Orthogonaltrajektorien

test

Ansatz der Störfunktion zur Bestimmung der Partikulären Lösung

Triviale DGL

Triviale Differentialgleichungen

Trennung der Variablen (Separation)

Trennung der Variablen

Anfangswertproblem

Variation der Konstanten (inhomogen)

Variation der Konstanten

DGL Systeme

Regel von Sarrus (3x3 Determinante)

Höhere Ordnungen

Lineare homogene DGL höherer Ordnung (mit konstanten Koeffizienten)

Unterschied In/Homogen

Basis, Basiswechsel

Abbildungsmatrizen

Funktionen bestimmen

Geraden und Ebenen

Gruppen

lineare abbildung 

quadratische ergänzung

Baustatik 1

Anfangswertprobleme :)

Differentialgleichungen

basis 

QR-Algorithmus

QR-Zerlegung

Cholesky-Zerlegung

Bild & Urbild

Zweigstromanalyse

Transistor als Thermometer

Investment

Teilfolgen

Epsilon Delta Kriterium

prinzip der virtuellen verrückung 

Linear Kombination

Folgen, Reihen und Potenzreihen

Flächenpressung

Arbeit 

Cholesky Zerlegung

Polynomfunktionen beschreiben

Zu Maß-und Integrationstheorie: Majorisierte Konvergenz

Teilchenphysik und Festkörperphysik

Taylorreihen

Regel von de L'Hopital

Mathe

KRAFT

Grenzwert Funktion 

Folgenkriterium

ϵ-δ Kriterium 

Beweis Stetigkeit 

Wahrheitstabelle

2x2 Matrix

Matrix invertieren

Basiswechselsatz

Lineare Abbildunge 

Vorderrad fahradgabel lagerkräfte berechnen 

Spannungsregelung

Jordan Normal Form

Test

Induktion 

Jordan-Normalform

Kurvenintegral

dlg mithilfe inhomogenen linearen system lösen

Inverse einer Matrix

Gleichmäßige Stetigkeit

addition

Regel von L´Hospital

Lineare Abbildungen

dimension eines Untervektorraumes bestimmen

Stationäre Stoffübertragung

Polplan, Prinzip der virtuellen Verrückungen

komplexe Ungleichungen 

Bidualräume

Dualräume

Taylorpolynome

Kern und Basis

Diagonalisieren einer Matrix

Rekursive Folgen

Exponentialreihe

Darstellungsmatrizen

restglied

Basiswechsel

Gamma Funktion

Newton Verfahren

Randwertaufgabe

Numerische Integration: Trapez- und Simpsonregel

Funktionenfolgen

dualräume

Dualraum

Komplexe Nullstellen

Chemie

Natascha Kirchmann

Differentialquotient

Folgedefinition des Funktionslimes

Grenzwerte und Stetigkeit 

Komplexe Zahlen

Kern und Bild 

Direkte Summe 

Koordinaten 

Exponentielle Verzinsung

Lineare Verzinsung

Festverzinsliche Wertpapiere

\begin{aligned}\left\{\left(\begin{array}{c} 17 \cos (10 t) \\ 6 \cos (10 t)+10 \sin (10 t) \end{array}\right) \ , \ \left(\begin{array}{c} 17 \sin (10 t) \\ 6 \sin (10 t)-10 \cos (10 t) \end{array}\right)\right\} \end{aligned}

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17 \cos (10 t) \\
6 \cos (10 t)+10 \sin (10 t)
\end{array}\right) \ , \ \left(\begin{array}{c}
17 \sin (10 t) \\
6 \sin (10 t)-10 \cos (10 t)
\end{array}\right)\right\}
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Bestimme die Eigenwerte der Matrix:

\begin{align*}\begin{array}{r} \operatorname{det}\left(A-\lambda \cdot E_{2}\right)=\operatorname{det}\left(\begin{array}{cc} 6-\lambda &amp; -17 \\ 8 &amp; -6-\lambda \end{array}\right)=0 \\ \lambda^{2}-36+136=0 \\ \lambda^{2}+100=0 \\ (\lambda-10 i) \cdot(\lambda+10 i)=0 \end{array}\end{align*}

<mjx-container class="MathJax" jax="SVG"><svg alt="\begin{align*}\begin{array}{r}
\operatorname{det}\left(A-\lambda \cdot E_{2}\right)=\operatorname{det}\left(\begin{array}{cc}
6-\lambda & -17 \\
8 & -6-\lambda
\end{array}\right)=0 \\
\lambda^{2}-36+136=0 \\
\lambda^{2}+100=0 \\
(\lambda-10 i) \cdot(\lambda+10 i)=0
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Aus diesem Ausdruck können die Eigenwerte direkt abgelesen werden:

