3.3 Potenzen und Wurzeln
Aus Online Mathematik Brückenkurs 2
K |
K (small fixes) |
||
| Zeile 2: | Zeile 2: | ||
{| border="0" cellspacing="0" cellpadding="0" height="30" width="100%" | {| border="0" cellspacing="0" cellpadding="0" height="30" width="100%" | ||
| style="border-bottom:1px solid #797979" width="5px" | | | style="border-bottom:1px solid #797979" width="5px" | | ||
| - | {{Vald flik|[[3.3 Potenser | + | {{Vald flik|[[3.3 Potenser och rötter|Theory]]}} |
{{Ej vald flik|[[3.3 Övningar|Exercises]]}} | {{Ej vald flik|[[3.3 Övningar|Exercises]]}} | ||
| style="border-bottom:1px solid #797979" width="100%"| | | style="border-bottom:1px solid #797979" width="100%"| | ||
| Zeile 8: | Zeile 8: | ||
{{Info| | {{Info| | ||
| - | ''' | + | '''Contents:''' |
| - | * De Moivre's | + | * De Moivre's formula |
* Binomial equations | * Binomial equations | ||
| - | * | + | * Exponential function |
| - | * | + | * Euler's formula |
* Completing the square | * Completing the square | ||
* Quadratic equations | * Quadratic equations | ||
| Zeile 22: | Zeile 22: | ||
After this section, you will have learned how to: | After this section, you will have learned how to: | ||
| - | * Calculate the powers of complex numbers with | + | * Calculate the powers of complex numbers with de Moivre's formula. |
* Calculate the roots of certain complex numbers by rewriting to polar form. | * Calculate the roots of certain complex numbers by rewriting to polar form. | ||
*Solve binomial equations. | *Solve binomial equations. | ||
| - | * Complete the square for | + | * Complete the square for complex quadratic expressions. |
* Solve complex quadratic equations. | * Solve complex quadratic equations. | ||
}} | }} | ||
| - | == De Moivre's | + | == De Moivre's formula== |
The computational rules <math>\ \arg (zw) = \arg z + \arg w\ </math> and <math>\ |\,zw\,| = |\,z\,|\cdot|\,w\,|\ </math> mean that | The computational rules <math>\ \arg (zw) = \arg z + \arg w\ </math> and <math>\ |\,zw\,| = |\,z\,|\cdot|\,w\,|\ </math> mean that | ||
| Zeile 45: | Zeile 45: | ||
</div> | </div> | ||
| - | which is usually referred to as ''de Moivres | + | which is usually referred to as ''de Moivres formula''. This relationship is very useful when it comes to deriving trigonometric identities and calculating the roots and powers of complex numbers. |
| Zeile 55: | Zeile 55: | ||
| - | We write <math>z</math> in polar form <math>\ \ z= \frac{1}{\sqrt2} + \frac{i}{\sqrt2} = 1\cdot \Bigl(\cos \frac{\pi}{4} + i\sin \frac{\pi}{4}\Bigr)\ \ </math> and | + | We write <math>z</math> in polar form <math>\ \ z= \frac{1}{\sqrt2} + \frac{i}{\sqrt2} = 1\cdot \Bigl(\cos \frac{\pi}{4} + i\sin \frac{\pi}{4}\Bigr)\ \ </math> and Moivre's formula gives |
{{Fristående formel||<math>\begin{align*}z^3 &= \Bigl( \cos\frac{\pi}{4} + i\,\sin\frac{\pi}{4}\,\Bigr)^3 = \cos\frac{3\pi}{4} + i\,\sin\frac{3\pi}{4} = -\frac{1}{\sqrt2} + \frac{1}{\sqrt2}\,i = \frac{-1+i}{\sqrt2}\,\mbox{,}\\[6pt] z^{100} &= \Bigl( \cos\frac{\pi}{4} + i\,\sin\frac{\pi}{4}\,\Bigr)^{100} = \cos\frac{100\pi}{4} + i\,\sin\frac{100\pi}{4}\\[4pt] &= \cos 25\pi + i\,\sin 25\pi = \cos \pi + i\,\sin \pi = -1\,\mbox{.}\end{align*}</math>}} | {{Fristående formel||<math>\begin{align*}z^3 &= \Bigl( \cos\frac{\pi}{4} + i\,\sin\frac{\pi}{4}\,\Bigr)^3 = \cos\frac{3\pi}{4} + i\,\sin\frac{3\pi}{4} = -\frac{1}{\sqrt2} + \frac{1}{\sqrt2}\,i = \frac{-1+i}{\sqrt2}\,\mbox{,}\\[6pt] z^{100} &= \Bigl( \cos\frac{\pi}{4} + i\,\sin\frac{\pi}{4}\,\Bigr)^{100} = \cos\frac{100\pi}{4} + i\,\sin\frac{100\pi}{4}\\[4pt] &= \cos 25\pi + i\,\sin 25\pi = \cos \pi + i\,\sin \pi = -1\,\mbox{.}\end{align*}</math>}} | ||
