Littlewood polynomial: Difference between revisions
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The '''annual effective discount rate''' is the annual interest divided by the capital including that interest, which is the interest rate divided by 100% plus the interest rate. This rate is lower than the interest rate; it corresponds to using the value after a year as the [[nominal value]], and seeing the initial value as the nominal value minus a [[discounts and allowances|discount]]. It is used for [[United States Treasury security#Treasury bill|U.S. Treasury bills]] and similar financial instruments. It is the annual [[discount factor]] to be applied to the future cash flow, to find the discount, subtracted from a future value to find the value one year earlier. | |||
For example, consider a [[government bond]] that sells for $95 and pays $100 in a year's time. The discount rate is | |||
: <math>\frac{100-95}{100} = 5.00\%</math> | |||
The interest rate is calculated using 95 as the base | |||
:<math>\frac{100-95}{95} = 5.26\%</math> | |||
For every annual [[effective interest rate]], there is a corresponding annual effective discount rate, given by | |||
:<math>d = \frac{i}{1+i}\approx i-i^2</math> | |||
or inversely, | |||
:<math>i = \frac{d}{1-d}\approx d+d^2</math> | |||
where the approximations apply for small ''i'' and ''d''; in fact ''i'' - ''d'' = ''id''. | |||
==Annual discount rate convertible <math>\,p</math>thly== | |||
A discount rate applied <math>\,p</math> times over equal subintervals of a year is found from the annual effective rate d as | |||
:<math>1-d = \left(1-\frac{d^{(p)}}{p}\right)^p</math> | |||
where <math>\,d^{(p)}</math> is called the annual nominal rate of discount convertible <math>\,p</math>thly. | |||
:<math>1-d = \exp (-d^{(\infty)})</math> | |||
<math>\,d^{(\infty)}=\delta</math> is the [[force of interest]]. | |||
The rate <math>\,d^{(p)}</math> is always bigger than d because the rate of discount convertible pthly is applied in each subinterval to a smaller (already discounted) sum of money. As such, in order to achieve the same total amount of discounting the rate has to be slightly more than 1/pth of the annual rate of discount. | |||
==Business calculations== | |||
Businesses consider this discount rate when deciding whether to invest profits to buy equipment or whether to deliver the profit to shareholders. In an ideal world, they would buy a piece of equipment if shareholders would get a bigger profit later. The amount of extra profit a shareholder requires to prefer that the company buy the equipment rather than giving them the profit now is based on the shareholder's discount rate. A common way of estimating shareholders' discount rates uses share price data is known as the [[capital asset pricing model]]. Businesses normally apply this discount rate by calculating the [[net present value]] of the decision. | |||
==See also== | |||
* [[Actuarial notation#Interest_rates|Notation of interest rates]] | |||
==References== | |||
http://www.mcu.edu.tw/department/management/stat/ch_web/etea/Theory%20of%20Interest/interest2.pdf | |||
{{Reflist}} | |||
[[Category:Interest rates]] |
Latest revision as of 10:20, 19 March 2013
The annual effective discount rate is the annual interest divided by the capital including that interest, which is the interest rate divided by 100% plus the interest rate. This rate is lower than the interest rate; it corresponds to using the value after a year as the nominal value, and seeing the initial value as the nominal value minus a discount. It is used for U.S. Treasury bills and similar financial instruments. It is the annual discount factor to be applied to the future cash flow, to find the discount, subtracted from a future value to find the value one year earlier.
For example, consider a government bond that sells for $95 and pays $100 in a year's time. The discount rate is
The interest rate is calculated using 95 as the base
For every annual effective interest rate, there is a corresponding annual effective discount rate, given by
or inversely,
where the approximations apply for small i and d; in fact i - d = id.
Annual discount rate convertible thly
A discount rate applied times over equal subintervals of a year is found from the annual effective rate d as
where is called the annual nominal rate of discount convertible thly.
is the force of interest.
The rate is always bigger than d because the rate of discount convertible pthly is applied in each subinterval to a smaller (already discounted) sum of money. As such, in order to achieve the same total amount of discounting the rate has to be slightly more than 1/pth of the annual rate of discount.
Business calculations
Businesses consider this discount rate when deciding whether to invest profits to buy equipment or whether to deliver the profit to shareholders. In an ideal world, they would buy a piece of equipment if shareholders would get a bigger profit later. The amount of extra profit a shareholder requires to prefer that the company buy the equipment rather than giving them the profit now is based on the shareholder's discount rate. A common way of estimating shareholders' discount rates uses share price data is known as the capital asset pricing model. Businesses normally apply this discount rate by calculating the net present value of the decision.
See also
References
http://www.mcu.edu.tw/department/management/stat/ch_web/etea/Theory%20of%20Interest/interest2.pdf 43 year old Petroleum Engineer Harry from Deep River, usually spends time with hobbies and interests like renting movies, property developers in singapore new condominium and vehicle racing. Constantly enjoys going to destinations like Camino Real de Tierra Adentro.