\begin{align*}\lambda_{1}&amp;=10 i \\
\lambda_{2}&amp;=-10 i\end{align*}

<mjx-container class="MathJax" jax="SVG"><svg alt="\begin{align*}\lambda_{1}&=10 i \\
\lambda_{2}&=-10 i\end{align*}" style="vertical-align: -2.036ex" xmlns="http://www.w3.org/2000/svg" width="10.052ex" height="5.204ex" role="img" focusable="false" viewBox="0 -1400 4443.1 2300" xmlns:xlink="http://www.w3.org/1999/xlink"><defs><path id="MJX-12228-TEX-I-1D706" d="M166 673Q166 685 183 694H202Q292 691 316 644Q322 629 373 486T474 207T524 67Q531 47 537 34T546 15T551 6T555 2T556 -2T550 -11H482Q457 3 450 18T399 152L354 277L340 262Q327 246 293 207T236 141Q211 112 174 69Q123 9 111 -1T83 -12Q47 -12 47 20Q47 37 61 52T199 187Q229 216 266 252T321 306L338 322Q338 323 288 462T234 612Q214 657 183 657Q166 657 166 673Z"></path><path id="MJX-12228-TEX-N-31" d="M213 578L200 573Q186 568 160 563T102 556H83V602H102Q149 604 189 617T245 641T273 663Q275 666 285 666Q294 666 302 660V361L303 61Q310 54 315 52T339 48T401 46H427V0H416Q395 3 257 3Q121 3 100 0H88V46H114Q136 46 152 46T177 47T193 50T201 52T207 57T213 61V578Z"></path><path id="MJX-12228-TEX-N-3D" d="M56 347Q56 360 70 367H707Q722 359 722 347Q722 336 708 328L390 327H72Q56 332 56 347ZM56 153Q56 168 72 173H708Q722 163 722 153Q722 140 707 133H70Q56 140 56 153Z"></path><path id="MJX-12228-TEX-N-30" d="M96 585Q152 666 249 666Q297 666 345 640T423 548Q460 465 460 320Q460 165 417 83Q397 41 362 16T301 -15T250 -22Q224 -22 198 -16T137 16T82 83Q39 165 39 320Q39 494 96 585ZM321 597Q291 629 250 629Q208 629 178 597Q153 571 145 525T137 333Q137 175 145 125T181 46Q209 16 250 16Q290 16 318 46Q347 76 354 130T362 333Q362 478 354 524T321 597Z"></path><path id="MJX-12228-TEX-I-1D456" d="M184 600Q184 624 203 642T247 661Q265 661 277 649T290 619Q290 596 270 577T226 557Q211 557 198 567T184 600ZM21 287Q21 295 30 318T54 369T98 420T158 442Q197 442 223 419T250 357Q250 340 236 301T196 196T154 83Q149 61 149 51Q149 26 166 26Q175 26 185 29T208 43T235 78T260 137Q263 149 265 151T282 153Q302 153 302 143Q302 135 293 112T268 61T223 11T161 -11Q129 -11 102 10T74 74Q74 91 79 106T122 220Q160 321 166 341T173 380Q173 404 156 404H154Q124 404 99 371T61 287Q60 286 59 284T58 281T56 279T53 278T49 278T41 278H27Q21 284 21 287Z"></path><path id="MJX-12228-TEX-N-32" d="M109 429Q82 429 66 447T50 491Q50 562 103 614T235 666Q326 666 387 610T449 465Q449 422 429 383T381 315T301 241Q265 210 201 149L142 93L218 92Q375 92 385 97Q392 99 409 186V189H449V186Q448 183 436 95T421 3V0H50V19V31Q50 38 56 46T86 81Q115 113 136 137Q145 147 170 174T204 211T233 244T261 278T284 308T305 340T320 369T333 401T340 431T343 464Q343 527 309 573T212 619Q179 619 154 602T119 569T109 550Q109 549 114 549Q132 549 151 535T170 489Q170 464 154 447T109 429Z"></path><path id="MJX-12228-TEX-N-2212" d="M84 237T84 250T98 270H679Q694 262 694 250T679 230H98Q84 237 84 250Z"></path></defs><g stroke="currentColor" fill="currentColor" stroke-width="0" transform="matrix(1 0 0 -1 0 0)"><g data-mml-node="math"><g data-mml-node="mtable"><g data-mml-node="mtr" transform="translate(0, 650)"><g data-mml-node="mtd"><g data-mml-node="msub"><g data-mml-node="mi"><use xlink:href="#MJX-12228-TEX-I-1D706"></use></g><g data-mml-node="TeXAtom" transform="translate(583, -150) scale(0.707)" data-mjx-texclass="ORD"><g data-mml-node="mn"><use xlink:href="#MJX-12228-TEX-N-31"></use></g></g></g></g><g data-mml-node="mtd" transform="translate(986.6, 0)"><g data-mml-node="mi"></g><g data-mml-node="mo" transform="translate(277.8, 0)"><use xlink:href="#MJX-12228-TEX-N-3D"></use></g><g data-mml-node="mn" transform="translate(1333.6, 0)"><use xlink:href="#MJX-12228-TEX-N-31"></use><use xlink:href="#MJX-12228-TEX-N-30" transform="translate(500, 0)"></use></g><g data-mml-node="mi" transform="translate(2333.6, 0)"><use xlink:href="#MJX-12228-TEX-I-1D456"></use></g></g></g><g data-mml-node="mtr" transform="translate(0, -650)"><g data-mml-node="mtd"><g data-mml-node="msub"><g data-mml-node="mi"><use xlink:href="#MJX-12228-TEX-I-1D706"></use></g><g data-mml-node="TeXAtom" transform="translate(583, -150) scale(0.707)" data-mjx-texclass="ORD"><g data-mml-node="mn"><use xlink:href="#MJX-12228-TEX-N-32"></use></g></g></g></g><g data-mml-node="mtd" transform="translate(986.6, 0)"><g data-mml-node="mi"></g><g data-mml-node="mo" transform="translate(277.8, 0)"><use xlink:href="#MJX-12228-TEX-N-3D"></use></g><g data-mml-node="mo" transform="translate(1333.6, 0)"><use xlink:href="#MJX-12228-TEX-N-2212"></use></g><g data-mml-node="mn" transform="translate(2111.6, 0)"><use xlink:href="#MJX-12228-TEX-N-31"></use><use xlink:href="#MJX-12228-TEX-N-30" transform="translate(500, 0)"></use></g><g data-mml-node="mi" transform="translate(3111.6, 0)"><use xlink:href="#MJX-12228-TEX-I-1D456"></use></g></g></g></g></g></g></svg></mjx-container>

Bestimme zu jedem Eigenwert $\lambda_{i}$ den Eigenvektor $v_{i}$

Bestimme zu jedem Eigenwert <mjx-container class="MathJax" jax="SVG"><svg alt="\lambda_{i}" style="vertical-align: -0.357ex" xmlns="http://www.w3.org/2000/svg" width="1.984ex" height="1.927ex" role="img" focusable="false" viewBox="0 -694 877 851.8" xmlns:xlink="http://www.w3.org/1999/xlink"><defs><path id="MJX-12229-TEX-I-1D706" d="M166 673Q166 685 183 694H202Q292 691 316 644Q322 629 373 486T474 207T524 67Q531 47 537 34T546 15T551 6T555 2T556 -2T550 -11H482Q457 3 450 18T399 152L354 277L340 262Q327 246 293 207T236 141Q211 112 174 69Q123 9 111 -1T83 -12Q47 -12 47 20Q47 37 61 52T199 187Q229 216 266 252T321 306L338 322Q338 323 288 462T234 612Q214 657 183 657Q166 657 166 673Z"></path><path id="MJX-12229-TEX-I-1D456" d="M184 600Q184 624 203 642T247 661Q265 661 277 649T290 619Q290 596 270 577T226 557Q211 557 198 567T184 600ZM21 287Q21 295 30 318T54 369T98 420T158 442Q197 442 223 419T250 357Q250 340 236 301T196 196T154 83Q149 61 149 51Q149 26 166 26Q175 26 185 29T208 43T235 78T260 137Q263 149 265 151T282 153Q302 153 302 143Q302 135 293 112T268 61T223 11T161 -11Q129 -11 102 10T74 74Q74 91 79 106T122 220Q160 321 166 341T173 380Q173 404 156 404H154Q124 404 99 371T61 287Q60 286 59 284T58 281T56 279T53 278T49 278T41 278H27Q21 284 21 287Z"></path></defs><g stroke="currentColor" fill="currentColor" stroke-width="0" transform="matrix(1 0 0 -1 0 0)"><g data-mml-node="math"><g data-mml-node="msub"><g data-mml-node="mi"><use xlink:href="#MJX-12229-TEX-I-1D706"></use></g><g data-mml-node="TeXAtom" transform="translate(583, -150) scale(0.707)" data-mjx-texclass="ORD"><g data-mml-node="mi"><use xlink:href="#MJX-12229-TEX-I-1D456"></use></g></g></g></g></g></svg></mjx-container> den Eigenvektor <mjx-container class="MathJax" jax="SVG"><svg alt="v_{i}" style="vertical-align: -0.357ex" xmlns="http://www.w3.org/2000/svg" width="1.762ex" height="1.359ex" role="img" focusable="false" viewBox="0 -443 779 600.8" xmlns:xlink="http://www.w3.org/1999/xlink"><defs><path id="MJX-12230-TEX-I-1D463" d="M173 380Q173 405 154 405Q130 405 104 376T61 287Q60 286 59 284T58 281T56 279T53 278T49 278T41 278H27Q21 284 21 287Q21 294 29 316T53 368T97 419T160 441Q202 441 225 417T249 361Q249 344 246 335Q246 329 231 291T200 202T182 113Q182 86 187 69Q200 26 250 26Q287 26 319 60T369 139T398 222T409 277Q409 300 401 317T383 343T365 361T357 383Q357 405 376 424T417 443Q436 443 451 425T467 367Q467 340 455 284T418 159T347 40T241 -11Q177 -11 139 22Q102 54 102 117Q102 148 110 181T151 298Q173 362 173 380Z"></path><path id="MJX-12230-TEX-I-1D456" d="M184 600Q184 624 203 642T247 661Q265 661 277 649T290 619Q290 596 270 577T226 557Q211 557 198 567T184 600ZM21 287Q21 295 30 318T54 369T98 420T158 442Q197 442 223 419T250 357Q250 340 236 301T196 196T154 83Q149 61 149 51Q149 26 166 26Q175 26 185 29T208 43T235 78T260 137Q263 149 265 151T282 153Q302 153 302 143Q302 135 293 112T268 61T223 11T161 -11Q129 -11 102 10T74 74Q74 91 79 106T122 220Q160 321 166 341T173 380Q173 404 156 404H154Q124 404 99 371T61 287Q60 286 59 284T58 281T56 279T53 278T49 278T41 278H27Q21 284 21 287Z"></path></defs><g stroke="currentColor" fill="currentColor" stroke-width="0" transform="matrix(1 0 0 -1 0 0)"><g data-mml-node="math"><g data-mml-node="msub"><g data-mml-node="mi"><use xlink:href="#MJX-12230-TEX-I-1D463"></use></g><g data-mml-node="TeXAtom" transform="translate(485, -150) scale(0.707)" data-mjx-texclass="ORD"><g data-mml-node="mi"><use xlink:href="#MJX-12230-TEX-I-1D456"></use></g></g></g></g></g></svg></mjx-container>