| Zeile 69: | Zeile 69: | ||
{{Fristående formel||<math>\begin{align*} (\cos v + i\,\sin v)^2 &= \cos^2\!v + i^2 \sin^2\!v + 2i \sin v \cos v\\ &= \cos^2\!v - \sin^2\!v + 2i \sin v \cos v\end{align*}</math>}} | {{Fristående formel||<math>\begin{align*} (\cos v + i\,\sin v)^2 &= \cos^2\!v + i^2 \sin^2\!v + 2i \sin v \cos v\\ &= \cos^2\!v - \sin^2\!v + 2i \sin v \cos v\end{align*}</math>}} | ||
| - | and according to | + | and according to de Moivre's formula one gets |
{{Fristående formel||<math>(\cos v + i \sin v)^2 = \cos 2v + i \sin 2v\,\mbox{.}</math>}} | {{Fristående formel||<math>(\cos v + i \sin v)^2 = \cos 2v + i \sin 2v\,\mbox{.}</math>}} | ||
| Zeile 91: | Zeile 91: | ||
*<math>\quad 1+i\sqrt{3} = 2\Bigl(\cos\frac{\pi}{3} + i\,\sin\frac{\pi}{3}\,\Bigr)\vphantom{\biggl(}</math>, | *<math>\quad 1+i\sqrt{3} = 2\Bigl(\cos\frac{\pi}{3} + i\,\sin\frac{\pi}{3}\,\Bigr)\vphantom{\biggl(}</math>, | ||
*<math>\quad 1+i = \sqrt2\,\Bigl(\cos\frac{\pi}{4} + i\,\sin\frac{\pi}{4}\,\Bigr)\vphantom{\biggl(}</math>. | *<math>\quad 1+i = \sqrt2\,\Bigl(\cos\frac{\pi}{4} + i\,\sin\frac{\pi}{4}\,\Bigr)\vphantom{\biggl(}</math>. | ||
| - | Then we | + | Then we get with de Moivre's formula |
{{Fristående formel||<math>\frac{(\sqrt3 + i)^{14}}{(1+i\sqrt3\,)^7(1+i)^{10}} = \frac{\displaystyle 2^{14}\Bigl(\cos\frac{14\pi}{6} + i\,\sin \frac{14\pi}{6}\,\Bigr)\vphantom{\biggl(}}{\displaystyle 2^7\Bigl(\cos \frac{7\pi}{3} + i\,\sin\frac{7\pi}{3}\,\Bigr) \cdot (\sqrt{2}\,)^{10}\Bigl(\cos\frac{10\pi}{4} + i\,\sin\frac{10\pi}{4}\,\Bigr)\vphantom{\biggl(}}</math>}} | {{Fristående formel||<math>\frac{(\sqrt3 + i)^{14}}{(1+i\sqrt3\,)^7(1+i)^{10}} = \frac{\displaystyle 2^{14}\Bigl(\cos\frac{14\pi}{6} + i\,\sin \frac{14\pi}{6}\,\Bigr)\vphantom{\biggl(}}{\displaystyle 2^7\Bigl(\cos \frac{7\pi}{3} + i\,\sin\frac{7\pi}{3}\,\Bigr) \cdot (\sqrt{2}\,)^{10}\Bigl(\cos\frac{10\pi}{4} + i\,\sin\frac{10\pi}{4}\,\Bigr)\vphantom{\biggl(}}</math>}} | ||
| Zeile 104: | Zeile 104: | ||
== Binomial equations == | == Binomial equations == | ||
| - | A complex number <math>z</math> is called the ''n'' | + | A complex number <math>z</math> is called the ''n''th root of the complex number <math>w</math> if |
<div class="regel"> | <div class="regel"> | ||
{{Fristående formel||<math>z^n= w \mbox{.}</math>}} | {{Fristående formel||<math>z^n= w \mbox{.}</math>}} | ||
</div> | </div> | ||
| - | The above relationship can also be seen as an equation in which <math>z</math> is unknown. This type of equation is called a ''binomial equation''. The solutions | + | The above relationship can also be seen as an equation in which <math>z</math> is unknown. This type of equation is called a ''binomial equation''. The solutions are obtained by rewriting both sides in polar form and comparing both the moduli and the arguments. |
For a given number <math>w=|\,w\,|\,(\cos \theta + i\,\sin \theta)</math> one assumes that <math>z=r\,(\cos \alpha + i\, \sin \alpha)</math> and after insertion, the binomial equation becomes | For a given number <math>w=|\,w\,|\,(\cos \theta + i\,\sin \theta)</math> one assumes that <math>z=r\,(\cos \alpha + i\, \sin \alpha)</math> and after insertion, the binomial equation becomes | ||
{{Fristående formel||<math>r^{\,n}\,(\cos n\alpha + i \sin n\alpha) =|w|\,(\cos \theta + i \sin \theta)\,\mbox{,}</math>}} | {{Fristående formel||<math>r^{\,n}\,(\cos n\alpha + i \sin n\alpha) =|w|\,(\cos \theta + i \sin \theta)\,\mbox{,}</math>}} | ||
| - | where | + | where de Moivres formula has been used on the left-hand side. Equating moduli and arguments gives |
