In practice, interest is paid more frequently than a year. However, interest rates are not quoted, for example, quarterly even if the interest is paid every three months. They are instead quoted per annum payable, for example, quarterly. This is the nominal interest rate. This is denoted by: \[i^{(p)}=pi_{[p]}\] where:
The relationship between the effective and nominal interest rate is: \[1+i=\left(1+\frac{i^{(p)}}{p}\right)^p\]
What is the nominal rate payable monthly if the effective rate is $10\%$?
Re-arranging the formula to make $i^{(12)}$ the subject and substituting in the numbers: \begin{align} &1+0.1=\left(1+\frac{~i^{(12)}~}{12}\right)^{12}\\ &\Rightarrow i^{(12)}=0.09568968515\\ &\Rightarrow i^{(12)} \approx 9.57\% \end{align}
What is the effective rate if the nominal rate per annum payable semi-annually is $4.94\%$?
Re-arranging the formula to make $i$ the subject and substituting in the numbers: \begin{align} &1+i=\left(1+\frac{0.0494}{2}\right)^2\\ &\Rightarrow i\approx5.00\% \end{align}
In a similar fashion, the nominal rate of discount is denoted by: \[d^{(p)}=pd_{[p]}\] where:
The relationship between the effective and nominal discount rate is: \[1-d=\left(1-\frac{d^{(p)}}{p}\right)^p.\]
What is the nominal rate payable quarterly if the effective rate is $10\%$?
Re-arranging the formula to make $d^{(4)}$ the subject and substituting in the numbers: \begin{align} &1-0.1=(1-\frac{~d^{(4)}~}{4})^4\\ &\Rightarrow d^{(4)}=0.1039850143\\ &\Rightarrow d^{(4)} \approx 10.40\% \end{align}
What is the effective rate if the nominal rate payable weekly is $22.27\%$?
Re-arranging the formula to make $d$ the subject and substituting in the numbers: \begin{align} &1-d=\left(1-\frac{0.2227}{52}\right)^{52}\\ &\Rightarrow d \approx 20.00\% \end{align}