Löse das System: $\left(A-\lambda_{1} \cdot E_{2}\right) v_{1}=0$

Löse das System: <mjx-container class="MathJax" jax="SVG"><svg alt="\left(A-\lambda_{1} \cdot E_{2}\right) v_{1}=0" style="vertical-align: -0.566ex" xmlns="http://www.w3.org/2000/svg" width="18.831ex" height="2.262ex" role="img" focusable="false" viewBox="0 -750 8323.1 1000" xmlns:xlink="http://www.w3.org/1999/xlink"><defs><path id="MJX-12231-TEX-N-28" d="M94 250Q94 319 104 381T127 488T164 576T202 643T244 695T277 729T302 750H315H319Q333 750 333 741Q333 738 316 720T275 667T226 581T184 443T167 250T184 58T225 -81T274 -167T316 -220T333 -241Q333 -250 318 -250H315H302L274 -226Q180 -141 137 -14T94 250Z"></path><path id="MJX-12231-TEX-I-1D434" d="M208 74Q208 50 254 46Q272 46 272 35Q272 34 270 22Q267 8 264 4T251 0Q249 0 239 0T205 1T141 2Q70 2 50 0H42Q35 7 35 11Q37 38 48 46H62Q132 49 164 96Q170 102 345 401T523 704Q530 716 547 716H555H572Q578 707 578 706L606 383Q634 60 636 57Q641 46 701 46Q726 46 726 36Q726 34 723 22Q720 7 718 4T704 0Q701 0 690 0T651 1T578 2Q484 2 455 0H443Q437 6 437 9T439 27Q443 40 445 43L449 46H469Q523 49 533 63L521 213H283L249 155Q208 86 208 74ZM516 260Q516 271 504 416T490 562L463 519Q447 492 400 412L310 260L413 259Q516 259 516 260Z"></path><path id="MJX-12231-TEX-N-2212" d="M84 237T84 250T98 270H679Q694 262 694 250T679 230H98Q84 237 84 250Z"></path><path id="MJX-12231-TEX-I-1D706" d="M166 673Q166 685 183 694H202Q292 691 316 644Q322 629 373 486T474 207T524 67Q531 47 537 34T546 15T551 6T555 2T556 -2T550 -11H482Q457 3 450 18T399 152L354 277L340 262Q327 246 293 207T236 141Q211 112 174 69Q123 9 111 -1T83 -12Q47 -12 47 20Q47 37 61 52T199 187Q229 216 266 252T321 306L338 322Q338 323 288 462T234 612Q214 657 183 657Q166 657 166 673Z"></path><path id="MJX-12231-TEX-N-31" d="M213 578L200 573Q186 568 160 563T102 556H83V602H102Q149 604 189 617T245 641T273 663Q275 666 285 666Q294 666 302 660V361L303 61Q310 54 315 52T339 48T401 46H427V0H416Q395 3 257 3Q121 3 100 0H88V46H114Q136 46 152 46T177 47T193 50T201 52T207 57T213 61V578Z"></path><path id="MJX-12231-TEX-N-22C5" d="M78 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\begin{align*}\left(\begin{array}{cc|c} 6-10 i &amp; -17 &amp; 0 \\ 8 &amp; -6-10 i &amp; 0 \end{array}\right)\end{align*}

<mjx-container class="MathJax" jax="SVG"><svg alt="\begin{align*}\left(\begin{array}{cc|c}
6-10 i & -17 & 0 \\
8 & -6-10 i & 0
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624 203 642T247 661Q265 661 277 649T290 619Q290 596 270 577T226 557Q211 557 198 567T184 600ZM21 287Q21 295 30 318T54 369T98 420T158 442Q197 442 223 419T250 357Q250 340 236 301T196 196T154 83Q149 61 149 51Q149 26 166 26Q175 26 185 29T208 43T235 78T260 137Q263 149 265 151T282 153Q302 153 302 143Q302 135 293 112T268 61T223 11T161 -11Q129 -11 102 10T74 74Q74 91 79 106T122 220Q160 321 166 341T173 380Q173 404 156 404H154Q124 404 99 371T61 287Q60 286 59 284T58 281T56 279T53 278T49 278T41 278H27Q21 284 21 287Z"></path><path id="MJX-12232-TEX-N-37" d="M55 458Q56 460 72 567L88 674Q88 676 108 676H128V672Q128 662 143 655T195 646T364 644H485V605L417 512Q408 500 387 472T360 435T339 403T319 367T305 330T292 284T284 230T278 162T275 80Q275 66 275 52T274 28V19Q270 2 255 -10T221 -22Q210 -22 200 -19T179 0T168 40Q168 198 265 368Q285 400 349 489L395 552H302Q128 552 119 546Q113 543 108 522T98 479L95 458V455H55V458Z"></path><path id="MJX-12232-TEX-N-38" d="M70 417T70 494T124 618T248 666Q319 666 374 624T429 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xlink:href="#MJX-12232-TEX-N-30" transform="translate(500, 0)"></use></g><g data-mml-node="mi" transform="translate(3500.4, 0)"><use xlink:href="#MJX-12232-TEX-I-1D456"></use></g></g><g data-mml-node="mtd" transform="translate(8982.9, 0)"><g data-mml-node="mn"><use xlink:href="#MJX-12232-TEX-N-30"></use></g></g></g><line data-line="v" class="mjx-solid" x1="8447.9" y1="-950" x2="8447.9" y2="1450"></line></g><g data-mml-node="mo" transform="translate(10218.9, 0)"><use xlink:href="#MJX-12232-TEX-S3-29"></use></g></g></g></g></g></g></g></svg></mjx-container>

