ in the above equation as:

${\displaystyle {\mbox{c}}=\sum _{x=1}^{z}p_{x}c_{x}}$

where ${\displaystyle p_{x}}$ is the probability of occurrence of the value ${\displaystyle c_{x}}$

The present value of a series of annual cash flows after annual intervals 0 to n is given by:

${\displaystyle {\mbox{V}}=\sum _{t=0}^{n}{\frac {c_{t}}{(1+r)^{t}}}}$.

The social time preference rate

The social time preference rate, s, is given by:-

s = δ + ηg

where:

δ is the pure time preference rate (otherwise known as the utility discount rate);

η is the elasticity of marginal utility with respect to consumption; and,

g is the expected future growth rate of consumption.

Evidence based upon the structure of personal income tax rates in OECD countries suggests that the value of η for most developed countries is close to 1.4 ^[1]. Estimates for the United Kingdom have ranged from 0.7 t0 1.5. ^[2].

References