Real: Difference between revisions
imported>Doug Williamson m (Link with Treasury inflation-indexed securities page.) |
imported>Doug Williamson (Make branding consistent) |
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A term which has been restated to exclude the effects of inflation. | A term which has been restated to exclude the effects of inflation. | ||
For example, if £100 is invested for a year at a nominal rate of 10% and inflation is 2%, we can say that the nominal rate is 10% but the real rate is only (1.10/1.02) - 1 = 7.84%, all rates being expressed as effective annual rates. | |||
For example, | |||
if £100 is invested for a year | |||
at a nominal rate of 10% and | |||
inflation is 2%, | |||
we can say that the nominal rate is 10% | |||
but the real rate is only (1.10/1.02) - 1 | |||
= 7.84%, | |||
all rates being expressed as effective annual rates. | |||
This is because goods which cost £100 today will cost £102 in a year's time. | This is because goods which cost £100 today will cost £102 in a year's time. | ||
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Notice how the inflation rate and the real rate compound together to produce the nominal rate, for example: | Notice how the inflation rate and the real rate compound together to produce the nominal rate, for example: | ||
(1.02 x 1.0784) - 1 = 10%. | (1.02 x 1.0784) - 1 | ||
= 10%. | |||
When either the inflation rate or the real rate is low, the result is approximately the same as simply adding or subtracting rates. | When either the inflation rate or the real rate is low, the result is approximately the same as simply adding or subtracting rates. | ||
For example | For example | ||
6% - 4% = +2%. | when the nominal rate is 6% | ||
and the inflation rate is 4%, | |||
the real rate is approximately: | |||
6% - 4% | |||
= +2%. | |||
(Calculated more strictly, it would be (1.06/1.04) - 1 = +1.92%, all rates being effective annual rates.) | (Calculated more strictly, it would be (1.06/1.04) - 1 = +1.92%, all rates being effective annual rates.) | ||
Taking another example, when the nominal rate is 3% and the inflation rate is 4%, the real rate is approximately: | Taking another example, | ||
when the nominal rate is 3% | |||
and the inflation rate is 4%, | |||
the real rate is approximately: | |||
3% - 4% | |||
= -1%. | |||
(Calculated more strictly, it would be (1.03/1.04) - 1 = -0.96%.) | (Calculated more strictly, it would be (1.03/1.04) - 1 = -0.96%.) |
Revision as of 14:48, 26 November 2014
1.
A term which has been restated to exclude the effects of inflation.
For example,
if £100 is invested for a year
at a nominal rate of 10% and
inflation is 2%,
we can say that the nominal rate is 10%
but the real rate is only (1.10/1.02) - 1
= 7.84%,
all rates being expressed as effective annual rates.
This is because goods which cost £100 today will cost £102 in a year's time.
Therefore only a 7.84% return has been made if we take into account the new prices of goods.
Notice how the inflation rate and the real rate compound together to produce the nominal rate, for example:
(1.02 x 1.0784) - 1
= 10%.
When either the inflation rate or the real rate is low, the result is approximately the same as simply adding or subtracting rates.
For example
when the nominal rate is 6%
and the inflation rate is 4%,
the real rate is approximately:
6% - 4%
= +2%.
(Calculated more strictly, it would be (1.06/1.04) - 1 = +1.92%, all rates being effective annual rates.)
Taking another example,
when the nominal rate is 3%
and the inflation rate is 4%,
the real rate is approximately:
3% - 4%
= -1%.
(Calculated more strictly, it would be (1.03/1.04) - 1 = -0.96%.)
2.
Inflation-proof.
3.
Tangible. For example the real assets of a business would include its stock, plant and machinery.
4.
Real property means land and buildings.
5.
Real-life issues and opportunities are those with a strong foundation in practical experience.
(Contrasted with other issues which are considered to be more theoretical.)
6.
Options. Relating to an operational decision or outcome.
7.
Economics. Referring to the part of the total economy which excludes financial markets and financial services.