Daraus ergibt sich für den Lösungsvektor:

\begin{align*}(6-10 i) \cdot r-17 \cdot s=0\end{align*}

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317T38 348T53 381T73 411T99 433T132 442Q161 442 183 430T214 408T225 388Q227 382 228 382T236 389Q284 441 347 441H350Q398 441 422 400Q430 381 430 363Q430 333 417 315T391 292T366 288Q346 288 334 299T322 328Q322 376 378 392Q356 405 342 405Q286 405 239 331Q229 315 224 298T190 165Q156 25 151 16Q138 -11 108 -11Q95 -11 87 -5T76 7T74 17Q74 30 114 189T154 366Q154 405 128 405Q107 405 92 377T68 316T57 280Q55 278 41 278H27Q21 284 21 287Z"></path><path id="MJX-12233-TEX-N-37" d="M55 458Q56 460 72 567L88 674Q88 676 108 676H128V672Q128 662 143 655T195 646T364 644H485V605L417 512Q408 500 387 472T360 435T339 403T319 367T305 330T292 284T284 230T278 162T275 80Q275 66 275 52T274 28V19Q270 2 255 -10T221 -22Q210 -22 200 -19T179 0T168 40Q168 198 265 368Q285 400 349 489L395 552H302Q128 552 119 546Q113 543 108 522T98 479L95 458V455H55V458Z"></path><path id="MJX-12233-TEX-I-1D460" d="M131 289Q131 321 147 354T203 415T300 442Q362 442 390 415T419 355Q419 323 402 308T364 292Q351 292 340 300T328 326Q328 342 337 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Setze  z. B. <mjx-container class="MathJax" jax="SVG"><svg alt="s=6-10i" style="vertical-align: -0.186ex" xmlns="http://www.w3.org/2000/svg" width="11.018ex" height="1.692ex" role="img" focusable="false" viewBox="0 -666 4870 748" xmlns:xlink="http://www.w3.org/1999/xlink"><defs><path id="MJX-12234-TEX-I-1D460" d="M131 289Q131 321 147 354T203 415T300 442Q362 442 390 415T419 355Q419 323 402 308T364 292Q351 292 340 300T328 326Q328 342 337 354T354 372T367 378Q368 378 368 379Q368 382 361 388T336 399T297 405Q249 405 227 379T204 326Q204 301 223 291T278 274T330 259Q396 230 396 163Q396 135 385 107T352 51T289 7T195 -10Q118 -10 86 19T53 87Q53 126 74 143T118 160Q133 160 146 151T160 120Q160 94 142 76T111 58Q109 57 108 57T107 55Q108 52 115 47T146 34T201 27Q237 27 263 38T301 66T318 97T323 122Q323 150 302 164T254 181T195 196T148 231Q131 256 131 289Z"></path><path id="MJX-12234-TEX-N-3D" d="M56 347Q56 360 70 367H707Q722 359 722 347Q722 336 708 328L390 327H72Q56 332 56 347ZM56 153Q56 168 72 173H708Q722 163 722 153Q722 140 707 133H70Q56 140 56 153Z"></path><path id="MJX-12234-TEX-N-36" d="M42 313Q42 476 123 571T303 666Q372 666 402 630T432 550Q432 525 418 510T379 495Q356 495 341 509T326 548Q326 592 373 601Q351 623 311 626Q240 626 194 566Q147 500 147 364L148 360Q153 366 156 373Q197 433 263 433H267Q313 433 348 414Q372 400 396 374T435 317Q456 268 456 210V192Q456 169 451 149Q440 90 387 34T253 -22Q225 -22 199 -14T143 16T92 75T56 172T42 313ZM257 397Q227 397 205 380T171 335T154 278T148 216Q148 133 160 97T198 39Q222 21 251 21Q302 21 329 59Q342 77 347 104T352 209Q352 289 347 316T329 361Q302 397 257 397Z"></path><path id="MJX-12234-TEX-N-2212" d="M84 237T84 250T98 270H679Q694 262 694 250T679 230H98Q84 237 84 250Z"></path><path id="MJX-12234-TEX-N-31" d="M213 578L200 573Q186 568 160 563T102 556H83V602H102Q149 604 189 617T245 641T273 663Q275 666 285 666Q294 666 302 660V361L303 61Q310 54 315 52T339 48T401 46H427V0H416Q395 3 257 3Q121 3 100 0H88V46H114Q136 46 152 46T177 47T193 50T201 52T207 57T213 61V578Z"></path><path id="MJX-12234-TEX-N-30" d="M96 585Q152 666 249 666Q297 666 345 640T423 548Q460 465 460 320Q460 165 417 83Q397 41 362 16T301 -15T250 -22Q224 -22 198 -16T137 16T82 83Q39 165 39 320Q39 494 96 585ZM321 597Q291 629 250 629Q208 629 178 597Q153 571 145 525T137 333Q137 175 145 125T181 46Q209 16 250 16Q290 16 318 46Q347 76 354 130T362 333Q362 478 354 524T321 597Z"></path><path id="MJX-12234-TEX-I-1D456" d="M184 600Q184 624 203 642T247 661Q265 661 277 649T290 619Q290 596 270 577T226 557Q211 557 198 567T184 600ZM21 287Q21 295 30 318T54 369T98 420T158 442Q197 442 223 419T250 357Q250 340 236 301T196 196T154 83Q149 61 149 51Q149 26 166 26Q175 26 185 29T208 43T235 78T260 137Q263 149 265 151T282 153Q302 153 302 143Q302 135 293 112T268 61T223 11T161 -11Q129 -11 102 10T74 74Q74 91 79 106T122 220Q160 321 166 341T173 380Q173 404 156 404H154Q124 404 99 371T61 287Q60 286 59 284T58 281T56 279T53 278T49 278T41 278H27Q21 284 21 287Z"></path></defs><g stroke="currentColor" fill="currentColor" stroke-width="0" transform="matrix(1 0 0 -1 0 0)"><g data-mml-node="math"><g data-mml-node="mi"><use xlink:href="#MJX-12234-TEX-I-1D460"></use></g><g data-mml-node="mo" transform="translate(746.8, 0)"><use xlink:href="#MJX-12234-TEX-N-3D"></use></g><g data-mml-node="mn" transform="translate(1802.6, 0)"><use xlink:href="#MJX-12234-TEX-N-36"></use></g><g data-mml-node="mo" transform="translate(2524.8, 0)"><use xlink:href="#MJX-12234-TEX-N-2212"></use></g><g data-mml-node="mn" transform="translate(3525, 0)"><use xlink:href="#MJX-12234-TEX-N-31"></use><use xlink:href="#MJX-12234-TEX-N-30" transform="translate(500, 0)"></use></g><g data-mml-node="mi" transform="translate(4525, 0)"><use xlink:href="#MJX-12234-TEX-I-1D456"></use></g></g></g></svg></mjx-container>

$\Rightarrow r=17$
mit dem Eigenvektor: \begin{align*}v_{1}=\left(\begin{array}{l} r \\ s \end{array}\right)=\left(\begin{array}{c} 17 \\ 6-10 i \end{array}\right)\end{align*}

