Discount basis: Difference between revisions
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The relationship between the periodic discount rate (d) and the periodic yield (r) is: | The relationship between the periodic discount rate (d) and the periodic yield (r) is: | ||
r = d / ( 1 - d ) | r = d / (1 - d) | ||
So in this case: | So in this case: | ||
r = 0.10 / ( 1 - 0.10 = 0.90 | r = 0.10 / (1 - 0.10) | ||
r = 0.10 / 0.90 | |||
= 11.11% | = 11.11% | ||
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== See also == | == See also == | ||
* [[Discount]] | |||
* [[Discount instruments]] | * [[Discount instruments]] | ||
* [[Discount rate]] | * [[Discount rate]] | ||
* [[Effective annual rate]] | * [[Effective annual rate]] | ||
* [[Nominal annual rate]] | * [[Nominal annual rate]] | ||
* [[Periodic discount rate]] | * [[Periodic discount rate]] | ||
* [[Periodic yield]] | * [[Periodic yield]] | ||
* [[Sterling commercial paper]] | |||
* [[US commercial paper]] | |||
* [[Yield basis]] | |||
[[Category:Corporate_finance]] |
Latest revision as of 00:02, 7 July 2022
This term can refer either to the cash flows of an instrument (Discount instruments) or to its basis of market quotation (Discount rate).
Example: Discount basis calculation
An instrument is quoted - on a discount basis, one period before its maturity - at a discount of 10% per period.
This means that it is currently trading at a price of 100% LESS 10% = 90% of its terminal value.
(The periodic yield on this instrument is 10% / 90% = 11.11%. So if the same instrument had been quoted on a yield basis, then the quoted yield per period = 11.11%.)
The relationship between the periodic discount rate (d) and the periodic yield (r) is:
r = d / (1 - d)
So in this case:
r = 0.10 / (1 - 0.10)
r = 0.10 / 0.90
= 11.11%