De Moivre's formula: Difference between revisions

De Moivre's Formula[edit]

De Moivre's formula is a mathematical formula that relates complex numbers to trigonometric functions. It is named after Abraham de Moivre, a French mathematician who first discovered and published the formula in the 18th century. The formula is widely used in various branches of mathematics, including complex analysis, number theory, and signal processing.

Definition[edit]

De Moivre's formula states that for any complex number z and any positive integer n:

{{{1}}}

where z is a complex number of the form {{{1}}} , r is the magnitude (or modulus) of z, and \theta

is the argument (or phase) of z.

Applications[edit]

De Moivre's formula has numerous applications in mathematics. Some of the key applications include:

1. **Trigonometry**: The formula allows for the calculation of powers of complex numbers in trigonometric form, which simplifies various trigonometric identities and calculations.

2. **Roots of Unity**: De Moivre's formula is used to find the roots of unity, which are complex numbers that satisfy the equation {{{1}}} . These roots have important applications in number theory, algebraic geometry, and signal processing.

3. **Complex Analysis**: The formula is a fundamental tool in complex analysis, a branch of mathematics that deals with functions of complex variables. It is used to derive important results, such as Euler's formula and the exponential function.

4. **Signal Processing**: De Moivre's formula is used in signal processing to analyze and manipulate signals in the frequency domain. It allows for the representation of periodic signals as a sum of complex exponential functions, which simplifies their analysis.

Example[edit]

Let's consider an example to illustrate the use of De Moivre's formula. Suppose we want to calculate (1 + i)^5 . We can write the complex number 1 + i

in trigonometric form as 2(\cos(\frac{\pi}{4}) + i\sin(\frac{\pi}{4}))

. Applying De Moivre's formula, we have:

{{{1}}}

Simplifying further, we get:

{{{1}}} {2} - i\frac{\sqrt{2}}{2}) = -16\sqrt{2} - 16i\sqrt{2}}}

See Also[edit]

• Complex Numbers
• Trigonometry
• Euler's Formula
• Roots of Unity

References[edit]

1. De Moivre, A. (1730). The Doctrine of Chances: A Method of Calculating the Probabilities of Events in Play. London: W. Pearson.

2. Stein, S. K. (2003). Complex Analysis. Princeton, NJ: Princeton University Press.