<mjx-container class="MathJax" jax="SVG"><svg alt="\Rightarrow r=17" style="vertical-align: -0.186ex" xmlns="http://www.w3.org/2000/svg" width="9.191ex" height="1.715ex" role="img" focusable="false" viewBox="0 -676 4062.3 758" xmlns:xlink="http://www.w3.org/1999/xlink"><defs><path id="MJX-12235-TEX-N-21D2" d="M580 514Q580 525 596 525Q601 525 604 525T609 525T613 524T615 523T617 520T619 517T622 512Q659 438 720 381T831 300T927 263Q944 258 944 250T935 239T898 228T840 204Q696 134 622 -12Q618 -21 615 -22T600 -24Q580 -24 580 -17Q580 -13 585 0Q620 69 671 123L681 133H70Q56 140 56 153Q56 168 72 173H725L735 181Q774 211 852 250Q851 251 834 259T789 283T735 319L725 327H72Q56 332 56 347Q56 360 70 367H681L671 377Q638 412 609 458T580 514Z"></path><path id="MJX-12235-TEX-I-1D45F" d="M21 287Q22 290 23 295T28 317T38 348T53 381T73 411T99 433T132 442Q161 442 183 430T214 408T225 388Q227 382 228 382T236 389Q284 441 347 441H350Q398 441 422 400Q430 381 430 363Q430 333 417 315T391 292T366 288Q346 288 334 299T322 328Q322 376 378 392Q356 405 342 405Q286 405 239 331Q229 315 224 298T190 165Q156 25 151 16Q138 -11 108 -11Q95 -11 87 -5T76 7T74 17Q74 30 114 189T154 366Q154 405 128 405Q107 405 92 377T68 316T57 280Q55 278 41 278H27Q21 284 21 287Z"></path><path id="MJX-12235-TEX-N-3D" d="M56 347Q56 360 70 367H707Q722 359 722 347Q722 336 708 328L390 327H72Q56 332 56 347ZM56 153Q56 168 72 173H708Q722 163 722 153Q722 140 707 133H70Q56 140 56 153Z"></path><path id="MJX-12235-TEX-N-31" d="M213 578L200 573Q186 568 160 563T102 556H83V602H102Q149 604 189 617T245 641T273 663Q275 666 285 666Q294 666 302 660V361L303 61Q310 54 315 52T339 48T401 46H427V0H416Q395 3 257 3Q121 3 100 0H88V46H114Q136 46 152 46T177 47T193 50T201 52T207 57T213 61V578Z"></path><path id="MJX-12235-TEX-N-37" d="M55 458Q56 460 72 567L88 674Q88 676 108 676H128V672Q128 662 143 655T195 646T364 644H485V605L417 512Q408 500 387 472T360 435T339 403T319 367T305 330T292 284T284 230T278 162T275 80Q275 66 275 52T274 28V19Q270 2 255 -10T221 -22Q210 -22 200 -19T179 0T168 40Q168 198 265 368Q285 400 349 489L395 552H302Q128 552 119 546Q113 543 108 522T98 479L95 458V455H55V458Z"></path></defs><g stroke="currentColor" fill="currentColor" stroke-width="0" transform="matrix(1 0 0 -1 0 0)"><g data-mml-node="math"><g data-mml-node="mo"><use xlink:href="#MJX-12235-TEX-N-21D2"></use></g><g data-mml-node="mi" transform="translate(1277.8, 0)"><use xlink:href="#MJX-12235-TEX-I-1D45F"></use></g><g data-mml-node="mo" transform="translate(2006.6, 0)"><use xlink:href="#MJX-12235-TEX-N-3D"></use></g><g data-mml-node="mn" transform="translate(3062.3, 0)"><use xlink:href="#MJX-12235-TEX-N-31"></use><use xlink:href="#MJX-12235-TEX-N-37" transform="translate(500, 0)"></use></g></g></g></svg></mjx-container>
mit dem Eigenvektor: <mjx-container class="MathJax" jax="SVG"><svg alt="\begin{align*}v_{1}=\left(\begin{array}{l}
r \\
s
\end{array}\right)=\left(\begin{array}{c}
17 \\
6-10 i
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Für Eigenwert $ \lambda_{2}=-10i $ gilt:

Für Eigenwert <mjx-container class="MathJax" jax="SVG"><svg alt=" \lambda_{2}=-10i " style="vertical-align: -0.339ex" xmlns="http://www.w3.org/2000/svg" width="10.052ex" height="1.91ex" role="img" focusable="false" viewBox="0 -694 4443.1 844" xmlns:xlink="http://www.w3.org/1999/xlink"><defs><path id="MJX-12237-TEX-I-1D706" d="M166 673Q166 685 183 694H202Q292 691 316 644Q322 629 373 486T474 207T524 67Q531 47 537 34T546 15T551 6T555 2T556 -2T550 -11H482Q457 3 450 18T399 152L354 277L340 262Q327 246 293 207T236 141Q211 112 174 69Q123 9 111 -1T83 -12Q47 -12 47 20Q47 37 61 52T199 187Q229 216 266 252T321 306L338 322Q338 323 288 462T234 612Q214 657 183 657Q166 657 166 673Z"></path><path id="MJX-12237-TEX-N-32" d="M109 429Q82 429 66 447T50 491Q50 562 103 614T235 666Q326 666 387 610T449 465Q449 422 429 383T381 315T301 241Q265 210 201 149L142 93L218 92Q375 92 385 97Q392 99 409 186V189H449V186Q448 183 436 95T421 3V0H50V19V31Q50 38 56 46T86 81Q115 113 136 137Q145 147 170 174T204 211T233 244T261 278T284 308T305 340T320 369T333 401T340 431T343 464Q343 527 309 573T212 619Q179 619 154 602T119 569T109 550Q109 549 114 549Q132 549 151 535T170 489Q170 464 154 447T109 429Z"></path><path id="MJX-12237-TEX-N-3D" d="M56 347Q56 360 70 367H707Q722 359 722 347Q722 336 708 328L390 327H72Q56 332 56 347ZM56 153Q56 168 72 173H708Q722 163 722 153Q722 140 707 133H70Q56 140 56 153Z"></path><path id="MJX-12237-TEX-N-2212" d="M84 237T84 250T98 270H679Q694 262 694 250T679 230H98Q84 237 84 250Z"></path><path id="MJX-12237-TEX-N-31" d="M213 578L200 573Q186 568 160 563T102 556H83V602H102Q149 604 189 617T245 641T273 663Q275 666 285 666Q294 666 302 660V361L303 61Q310 54 315 52T339 48T401 46H427V0H416Q395 3 257 3Q121 3 100 0H88V46H114Q136 46 152 46T177 47T193 50T201 52T207 57T213 61V578Z"></path><path id="MJX-12237-TEX-N-30" d="M96 585Q152 666 249 666Q297 666 345 640T423 548Q460 465 460 320Q460 165 417 83Q397 41 362 16T301 -15T250 -22Q224 -22 198 -16T137 16T82 83Q39 165 39 320Q39 494 96 585ZM321 597Q291 629 250 629Q208 629 178 597Q153 571 145 525T137 333Q137 175 145 125T181 46Q209 16 250 16Q290 16 318 46Q347 76 354 130T362 333Q362 478 354 524T321 597Z"></path><path id="MJX-12237-TEX-I-1D456" d="M184 600Q184 624 203 642T247 661Q265 661 277 649T290 619Q290 596 270 577T226 557Q211 557 198 567T184 600ZM21 287Q21 295 30 318T54 369T98 420T158 442Q197 442 223 419T250 357Q250 340 236 301T196 196T154 83Q149 61 149 51Q149 26 166 26Q175 26 185 29T208 43T235 78T260 137Q263 149 265 151T282 153Q302 153 302 143Q302 135 293 112T268 61T223 11T161 -11Q129 -11 102 10T74 74Q74 91 79 106T122 220Q160 321 166 341T173 380Q173 404 156 404H154Q124 404 99 371T61 287Q60 286 59 284T58 281T56 279T53 278T49 278T41 278H27Q21 284 21 287Z"></path></defs><g stroke="currentColor" fill="currentColor" stroke-width="0" transform="matrix(1 0 0 -1 0 0)"><g data-mml-node="math"><g data-mml-node="msub"><g data-mml-node="mi"><use xlink:href="#MJX-12237-TEX-I-1D706"></use></g><g data-mml-node="TeXAtom" transform="translate(583, -150) scale(0.707)" data-mjx-texclass="ORD"><g data-mml-node="mn"><use xlink:href="#MJX-12237-TEX-N-32"></use></g></g></g><g data-mml-node="mo" transform="translate(1264.3, 0)"><use xlink:href="#MJX-12237-TEX-N-3D"></use></g><g data-mml-node="mo" transform="translate(2320.1, 0)"><use xlink:href="#MJX-12237-TEX-N-2212"></use></g><g data-mml-node="mn" transform="translate(3098.1, 0)"><use xlink:href="#MJX-12237-TEX-N-31"></use><use xlink:href="#MJX-12237-TEX-N-30" transform="translate(500, 0)"></use></g><g data-mml-node="mi" transform="translate(4098.1, 0)"><use xlink:href="#MJX-12237-TEX-I-1D456"></use></g></g></g></svg></mjx-container> gilt:

Zum Eigenwert $\lambda_{2}=\bar{\lambda}_{1}$ (komplex konjugiert), ergibt sich der Eigenvektor $v_{2}=\overline{v_{1}}=\left(\begin{array}{c} 17 \\ 6+10 i \end{array}\right)$ (komplex konjugiert)

Zum Eigenwert <mjx-container class="MathJax" jax="SVG"><svg alt="\lambda_{2}=\bar{\lambda}_{1}" style="vertical-align: -0.339ex" xmlns="http://www.w3.org/2000/svg" width="7.481ex" height="2.376ex" role="img" focusable="false" viewBox="0 -900 3306.7 1050" xmlns:xlink="http://www.w3.org/1999/xlink"><defs><path id="MJX-12238-TEX-I-1D706" d="M166 673Q166 685 183 694H202Q292 691 316 644Q322 629 373 486T474 207T524 67Q531 47 537 34T546 15T551 6T555 2T556 -2T550 -11H482Q457 3 450 18T399 152L354 277L340 262Q327 246 293 207T236 141Q211 112 174 69Q123 9 111 -1T83 -12Q47 -12 47 20Q47 37 61 52T199 187Q229 216 266 252T321 306L338 322Q338 323 288 462T234 612Q214 657 183 657Q166 657 166 673Z"></path><path id="MJX-12238-TEX-N-32" d="M109 429Q82 429 66 447T50 491Q50 562 103 614T235 666Q326 666 387 610T449 465Q449 422 429 383T381 315T301 241Q265 210 201 149L142 93L218 92Q375 92 385 97Q392 99 409 186V189H449V186Q448 183 436 95T421 3V0H50V19V31Q50 38 56 46T86 81Q115 113 136 137Q145 147 170 174T204 211T233 244T261 278T284 308T305 340T320 369T333 401T340 431T343 464Q343 527 309 573T212 619Q179 619 154 602T119 569T109 550Q109 549 114 549Q132 549 151 535T170 489Q170 464 154 447T109 429Z"></path><path id="MJX-12238-TEX-N-3D" d="M56 347Q56 360 70 367H707Q722 359 722 347Q722 336 708 328L390 327H72Q56 332 56 347ZM56 153Q56 168 72 173H708Q722 163 722 153Q722 140 707 133H70Q56 140 56 153Z"></path><path id="MJX-12238-TEX-N-AF" d="M69 544V590H430V544H69Z"></path><path id="MJX-12238-TEX-N-31" d="M213 578L200 573Q186 568 160 563T102 556H83V602H102Q149 604 189 617T245 641T273 663Q275 666 285 666Q294 666 302 660V361L303 61Q310 54 315 52T339 48T401 46H427V0H416Q395 3 257 3Q121 3 100 0H88V46H114Q136 46 152 46T177 47T193 50T201 52T207 57T213 61V578Z"></path></defs><g stroke="currentColor" fill="currentColor" stroke-width="0" transform="matrix(1 0 0 -1 0 0)"><g data-mml-node="math"><g data-mml-node="msub"><g data-mml-node="mi"><use xlink:href="#MJX-12238-TEX-I-1D706"></use></g><g data-mml-node="TeXAtom" transform="translate(583, -150) scale(0.707)" data-mjx-texclass="ORD"><g data-mml-node="mn"><use xlink:href="#MJX-12238-TEX-N-32"></use></g></g></g><g data-mml-node="mo" transform="translate(1264.3, 0)"><use xlink:href="#MJX-12238-TEX-N-3D"></use></g><g data-mml-node="msub" transform="translate(2320.1, 0)"><g data-mml-node="TeXAtom" data-mjx-texclass="ORD"><g data-mml-node="mover"><g data-mml-node="mi"><use xlink:href="#MJX-12238-TEX-I-1D706"></use></g><g data-mml-node="mo" transform="translate(41.5, 210)"><use xlink:href="#MJX-12238-TEX-N-AF"></use></g></g></g><g data-mml-node="TeXAtom" transform="translate(583, -150) scale(0.707)" data-mjx-texclass="ORD"><g data-mml-node="mn"><use xlink:href="#MJX-12238-TEX-N-31"></use></g></g></g></g></g></svg></mjx-container> (komplex konjugiert), ergibt sich der Eigenvektor <mjx-container class="MathJax" jax="SVG"><svg alt="v_{2}=\overline{v_{1}}=\left(\begin{array}{c}
17 \\
6+10 i
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data-mjx-texclass="ORD"><g data-mml-node="mn"><use xlink:href="#MJX-12239-TEX-N-32"></use></g></g></g><g data-mml-node="mo" transform="translate(1166.3, 0)"><use xlink:href="#MJX-12239-TEX-N-3D"></use></g><g data-mml-node="mover" transform="translate(2222.1, 0)"><g data-mml-node="msub"><g data-mml-node="mi"><use xlink:href="#MJX-12239-TEX-I-1D463"></use></g><g data-mml-node="TeXAtom" transform="translate(485, -150) scale(0.707)" data-mjx-texclass="ORD"><g data-mml-node="mn"><use xlink:href="#MJX-12239-TEX-N-31"></use></g></g></g><g data-mml-node="mo" transform="translate(0, 258.3) scale(0.707)"><svg width="1256.6" height="246" x="0" y="444" viewBox="314.2 444 1256.6 246"><use xlink:href="#MJX-12239-TEX-S4-AF" transform="scale(3.77, 1)"></use></svg></g></g><g data-mml-node="mo" transform="translate(3388.4, 0)"><use xlink:href="#MJX-12239-TEX-N-3D"></use></g><g data-mml-node="mrow" transform="translate(4444.2, 0)"><g data-mml-node="mo"><use xlink:href="#MJX-12239-TEX-S3-28"></use></g><g data-mml-node="mtable" transform="translate(736, 0)"><g data-mml-node="mtr" transform="translate(0, 700)"><g data-mml-node="mtd" transform="translate(1033.7, 0)"><g data-mml-node="mn"><use xlink:href="#MJX-12239-TEX-N-31"></use><use xlink:href="#MJX-12239-TEX-N-37" transform="translate(500, 0)"></use></g></g></g><g data-mml-node="mtr" transform="translate(0, -700)"><g data-mml-node="mtd"><g data-mml-node="mn"><use xlink:href="#MJX-12239-TEX-N-36"></use></g><g data-mml-node="mo" transform="translate(722.2, 0)"><use xlink:href="#MJX-12239-TEX-N-2B"></use></g><g data-mml-node="mn" transform="translate(1722.4, 0)"><use xlink:href="#MJX-12239-TEX-N-31"></use><use xlink:href="#MJX-12239-TEX-N-30" transform="translate(500, 0)"></use></g><g data-mml-node="mi" transform="translate(2722.4, 0)"><use xlink:href="#MJX-12239-TEX-I-1D456"></use></g></g></g></g><g data-mml-node="mo" transform="translate(3803.4, 0)"><use xlink:href="#MJX-12239-TEX-S3-29"></use></g></g></g></g></svg></mjx-container> (komplex konjugiert)

Alternativ kann auch $\left(A-\lambda_{2} \cdot E_{2}\right) v_{2}=0$ gelöst werden. Allerdings liefert der komplex konjugierte Vektor hier keine neue Information und ist eigentlich überflüssig.