{{Fristående formel||<math>\biggl\{\begin{align*} r^{\,n} &= |w|\,\mbox{,}\\ n\alpha &= \theta + k\cdot 2\pi\,\mbox{.}\end{align*}</math>}} | {{Fristående formel||<math>\biggl\{\begin{align*} r^{\,n} &= |w|\,\mbox{,}\\ n\alpha &= \theta + k\cdot 2\pi\,\mbox{.}\end{align*}</math>}} | ||
| Zeile 124: | Zeile 124: | ||
This gives ''one'' value of <math>r</math>, but infinitely many values of <math>\alpha</math>. Despite this, there are not infinitely many solutions. From <math>k = 0</math> to <math>k = n - 1</math> one gets different arguments for <math>z</math> and thus different positions for <math>z</math> in the complex plane. For the other values of <math>k</math> due to the periodicity of the sine and cosine, one returns to these positions and therefore no new solutions are obtained. This reasoning shows that the equation <math>z^n=w</math> has exactly <math>n</math> roots. | This gives ''one'' value of <math>r</math>, but infinitely many values of <math>\alpha</math>. Despite this, there are not infinitely many solutions. From <math>k = 0</math> to <math>k = n - 1</math> one gets different arguments for <math>z</math> and thus different positions for <math>z</math> in the complex plane. For the other values of <math>k</math> due to the periodicity of the sine and cosine, one returns to these positions and therefore no new solutions are obtained. This reasoning shows that the equation <math>z^n=w</math> has exactly <math>n</math> roots. | ||
| - | ''Comment''. Note that the | + | ''Comment''. Note that the arguments of the roots differ from each other by <math>2\pi/n</math> so that the roots are evenly distributed on a circle with radius <math>\sqrt[\scriptstyle n]{|w|}</math> and form corners in a regular ''n-gon'' (an ''n'' sided polygon). |
| Zeile 147: | Zeile 147: | ||
{| width="100%" | {| width="100%" | ||
| width="95%"| | | width="95%"| | ||
| - | The solutions to the equation | + | The solutions to the equation are thus |
{{Fristående formel||<math>\left\{\begin{align*}\displaystyle z_1&= 2\Bigl(\cos \frac{\pi}{8} + i\,\sin\frac{\pi}{8}\,\Bigr),\\[4pt] | {{Fristående formel||<math>\left\{\begin{align*}\displaystyle z_1&= 2\Bigl(\cos \frac{\pi}{8} + i\,\sin\frac{\pi}{8}\,\Bigr),\\[4pt] | ||
\displaystyle z_2 &= 2\Bigl(\cos\frac{5\pi}{8} + i\,\sin\frac{5\pi}{8}\,\Bigr),\vphantom{\biggl(}\\[4pt] | \displaystyle z_2 &= 2\Bigl(\cos\frac{5\pi}{8} + i\,\sin\frac{5\pi}{8}\,\Bigr),\vphantom{\biggl(}\\[4pt] | ||
| Zeile 168: | Zeile 168: | ||
{{Fristående formel||<math>\begin{align*} f^{\,\prime}(\alpha) &= -r\sin \alpha + r\,i\,\cos \alpha = r\,i^2 \sin \alpha + r\,i\,\cos \alpha = i\,r\,(\cos \alpha + i\,\sin \alpha) = i\,f(\alpha)\\ f^{\,\prime\prime} (\alpha) &= - r\,\cos \alpha - r\,i\,\sin \alpha = i^2\,r\,(\cos \alpha + i\,\sin \alpha) = i^2\, f(\alpha)\cr &\text{etc.}\end{align*}</math>}} | {{Fristående formel||<math>\begin{align*} f^{\,\prime}(\alpha) &= -r\sin \alpha + r\,i\,\cos \alpha = r\,i^2 \sin \alpha + r\,i\,\cos \alpha = i\,r\,(\cos \alpha + i\,\sin \alpha) = i\,f(\alpha)\\ f^{\,\prime\prime} (\alpha) &= - r\,\cos \alpha - r\,i\,\sin \alpha = i^2\,r\,(\cos \alpha + i\,\sin \alpha) = i^2\, f(\alpha)\cr &\text{etc.}\end{align*}</math>}} | ||
| - | The only real functions which behave like this | + | The only real-valued functions which behave like this are <math>f(x)= e^{\,kx}</math>, which justifies the definition |
{{Fristående formel||<math>e^{\,i\alpha} = \cos \alpha + i\,\sin \alpha\,\mbox{.}</math>}} | {{Fristående formel||<math>e^{\,i\alpha} = \cos \alpha + i\,\sin \alpha\,\mbox{.}</math>}} | ||
