3.4 Übungen

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===Exercise 3.4:1===
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===Übung 3.4:1===
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Carry out the following divisions (not all are exact, i.e. have no remainder)
Carry out the following divisions (not all are exact, i.e. have no remainder)
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</div>{{#NAVCONTENT:Answer|Answer 3.4:1|Solution a|Solution 3.4:1a|Solution b|Solution 3.4:1b|Solution c|Solution 3.4:1c|Solution d|Solution 3.4:1d|Solution e|Solution 3.4:1e}}
</div>{{#NAVCONTENT:Answer|Answer 3.4:1|Solution a|Solution 3.4:1a|Solution b|Solution 3.4:1b|Solution c|Solution 3.4:1c|Solution d|Solution 3.4:1d|Solution e|Solution 3.4:1e}}
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===Exercise 3.4:2===
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===Übung 3.4:2===
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The equation <math>\,z^3-3z^2+4z-2=0\,</math> has the root <math>\,z=1\,</math>. Determine the other roots.
The equation <math>\,z^3-3z^2+4z-2=0\,</math> has the root <math>\,z=1\,</math>. Determine the other roots.
</div>{{#NAVCONTENT:Answer|Answer 3.4:2|Solution|Solution 3.4:2}}
</div>{{#NAVCONTENT:Answer|Answer 3.4:2|Solution|Solution 3.4:2}}
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===Exercise 3.4:3===
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===Übung 3.4:3===
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The equation <math>\,z^4+2z^3+6z^2 +8z +8 =0\,</math> has the roots <math>\,z=2i\,</math> and <math>\,z=-1-i\,</math>. Solve the equation.
The equation <math>\,z^4+2z^3+6z^2 +8z +8 =0\,</math> has the roots <math>\,z=2i\,</math> and <math>\,z=-1-i\,</math>. Solve the equation.
</div>{{#NAVCONTENT:Answer|Answer 3.4:3|Solution|Solution 3.4:3}}
</div>{{#NAVCONTENT:Answer|Answer 3.4:3|Solution|Solution 3.4:3}}
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===Exercise 3.4:4===
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===Übung 3.4:4===
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Determine two real numbers <math>\,a\,</math> and <math>\,b\,</math>, such that the equation <math>\ z^3+az+b=0\ </math> has the root <math>\,z=1-2i\,</math>. Then solve the equation.
Determine two real numbers <math>\,a\,</math> and <math>\,b\,</math>, such that the equation <math>\ z^3+az+b=0\ </math> has the root <math>\,z=1-2i\,</math>. Then solve the equation.
</div>{{#NAVCONTENT:Answer|Answer 3.4:4|Solution|Solution 3.4:4}}
</div>{{#NAVCONTENT:Answer|Answer 3.4:4|Solution|Solution 3.4:4}}
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===Exercise 3.4:5===
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===Übung 3.4:5===
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Determine <math>\,a\,</math> and <math>\,b\,</math> so that the equation <math>\ z^4-6z^2+az+b=0\ </math> has a triple root. Then solve the equation.
Determine <math>\,a\,</math> and <math>\,b\,</math> so that the equation <math>\ z^4-6z^2+az+b=0\ </math> has a triple root. Then solve the equation.
</div>{{#NAVCONTENT:Answer|Answer 3.4:5|Solution|Solution 3.4:5}}
</div>{{#NAVCONTENT:Answer|Answer 3.4:5|Solution|Solution 3.4:5}}
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===Exercise 3.4:6===
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===Übung 3.4:6===
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The equation <math>\ z^4+3z^3+z^2+18z-30=0\ </math> has a pure imaginary root. Determine all the roots.
The equation <math>\ z^4+3z^3+z^2+18z-30=0\ </math> has a pure imaginary root. Determine all the roots.
</div>{{#NAVCONTENT:Answer|Answer 3.4:6|Solution|Solution 3.4:6}}
</div>{{#NAVCONTENT:Answer|Answer 3.4:6|Solution|Solution 3.4:6}}
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===Exercise 3.4:7===
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===Übung 3.4:7===
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Determine the polynomial which has the following zeros
Determine the polynomial which has the following zeros

Version vom 13:24, 10. Mär. 2009

       Theory          Übungen      

Übung 3.4:1

Carry out the following divisions (not all are exact, i.e. have no remainder)

a) \displaystyle \displaystyle\frac{x^2-1}{x-1} b) \displaystyle \displaystyle\frac{x^2}{x+1} c) \displaystyle \displaystyle \frac{x^3+a^3}{x+a}
d) \displaystyle \displaystyle\frac{x^3 +x+2}{x+1} e) \displaystyle \displaystyle \frac{x^3+2x^2+1}{x^2+3x+1}
Answer
Answer 3.4:1
Solution a
Solution 3.4:1a
Solution b
Solution 3.4:1b
Solution c
Solution 3.4:1c
Solution d
Solution 3.4:1d
Solution e
Solution 3.4:1e

Übung 3.4:2

The equation \displaystyle \,z^3-3z^2+4z-2=0\, has the root \displaystyle \,z=1\,. Determine the other roots.

Answer
Answer 3.4:2
Solution
Solution 3.4:2

Übung 3.4:3

The equation \displaystyle \,z^4+2z^3+6z^2 +8z +8 =0\, has the roots \displaystyle \,z=2i\, and \displaystyle \,z=-1-i\,. Solve the equation.

Answer
Answer 3.4:3
Solution
Solution 3.4:3

Übung 3.4:4

Determine two real numbers \displaystyle \,a\, and \displaystyle \,b\,, such that the equation \displaystyle \ z^3+az+b=0\ has the root \displaystyle \,z=1-2i\,. Then solve the equation.

Answer
Answer 3.4:4
Solution
Solution 3.4:4

Übung 3.4:5

Determine \displaystyle \,a\, and \displaystyle \,b\, so that the equation \displaystyle \ z^4-6z^2+az+b=0\ has a triple root. Then solve the equation.

Answer
Answer 3.4:5
Solution
Solution 3.4:5

Übung 3.4:6

The equation \displaystyle \ z^4+3z^3+z^2+18z-30=0\ has a pure imaginary root. Determine all the roots.

Answer
Answer 3.4:6
Solution
Solution 3.4:6

Übung 3.4:7

Determine the polynomial which has the following zeros

a) \displaystyle 1\,, \displaystyle \,2\, and \displaystyle \,4 b) \displaystyle -1+ i\, and \displaystyle \,-1-i
Answer
Answer 3.4:7
Solution a
Solution 3.4:7a
Solution b
Solution 3.4:7b
Von „http://wiki.sommarmatte.se/wikis/2009/bridgecourse2-TU-Berlin/index.php/3.4_%C3%9Cbungen