Alternativ kann auch <mjx-container class="MathJax" jax="SVG"><svg alt="\left(A-\lambda_{2} \cdot E_{2}\right) v_{2}=0" style="vertical-align: -0.566ex" xmlns="http://www.w3.org/2000/svg" width="18.831ex" height="2.262ex" role="img" focusable="false" viewBox="0 -750 8323.1 1000" xmlns:xlink="http://www.w3.org/1999/xlink"><defs><path id="MJX-12240-TEX-N-28" d="M94 250Q94 319 104 381T127 488T164 576T202 643T244 695T277 729T302 750H315H319Q333 750 333 741Q333 738 316 720T275 667T226 581T184 443T167 250T184 58T225 -81T274 -167T316 -220T333 -241Q333 -250 318 -250H315H302L274 -226Q180 -141 137 -14T94 250Z"></path><path id="MJX-12240-TEX-I-1D434" d="M208 74Q208 50 254 46Q272 46 272 35Q272 34 270 22Q267 8 264 4T251 0Q249 0 239 0T205 1T141 2Q70 2 50 0H42Q35 7 35 11Q37 38 48 46H62Q132 49 164 96Q170 102 345 401T523 704Q530 716 547 716H555H572Q578 707 578 706L606 383Q634 60 636 57Q641 46 701 46Q726 46 726 36Q726 34 723 22Q720 7 718 4T704 0Q701 0 690 0T651 1T578 2Q484 2 455 0H443Q437 6 437 9T439 27Q443 40 445 43L449 46H469Q523 49 533 63L521 213H283L249 155Q208 86 208 74ZM516 260Q516 271 504 416T490 562L463 519Q447 492 400 412L310 260L413 259Q516 259 516 260Z"></path><path id="MJX-12240-TEX-N-2212" d="M84 237T84 250T98 270H679Q694 262 694 250T679 230H98Q84 237 84 250Z"></path><path id="MJX-12240-TEX-I-1D706" d="M166 673Q166 685 183 694H202Q292 691 316 644Q322 629 373 486T474 207T524 67Q531 47 537 34T546 15T551 6T555 2T556 -2T550 -11H482Q457 3 450 18T399 152L354 277L340 262Q327 246 293 207T236 141Q211 112 174 69Q123 9 111 -1T83 -12Q47 -12 47 20Q47 37 61 52T199 187Q229 216 266 252T321 306L338 322Q338 323 288 462T234 612Q214 657 183 657Q166 657 166 673Z"></path><path id="MJX-12240-TEX-N-32" d="M109 429Q82 429 66 447T50 491Q50 562 103 614T235 666Q326 666 387 610T449 465Q449 422 429 383T381 315T301 241Q265 210 201 149L142 93L218 92Q375 92 385 97Q392 99 409 186V189H449V186Q448 183 436 95T421 3V0H50V19V31Q50 38 56 46T86 81Q115 113 136 137Q145 147 170 174T204 211T233 244T261 278T284 308T305 340T320 369T333 401T340 431T343 464Q343 527 309 573T212 619Q179 619 154 602T119 569T109 550Q109 549 114 549Q132 549 151 535T170 489Q170 464 154 447T109 429Z"></path><path id="MJX-12240-TEX-N-22C5" d="M78 250Q78 274 95 292T138 310Q162 310 180 294T199 251Q199 226 182 208T139 190T96 207T78 250Z"></path><path id="MJX-12240-TEX-I-1D438" d="M492 213Q472 213 472 226Q472 230 477 250T482 285Q482 316 461 323T364 330H312Q311 328 277 192T243 52Q243 48 254 48T334 46Q428 46 458 48T518 61Q567 77 599 117T670 248Q680 270 683 272Q690 274 698 274Q718 274 718 261Q613 7 608 2Q605 0 322 0H133Q31 0 31 11Q31 13 34 25Q38 41 42 43T65 46Q92 46 125 49Q139 52 144 61Q146 66 215 342T285 622Q285 629 281 629Q273 632 228 634H197Q191 640 191 642T193 659Q197 676 203 680H757Q764 676 764 669Q764 664 751 557T737 447Q735 440 717 440H705Q698 445 698 453L701 476Q704 500 704 528Q704 558 697 578T678 609T643 625T596 632T532 634H485Q397 633 392 631Q388 629 386 622Q385 619 355 499T324 377Q347 376 372 376H398Q464 376 489 391T534 472Q538 488 540 490T557 493Q562 493 565 493T570 492T572 491T574 487T577 483L544 351Q511 218 508 216Q505 213 492 213Z"></path><path id="MJX-12240-TEX-N-29" d="M60 749L64 750Q69 750 74 750H86L114 726Q208 641 251 514T294 250Q294 182 284 119T261 12T224 -76T186 -143T145 -194T113 -227T90 -246Q87 -249 86 -250H74Q66 -250 63 -250T58 -247T55 -238Q56 -237 66 -225Q221 -64 221 250T66 725Q56 737 55 738Q55 746 60 749Z"></path><path id="MJX-12240-TEX-I-1D463" d="M173 380Q173 405 154 405Q130 405 104 376T61 287Q60 286 59 284T58 281T56 279T53 278T49 278T41 278H27Q21 284 21 287Q21 294 29 316T53 368T97 419T160 441Q202 441 225 417T249 361Q249 344 246 335Q246 329 231 291T200 202T182 113Q182 86 187 69Q200 26 250 26Q287 26 319 60T369 139T398 222T409 277Q409 300 401 317T383 343T365 361T357 383Q357 405 376 424T417 443Q436 443 451 425T467 367Q467 340 455 284T418 159T347 40T241 -11Q177 -11 139 22Q102 54 102 117Q102 148 110 181T151 298Q173 362 173 380Z"></path><path id="MJX-12240-TEX-N-3D" d="M56 347Q56 360 70 367H707Q722 359 722 347Q722 336 708 328L390 327H72Q56 332 56 347ZM56 153Q56 168 72 173H708Q722 163 722 153Q722 140 707 133H70Q56 140 56 153Z"></path><path id="MJX-12240-TEX-N-30" d="M96 585Q152 666 249 666Q297 666 345 640T423 548Q460 465 460 320Q460 165 417 83Q397 41 362 16T301 -15T250 -22Q224 -22 198 -16T137 16T82 83Q39 165 39 320Q39 494 96 585ZM321 597Q291 629 250 629Q208 629 178 597Q153 571 145 525T137 333Q137 175 145 125T181 46Q209 16 250 16Q290 16 318 46Q347 76 354 130T362 333Q362 478 354 524T321 597Z"></path></defs><g stroke="currentColor" fill="currentColor" stroke-width="0" transform="matrix(1 0 0 -1 0 0)"><g data-mml-node="math"><g data-mml-node="mrow"><g data-mml-node="mo"><use xlink:href="#MJX-12240-TEX-N-28"></use></g><g data-mml-node="mi" transform="translate(389, 0)"><use xlink:href="#MJX-12240-TEX-I-1D434"></use></g><g data-mml-node="mo" transform="translate(1361.2, 0)"><use xlink:href="#MJX-12240-TEX-N-2212"></use></g><g data-mml-node="msub" transform="translate(2361.4, 0)"><g data-mml-node="mi"><use xlink:href="#MJX-12240-TEX-I-1D706"></use></g><g data-mml-node="TeXAtom" transform="translate(583, -150) scale(0.707)" data-mjx-texclass="ORD"><g data-mml-node="mn"><use xlink:href="#MJX-12240-TEX-N-32"></use></g></g></g><g data-mml-node="mo" transform="translate(3570.2, 0)"><use xlink:href="#MJX-12240-TEX-N-22C5"></use></g><g data-mml-node="msub" transform="translate(4070.4, 0)"><g data-mml-node="mi"><use xlink:href="#MJX-12240-TEX-I-1D438"></use></g><g data-mml-node="TeXAtom" transform="translate(738, -150) scale(0.707)" data-mjx-texclass="ORD"><g data-mml-node="mn"><use xlink:href="#MJX-12240-TEX-N-32"></use></g></g></g><g data-mml-node="mo" transform="translate(5212, 0)"><use xlink:href="#MJX-12240-TEX-N-29"></use></g></g><g data-mml-node="msub" transform="translate(5601, 0)"><g data-mml-node="mi"><use xlink:href="#MJX-12240-TEX-I-1D463"></use></g><g data-mml-node="TeXAtom" transform="translate(485, -150) scale(0.707)" data-mjx-texclass="ORD"><g data-mml-node="mn"><use xlink:href="#MJX-12240-TEX-N-32"></use></g></g></g><g data-mml-node="mo" transform="translate(6767.3, 0)"><use xlink:href="#MJX-12240-TEX-N-3D"></use></g><g data-mml-node="mn" transform="translate(7823.1, 0)"><use xlink:href="#MJX-12240-TEX-N-30"></use></g></g></g></svg></mjx-container> gelöst werden. Allerdings liefert der komplex konjugierte Vektor hier keine neue Information und ist eigentlich überflüssig.