| Zeile 196: | Zeile 196: | ||
{{Fristående formel||<math>\bigl(e^{\,i\alpha}\bigr)^n = (\cos \alpha + i \sin \alpha)^n = \cos n\alpha + i \sin n \alpha = e^{\,in\alpha}\,\mbox{,}</math>}} | {{Fristående formel||<math>\bigl(e^{\,i\alpha}\bigr)^n = (\cos \alpha + i \sin \alpha)^n = \cos n\alpha + i \sin n \alpha = e^{\,in\alpha}\,\mbox{,}</math>}} | ||
| - | which demonstrates that | + | which demonstrates that de Moivre's formula is actually identical to the well-known law of exponents, |
{{Fristående formel||<math>\left(a^x\right)^y = a^{x\,y}\,\mbox{.}</math>}} | {{Fristående formel||<math>\left(a^x\right)^y = a^{x\,y}\,\mbox{.}</math>}} | ||
| Zeile 292: | Zeile 292: | ||
<div class="exempel"> | <div class="exempel"> | ||
''' Example 10''' | ''' Example 10''' | ||
| - | |||
<ol type="a"> | <ol type="a"> | ||
<li> Solve the equation <math>\ x^2-6x+7=2\,</math>. | <li> Solve the equation <math>\ x^2-6x+7=2\,</math>. | ||
| - | + | <br> | |
| - | + | <br> | |
The coefficient in front of <math>x</math> is <math>-6</math> and it shows that we must have the number <math>(-3)^2=9</math> as the constant term on the left-hand side to make a complete square. By adding <math>2</math> to both sides we achieve this: | The coefficient in front of <math>x</math> is <math>-6</math> and it shows that we must have the number <math>(-3)^2=9</math> as the constant term on the left-hand side to make a complete square. By adding <math>2</math> to both sides we achieve this: | ||
| Zeile 306: | Zeile 305: | ||
<li> Solve the equation <math>\ z^2+21=4-8z\,</math>. | <li> Solve the equation <math>\ z^2+21=4-8z\,</math>. | ||
| - | + | <br> | |
| - | + | <br> | |
The equation can be written as <math>z^2+8z+17=0</math>. By subtracting 1 on both sides, we get a complete square on the left-hand side: | The equation can be written as <math>z^2+8z+17=0</math>. By subtracting 1 on both sides, we get a complete square on the left-hand side: | ||
| Zeile 318: | Zeile 317: | ||
</div> | </div> | ||
| - | Generally, completing the square may be regarded as arranging that "the square of half the coefficient of the ''x-term''" is the constant term in the quadratic expression. This term | + | Generally, completing the square may be regarded as arranging that "the square of half the coefficient of the ''x-term''" is the constant term in the quadratic expression. This term can always be added to the two sides without worrying about the other terms and then manipulating the equation. If the coefficients of the expression are complex numbers, one still can go about it in the same way. |
| Zeile 373: | Zeile 372: | ||
</div> | </div> | ||
| - | If one wants to bring about a square in | + | If one wants to bring about a square in an expression one can use the same technique. In order not to change the value of the expression one both adds and subtracts the missing constant term, such as in the following, |
{{Fristående formel||<math>\begin{align*} x^2+10x+3 &= x^2+10x+25+3-25\\ &= (x+5)^2-22\,\mbox{.}\end{align*}</math>}} | {{Fristående formel||<math>\begin{align*} x^2+10x+3 &= x^2+10x+25+3-25\\ &= (x+5)^2-22\,\mbox{.}\end{align*}</math>}} | ||
| Zeile 413: | Zeile 412: | ||
| - | + | Calculate <math>\ \sqrt{-3-4i}\,</math>. | |
| Zeile 448: | Zeile 447: | ||
<ol type="a"> | <ol type="a"> | ||
<li> Solve the equation <math>\ z^2-2z+10=0\,</math>. | <li> Solve the equation <math>\ z^2-2z+10=0\,</math>. | ||
| - | + | <br> | |
| - | + | <br> | |
The formula for solutions to a quadratic equations (see example 3) gives that | The formula for solutions to a quadratic equations (see example 3) gives that | ||
