CMBS and Compounding effect: Difference between pages
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The additional growth or additional interest, resulting from the compounding effects of - for example - interest on interest. | |||
Another example is the compounding effect of growth on growth. | |||
'''Example''' | |||
Interest quoted at 6% per annum, compounded annually, for two years maturity, means that the interest accumulated after two years is: | |||
= (1.06 x 1.06) - 1 | |||
= 12.36% for the two year period. | |||
Without the additional interest on interest, the total interest would have been simply | |||
6% per annum x 2 years | |||
= 12.00%. | |||
So the compounding effect of interest on interest here | |||
= 12.36% - 12.00% | |||
= 0.36% over the two year period (= 6% x 6%). | |||
When both the number of periods and the rate of growth/interest are low, compounding effects are relatively small. | |||
When either the number of periods or the rate of growth/interest - or both - are greater, compounding effects quickly become very much larger. | |||
== See also == | == See also == | ||
* [[ | * [[Compound interest]] | ||
* [[ | * [[Compounding factor]] | ||
* [[ | * [[Continuously compounded rate of return]] | ||
* [[ | * [[Discount]] | ||
[[Category:Manage_risks]] | |||
Revision as of 20:35, 15 January 2016
The additional growth or additional interest, resulting from the compounding effects of - for example - interest on interest.
Another example is the compounding effect of growth on growth.
Example
Interest quoted at 6% per annum, compounded annually, for two years maturity, means that the interest accumulated after two years is:
= (1.06 x 1.06) - 1
= 12.36% for the two year period.
Without the additional interest on interest, the total interest would have been simply
6% per annum x 2 years
= 12.00%.
So the compounding effect of interest on interest here
= 12.36% - 12.00%
= 0.36% over the two year period (= 6% x 6%).
When both the number of periods and the rate of growth/interest are low, compounding effects are relatively small.
When either the number of periods or the rate of growth/interest - or both - are greater, compounding effects quickly become very much larger.
