PBO and Periodic yield: Difference between pages

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''Pensions''. 
__NOTOC__
Projected Benefit Obligation.
Periodic yield is a rate of return - or cost of borrowing - expressed as the proportion by which the amount at the end of the period exceeds the amount at the start.  


== See also ==
* [[ABO]]
* [[Projected benefit obligation]]


<span style="color:#4B0082">'''Example 1'''</span>
GBP 1 million is borrowed or invested.
GBP 1.03 million is repayable at the end of the period.
The periodic yield (r) is:
r = (End amount / Start amount) - 1
Which can also be expressed as:
r = (End / Start) - 1
''or''
r = <math>\frac{End}{Start}</math> - 1
= <math>\frac{1.03}{1}</math> - 1
= 0.03
= '''3%'''
<span style="color:#4B0082">'''Example 2'''</span>
GBP  0.97 million is borrowed or invested.
GBP 1.00 million is repayable at the end of the period.
The periodic yield (r) is:
r = <math>\frac{End}{Start}</math> - 1
= <math>\frac{1.00}{0.97}</math> - 1
= 0.030928
= '''3.0928%'''
''Check:''
Amount at end = 0.97 x 1.030928 = 1.00, as expected.
<span style="color:#4B0082">'''Example 3'''</span>
GBP  0.97 million is invested.
The periodic yield is 3.0928%.
Calculate the amount repayable at the end of the period.
'''''Solution'''''
The periodic yield (r) is defined as:
r = <math>\frac{End}{Start}</math> - 1
''Rearranging this relationship:''
1 + r = <math>\frac{End}{Start}</math>
End = Start x (1 + r)
''Substituting the given information into this relationship:''
End = GBP 0.97m x (1 + 0.030928)
= '''GBP 1.00m'''
<span style="color:#4B0082">'''Example 4'''</span>
An investment will pay out a single amount of GBP 1.00m at its final maturity after one period.
The periodic yield is 3.0928%.
Calculate the amount invested at the start of the period.
'''''Solution'''''
As before, the periodic yield (r) is defined as:
r = <math>\frac{End}{Start}</math> - 1
''Rearranging this relationship:''
1 + r = <math>\frac{End}{Start}</math>
Start = <math>\frac{End}{(1 + r)}</math>
''Substitute the given data into this relationship:''
Start = <math>\frac{1.00}{(1  +  0.030928)}</math>
= '''GBP 0.97m'''
''Check:''
Amount at start = 0.97 x 1.030928 = 1.00, as expected.
====Effective annual rate====
The periodic yield (r) is related to the [[effective annual rate]] (EAR), and each can be calculated from the other.
'''''Conversion formulae (r to EAR and EAR to r):'''''
EAR = (1 + r)<sup>n</sup> - 1
r = (1 + EAR)<sup>(1/n)</sup> - 1
Where:
EAR = effective annual rate or yield
r = periodic interest rate or yield, as before
n = number of times the period fits into a calendar year
====Periodic discount rate====
The periodic yield (r) is also related to the [[periodic discount rate]] (d), and each can be calculated from the other.
'''''Conversion formulae (r to d and d to r):'''''
d = r / (1 + r)
r = d / (1 - d)
Where:
d = periodic discount rate
r = periodic interest rate or yield
==See also==
*[[Effective annual rate]]
*[[Discount rate]]
*[[Nominal annual rate]]
*[[Nominal annual yield]]
*[[Periodic discount rate]]
*[[Yield]]
*[[Forward yield]]
*[[Zero coupon yield]]
*[[Par yield]]

Revision as of 14:42, 17 November 2015

Periodic yield is a rate of return - or cost of borrowing - expressed as the proportion by which the amount at the end of the period exceeds the amount at the start.


Example 1

GBP 1 million is borrowed or invested.

GBP 1.03 million is repayable at the end of the period.


The periodic yield (r) is:

r = (End amount / Start amount) - 1

Which can also be expressed as:

r = (End / Start) - 1

or

r = <math>\frac{End}{Start}</math> - 1


= <math>\frac{1.03}{1}</math> - 1

= 0.03

= 3%


Example 2

GBP 0.97 million is borrowed or invested.

GBP 1.00 million is repayable at the end of the period.


The periodic yield (r) is:

r = <math>\frac{End}{Start}</math> - 1


= <math>\frac{1.00}{0.97}</math> - 1

= 0.030928

= 3.0928%


Check:

Amount at end = 0.97 x 1.030928 = 1.00, as expected.


Example 3

GBP 0.97 million is invested.

The periodic yield is 3.0928%.

Calculate the amount repayable at the end of the period.


Solution

The periodic yield (r) is defined as:

r = <math>\frac{End}{Start}</math> - 1


Rearranging this relationship:

1 + r = <math>\frac{End}{Start}</math>


End = Start x (1 + r)


Substituting the given information into this relationship:

End = GBP 0.97m x (1 + 0.030928)

= GBP 1.00m


Example 4

An investment will pay out a single amount of GBP 1.00m at its final maturity after one period.

The periodic yield is 3.0928%.

Calculate the amount invested at the start of the period.


Solution

As before, the periodic yield (r) is defined as:

r = <math>\frac{End}{Start}</math> - 1


Rearranging this relationship:

1 + r = <math>\frac{End}{Start}</math>


Start = <math>\frac{End}{(1 + r)}</math>


Substitute the given data into this relationship:

Start = <math>\frac{1.00}{(1 + 0.030928)}</math>


= GBP 0.97m


Check:

Amount at start = 0.97 x 1.030928 = 1.00, as expected.


Effective annual rate

The periodic yield (r) is related to the effective annual rate (EAR), and each can be calculated from the other.


Conversion formulae (r to EAR and EAR to r):

EAR = (1 + r)n - 1

r = (1 + EAR)(1/n) - 1


Where:

EAR = effective annual rate or yield

r = periodic interest rate or yield, as before

n = number of times the period fits into a calendar year


Periodic discount rate

The periodic yield (r) is also related to the periodic discount rate (d), and each can be calculated from the other.


Conversion formulae (r to d and d to r):

d = r / (1 + r)

r = d / (1 - d)


Where:

d = periodic discount rate

r = periodic interest rate or yield


See also