| Zeile 456: | Zeile 455: | ||
<li> Solve the equation <math>\ z^2 + (4-2i)z -4i=0\,\mbox{.}</math> | <li> Solve the equation <math>\ z^2 + (4-2i)z -4i=0\,\mbox{.}</math> | ||
| - | + | <br> | |
| - | + | <br> | |
| - | Here, once again , the ''pq''-formula may be used giving the solutions directly | + | Here, once again , the ''pq''-formula may be used giving the solutions directly |
{{Fristående formel||<math>\begin{align*} z &= -2+i\pm\sqrt{\smash{(-2+i)^2+4i}\vphantom{i^2}} = -2+i\pm\sqrt{4-4i+i^{\,2}+4i}\\ &=-2+i\pm\sqrt{3} = -2\pm\sqrt{3}+i\,\mbox{.}\end{align*}</math>}} | {{Fristående formel||<math>\begin{align*} z &= -2+i\pm\sqrt{\smash{(-2+i)^2+4i}\vphantom{i^2}} = -2+i\pm\sqrt{4-4i+i^{\,2}+4i}\\ &=-2+i\pm\sqrt{3} = -2\pm\sqrt{3}+i\,\mbox{.}\end{align*}</math>}} | ||
</li> | </li> | ||
<li> Solve the equation <math>\ iz^2+(2+6i)z+2+11i=0\,\mbox{.}</math> | <li> Solve the equation <math>\ iz^2+(2+6i)z+2+11i=0\,\mbox{.}</math> | ||
| - | + | <br> | |
| - | + | <br> | |
Division of both sides with <math>i</math> gives | Division of both sides with <math>i</math> gives | ||
Version vom 13:24, 5. Sep. 2008
|
Contents:
- De Moivre's formula
- Binomial equations
- Exponential function
- Euler's formula
- Completing the square
- Quadratic equations
Learning outcomes:
After this section, you will have learned how to:
- Calculate the powers of complex numbers with de Moivre's formula.
- Calculate the roots of certain complex numbers by rewriting to polar form.
- Solve binomial equations.
- Complete the square for complex quadratic expressions.
- Solve complex quadratic equations.
De Moivre's formula
The computational rules \displaystyle \ \arg (zw) = \arg z + \arg w\ and \displaystyle \ |\,zw\,| = |\,z\,|\cdot|\,w\,|\ mean that
- REDIRECT Template:Abgesetzte Formel
For an arbitrary number \displaystyle z=r\,(\cos \alpha +i\,\sin \alpha), we therefore have the following relationship
- REDIRECT Template:Abgesetzte Formel
If \displaystyle |\,z\,|=1, (i.e. \displaystyle z lies on the unit circle) then one has the special relationship
- REDIRECT Template:Abgesetzte Formel
which is usually referred to as de Moivres formula. This relationship is very useful when it comes to deriving trigonometric identities and calculating the roots and powers of complex numbers.
Example 1
If \displaystyle z = \frac{1+i}{\sqrt2}, determine \displaystyle z^3 and \displaystyle z^{100}.
We write \displaystyle z in polar form \displaystyle \ \ z= \frac{1}{\sqrt2} + \frac{i}{\sqrt2} = 1\cdot \Bigl(\cos \frac{\pi}{4} + i\sin \frac{\pi}{4}\Bigr)\ \ and Moivre's formula gives
- REDIRECT Template:Abgesetzte Formel
Example 2
In the usual way one does an expansion by means of the squaring rules
- REDIRECT Template:Abgesetzte Formel
and according to de Moivre's formula one gets
- REDIRECT Template:Abgesetzte Formel
If one equates the real and imaginary parts of the two expressions one gets the well-known trigonometric formulas
- REDIRECT Template:Abgesetzte Formel
Example 3
Simplify \displaystyle \ \ \frac{(\sqrt3 + i)^{14}}{(1+i\sqrt3\,)^7(1+i)^{10}}\,.
We write the numbers \displaystyle \sqrt{3}+i, \displaystyle 1+i\sqrt{3} and \displaystyle 1+i in polar form
- \displaystyle \quad\sqrt{3} + i = 2\Bigl(\cos\frac{\pi}{6} + i\,\sin\frac{\pi}{6}\,\Bigr)\vphantom{\biggl(},
- \displaystyle \quad 1+i\sqrt{3} = 2\Bigl(\cos\frac{\pi}{3} + i\,\sin\frac{\pi}{3}\,\Bigr)\vphantom{\biggl(},
- \displaystyle \quad 1+i = \sqrt2\,\Bigl(\cos\frac{\pi}{4} + i\,\sin\frac{\pi}{4}\,\Bigr)\vphantom{\biggl(}.
Then we get with de Moivre's formula
- REDIRECT Template:Abgesetzte Formel
and this expression can be simplified by performing multiplication and division in polar form
- REDIRECT Template:Abgesetzte Formel
Binomial equations
A complex number \displaystyle z is called the nth root of the complex number \displaystyle w if
- REDIRECT Template:Abgesetzte Formel
The above relationship can also be seen as an equation in which \displaystyle z is unknown. This type of equation is called a binomial equation. The solutions are obtained by rewriting both sides in polar form and comparing both the moduli and the arguments.
For a given number \displaystyle w=|\,w\,|\,(\cos \theta + i\,\sin \theta) one assumes that \displaystyle z=r\,(\cos \alpha + i\, \sin \alpha) and after insertion, the binomial equation becomes
- REDIRECT Template:Abgesetzte Formel
where de Moivres formula has been used on the left-hand side. Equating moduli and arguments gives
- REDIRECT Template:Abgesetzte Formel
Note that we add multiples of \displaystyle 2\pi to include all possible values of the argument that have the same direction as \displaystyle \theta. One gets
- REDIRECT Template:Abgesetzte Formel
This gives one value of \displaystyle r, but infinitely many values of \displaystyle \alpha. Despite this, there are not infinitely many solutions. From \displaystyle k = 0 to \displaystyle k = n - 1 one gets different arguments for \displaystyle z and thus different positions for \displaystyle z in the complex plane. For the other values of \displaystyle k due to the periodicity of the sine and cosine, one returns to these positions and therefore no new solutions are obtained. This reasoning shows that the equation \displaystyle z^n=w has exactly \displaystyle n roots.
Comment. Note that the arguments of the roots differ from each other by \displaystyle 2\pi/n so that the roots are evenly distributed on a circle with radius \displaystyle \sqrt[\scriptstyle n]{|w|} and form corners in a regular n-gon (an n sided polygon).
Exempel 4
Solve the binomial equation \displaystyle \ z^4= 16\,i\,.
Write \displaystyle z and \displaystyle 16\,i in polar form
- \displaystyle \quad z=r\,(\cos \alpha + i\,\sin \alpha)\,,
- \displaystyle \quad 16\,i= 16\Bigl(\cos\frac{\pi}{2} + i\,\sin\frac{\pi}{2}\,\Bigr)\vphantom{\biggl(}.
This turns the equation \displaystyle \ z^4=16\,i\ into
- REDIRECT Template:Abgesetzte Formel
Matching the moduli and arguments on both sides gives
- REDIRECT Template:Abgesetzte Formel
|
The solutions to the equation are thus
| 3.3 - Figur - Komplexa talen z₁, z₂, z₃ och z₄ |
Exponential form of complex numbers
If we manipulate \displaystyle i as if it were a real number and treat a complex number \displaystyle z as a function of just \displaystyle \alpha ( where \displaystyle r is a constant),
- REDIRECT Template:Abgesetzte Formel
we get after differentiation
- REDIRECT Template:Abgesetzte Formel
The only real-valued functions which behave like this are \displaystyle f(x)= e^{\,kx}, which justifies the definition
- REDIRECT Template:Abgesetzte Formel
This definition turns out to be a completely natural generalisation of the exponential function for the real numbers. Putting \displaystyle z=a+ib one gets
- REDIRECT Template:Abgesetzte Formel
The definition of \displaystyle e^{\,z} may be regarded as a convenient notation for the polar form of a complex number, as \displaystyle z=r\,(\cos \alpha + i\,\sin \alpha) = r\,e^{\,i\alpha}\,.
Example 5
For a real number \displaystyle z the definition is consistent with the case when the exponent is real, as \displaystyle z=a+0\cdot i which gives
- REDIRECT Template:Abgesetzte Formel
Example 6
A further indication of why the above definition is so natural is given by the relationship
- REDIRECT Template:Abgesetzte Formel
which demonstrates that de Moivre's formula is actually identical to the well-known law of exponents,
- REDIRECT Template:Abgesetzte Formel
Example 7
From the above definition, one can obtain the relationship
- REDIRECT Template:Abgesetzte Formel
which connects together the, generally regarded, most basic numbers in mathematics: \displaystyle e, \displaystyle \pi, \displaystyle i and 1. This relationship is seen by many as the most beautiful in mathematics and was discovered by Euler in the early 1700's.
Example 8
Solve the equation \displaystyle \ (z+i)^3 = -8i.
Put \displaystyle w = z + i. We then get the binomial equation \displaystyle \ w^3=-8i\,. To begin with, we rewrite \displaystyle w and \displaystyle -8i in polar form
- \displaystyle \quad w=r\,(\cos \alpha + i\,\sin \alpha) = r\,e^{i\alpha}\,\mbox{,}
- \displaystyle \quad -8i = 8\Bigl(\cos \frac{3\pi}{2} + i\,\sin\frac{3\pi}{2}\,\Bigr) = 8\,e^{3\pi i/2}\vphantom{\biggl(}\,\mbox{.}
The equation in polar form is \displaystyle \ r^3e^{3\alpha i}=8\,e^{3\pi i/2}\ and matching the moduli and arguments on both sides gives,
- REDIRECT Template:Abgesetzte Formel
The roots of the equation are thus
- \displaystyle \quad w_1 = 2\,e^{\pi i/2} = 2\Bigl(\cos \frac{\pi}{2} + i\,\sin\frac{\pi}{2}\,\Bigr) = 2i\,\mbox{,}\quad\vphantom{\biggl(}
- \displaystyle \quad w_2 = 2\,e^{7\pi i/6} = 2\Bigl(\cos\frac{7\pi}{6} + i\,\sin\frac{7\pi}{6}\,\Bigr) = -\sqrt{3}-i\,\mbox{,}\quad\vphantom{\Biggl(}
- \displaystyle \quad w_3 = 2\,e^{11\pi i/6} = 2\Bigl(\cos\frac{11\pi}{6} + i\,\sin\frac{11\pi}{6}\,\Bigr) = \sqrt{3}-i\,\mbox{,}\quad\vphantom{\biggl(}
i.e. \displaystyle z_1 = 2i-i=i, \displaystyle z_2 = - \sqrt{3}-2i and \displaystyle z_3 = \sqrt{3}-2i.
Example 9
Solve \displaystyle \ z^2 = \overline{z}\,.
If for \displaystyle z=a+ib one has \displaystyle |\,z\,|=r and \displaystyle \arg z = \alpha then for \displaystyle \overline{z}= a-ib one gets \displaystyle |\,\overline{z}\,|=r and \displaystyle \arg \overline{z} = - \alpha.This means that \displaystyle z=r\,e^{i\alpha} and \displaystyle \overline{z} = r\,e^{-i\alpha}. The equation can be written
- REDIRECT Template:Abgesetzte Formel
which directly gives that \displaystyle r=0 is a solution, i.e. \displaystyle z=0. If we assume that \displaystyle r\not=0 then the equation can be written as \displaystyle \ r\,e^{3i\alpha} = 1\,, which gives after matching moduli and arguments
- REDIRECT Template:Abgesetzte Formel
The solutions are
- \displaystyle \quad z_1 = e^0 = 1\,\mbox{,}
- \displaystyle \quad z_2 = e^{2\pi i/ 3} = \cos\frac{2\pi}{3} + i\,\sin\frac{2\pi}{3} = -\frac{1}{2} + \frac{\sqrt3}{2}\,i\,\mbox{,}\vphantom{\Biggl(}
- \displaystyle \quad z_3 = e^{4\pi i/ 3} = \cos\frac{4\pi}{3} + i\,\sin\frac{4\pi}{3} = -\frac{1}{2} - \frac{\sqrt3}{2}\,i\,\mbox{,}
- \displaystyle \quad z_4 = 0\,\mbox{.}
Completing the square
The squaring rules,
- REDIRECT Template:Abgesetzte Formel
which are usually used to expand parenthesis can also be used in reverse to obtain quadratic expressions. For example,
- REDIRECT Template:Abgesetzte Formel
This can be used to solve quadratic equations, for example,
- REDIRECT Template:Abgesetzte Formel
Taking roots then gives that \displaystyle x+2=\pm\sqrt{9} and thus that \displaystyle x=-2\pm 3, i.e. \displaystyle x=1 or \displaystyle x=-5.
Sometimes it is necessary to add or subtract an appropriate number to obtain a suitable expression. The above equation, for example, could just as easily been presented to us as
- REDIRECT Template:Abgesetzte Formel
By adding 9 to both sides, we get a suitable expression on the left side:
- REDIRECT Template:Abgesetzte Formel
This method is called completing the square.
Example 10
- Solve the equation \displaystyle \ x^2-6x+7=2\,.
The coefficient in front of \displaystyle x is \displaystyle -6 and it shows that we must have the number \displaystyle (-3)^2=9 as the constant term on the left-hand side to make a complete square. By adding \displaystyle 2 to both sides we achieve this:- REDIRECT Template:Abgesetzte Formel
- Solve the equation \displaystyle \ z^2+21=4-8z\,.
The equation can be written as \displaystyle z^2+8z+17=0. By subtracting 1 on both sides, we get a complete square on the left-hand side:- REDIRECT Template:Abgesetzte Formel
Generally, completing the square may be regarded as arranging that "the square of half the coefficient of the x-term" is the constant term in the quadratic expression. This term can always be added to the two sides without worrying about the other terms and then manipulating the equation. If the coefficients of the expression are complex numbers, one still can go about it in the same way.
Example 11
Solve the equation \displaystyle \ x^2-\frac{8}{3}x+1=2\,.
Half the coefficient of \displaystyle x is \displaystyle -\tfrac{4}{3}. We thus add \displaystyle \bigl(-\tfrac{4}{3}\bigr)^2=\tfrac{16}{9} to both sides
- REDIRECT Template:Abgesetzte Formel
Now it's easy to get to \displaystyle x-\tfrac{4}{3}=\pm\tfrac{5}{3} and thus to get that \displaystyle x=\tfrac{4}{3}\pm\tfrac{5}{3}, i.e. \displaystyle x=-\tfrac{1}{3} or \displaystyle x=3.
Example 12
Solve the equation \displaystyle \ x^2+px+q=0\,.
Completing the square gives
- REDIRECT Template:Abgesetzte Formel
This gives the usual formula, pq-formula, for solutions to quadratic equations
- REDIRECT Template:Abgesetzte Formel
Example 13
Solve the equation \displaystyle \ z^2-(12+4i)z-4+24i=0\,.
Half the coefficient of \displaystyle z is \displaystyle -(6+2i) so we add the square of this expression to both sides
- REDIRECT Template:Abgesetzte Formel
Expanding the square on the right-hand side \displaystyle \ (-(6+2i))^2=36+24i+4i^2=32+24i\ and completing the square on the left-hand side gives
- REDIRECT Template:Abgesetzte Formel
After a taking roots, we have that \displaystyle \ z-(6+2i)=\pm 6\ and therefore the solutions are \displaystyle z=12+2i and \displaystyle z=2i.
If one wants to bring about a square in an expression one can use the same technique. In order not to change the value of the expression one both adds and subtracts the missing constant term, such as in the following,
- REDIRECT Template:Abgesetzte Formel
Example 14
Complete the square in the expression \displaystyle \ z^2+(2-4i)z+1-3i\,.
Add and subtract the term \displaystyle \bigl(\frac{1}{2}(2-4i)\bigr)^2=(1-2i)^2=-3-4i\,,
- REDIRECT Template:Abgesetzte Formel
Solving using a formula
To solve quadratic equations sometimes the simplest method is to use the usual formula for quadratic equations. However, this may lead to that one ends up with terms of the type \displaystyle \sqrt{a+ib}. One can then assume
- REDIRECT Template:Abgesetzte Formel
By squaring both sides we get
- REDIRECT Template:Abgesetzte Formel
Matching the real and imaginary parts gives
- REDIRECT Template:Abgesetzte Formel
These equations can be solved by substitution, for example, \displaystyle y= b/(2x) can be inserted in the first equation.
Example 15
Calculate \displaystyle \ \sqrt{-3-4i}\,.
Put \displaystyle \ x+iy=\sqrt{-3-4i}\ where \displaystyle x and \displaystyle y are real numbers. Squaring both sides gives
- REDIRECT Template:Abgesetzte Formel
which leads to the system of equations
- REDIRECT Template:Abgesetzte Formel
From the second equation, we can solve for \displaystyle \ y=-4/(2x) = -2/x\ and put it into the first equation to get
- REDIRECT Template:Abgesetzte Formel
This is a quadratic equation in \displaystyle x^2 which can be seen more easily by putting \displaystyle t=x^2,
- REDIRECT Template:Abgesetzte Formel
The solutions are \displaystyle t = 1 and \displaystyle t = -4. The latter solution must be rejected, as \displaystyle x and \displaystyle y have been assumed to be real numbers, and thus \displaystyle x^2=-4 cannot be true. We get \displaystyle x=\pm\sqrt{1}, which gives us two possible solutions
- \displaystyle \ x=-1\ which gives \displaystyle \ y=-2/(-1)=2\,,
- \displaystyle \ x=1\ which gives \displaystyle \ y=-2/1=-2\,.
So we can conclude that
- REDIRECT Template:Abgesetzte Formel
Example 16
- Solve the equation \displaystyle \ z^2-2z+10=0\,.
The formula for solutions to a quadratic equations (see example 3) gives that- REDIRECT Template:Abgesetzte Formel
- Solve the equation \displaystyle \ z^2 + (4-2i)z -4i=0\,\mbox{.}
Here, once again , the pq-formula may be used giving the solutions directly- REDIRECT Template:Abgesetzte Formel
- Solve the equation \displaystyle \ iz^2+(2+6i)z+2+11i=0\,\mbox{.}
Division of both sides with \displaystyle i gives- REDIRECT Template:Abgesetzte Formel
- REDIRECT Template:Abgesetzte Formel
- REDIRECT Template:Abgesetzte Formel