Daraus ergibt sich das Fundamentalsystem (System aus linear unabhängigen Vektoren):

Merke: Realteil und Imaginärteil eines komplexen Fundamentalsystemvektors sind linear unabhängige, reelle Lösungsvektoren des DGL-Systems. Damit kann ein reelles Fundamentalsystem angegeben werden. Der zweite Vektor (komplex konjugiert) liefert dann keine neuen Informationen mehr.

\begin{aligned} &amp;\left\{\operatorname{Re}\left(e^{10 i t} \cdot\left(\begin{array}{c} 17 \\ 6-10 i \end{array}\right)\right) \ ,\right.\ \left.\operatorname{Im}\left(e^{10 i t} \cdot\left(\begin{array}{c} 17 \\ 6-10 i \end{array}\right)\right)\right\} \\ \\ =&amp;\left\{\operatorname{Re}\left((\cos (10 t)+i \sin (10 t)) \cdot\left(\begin{array}{c} 17 \\ 6-10 i \end{array}\right)\right) \ , \ \operatorname{Im}\left((\cos (10 t)+i \sin (10 t)) \cdot\left(\begin{array}{c} 17 \\ 6-10 i \end{array}\right)\right)\right\} \end{aligned}

<div class="step">
<div>
Damit ergibt sich ein reelles Fundamentalsystem mit:
</div>
</div>

Gegeben sei das folgende Differentialgleichungssystem: $\dot{x}(t)=A \cdot x(t)$ mit: \[ A=\left(\begin{array}{ll} 6 &amp; -17 \\ 8 &amp; -6 \end{array}\right) \]
Bestimme die Lösungsgesamtheit (Fundamentalsystem) des DGL-Systems.

Gegeben sei das folgende Differentialgleichungssystem: <mjx-container class="MathJax" jax="SVG"><svg alt="\dot{x}(t)=A \cdot x(t)" style="vertical-align: -0.566ex" xmlns="http://www.w3.org/2000/svg" width="14.09ex" height="2.262ex" role="img" focusable="false" viewBox="0 -750 6228 1000" xmlns:xlink="http://www.w3.org/1999/xlink"><defs><path id="MJX-12225-TEX-I-1D465" d="M52 289Q59 331 106 386T222 442Q257 442 286 424T329 379Q371 442 430 442Q467 442 494 420T522 361Q522 332 508 314T481 292T458 288Q439 288 427 299T415 328Q415 374 465 391Q454 404 425 404Q412 404 406 402Q368 386 350 336Q290 115 290 78Q290 50 306 38T341 26Q378 26 414 59T463 140Q466 150 469 151T485 153H489Q504 153 504 145Q504 144 502 134Q486 77 440 33T333 -11Q263 -11 227 52Q186 -10 133 -10H127Q78 -10 57 16T35 71Q35 103 54 123T99 143Q142 143 142 101Q142 81 130 66T107 46T94 41L91 40Q91 39 97 36T113 29T132 26Q168 26 194 71Q203 87 217 139T245 247T261 313Q266 340 266 352Q266 380 251 392T217 404Q177 404 142 372T93 290Q91 281 88 280T72 278H58Q52 284 52 289Z"></path><path id="MJX-12225-TEX-N-2D9" d="M190 609Q190 637 208 653T252 669Q275 667 292 652T309 609Q309 579 292 564T250 549Q225 549 208 564T190 609Z"></path><path id="MJX-12225-TEX-N-28" d="M94 250Q94 319 104 381T127 488T164 576T202 643T244 695T277 729T302 750H315H319Q333 750 333 741Q333 738 316 720T275 667T226 581T184 443T167 250T184 58T225 -81T274 -167T316 -220T333 -241Q333 -250 318 -250H315H302L274 -226Q180 -141 137 -14T94 250Z"></path><path id="MJX-12225-TEX-I-1D461" d="M26 385Q19 392 19 395Q19 399 22 411T27 425Q29 430 36 430T87 431H140L159 511Q162 522 166 540T173 566T179 586T187 603T197 615T211 624T229 626Q247 625 254 615T261 596Q261 589 252 549T232 470L222 433Q222 431 272 431H323Q330 424 330 420Q330 398 317 385H210L174 240Q135 80 135 68Q135 26 162 26Q197 26 230 60T283 144Q285 150 288 151T303 153H307Q322 153 322 145Q322 142 319 133Q314 117 301 95T267 48T216 6T155 -11Q125 -11 98 4T59 56Q57 64 57 83V101L92 241Q127 382 128 383Q128 385 77 385H26Z"></path><path id="MJX-12225-TEX-N-29" d="M60 749L64 750Q69 750 74 750H86L114 726Q208 641 251 514T294 250Q294 182 284 119T261 12T224 -76T186 -143T145 -194T113 -227T90 -246Q87 -249 86 -250H74Q66 -250 63 -250T58 -247T55 -238Q56 -237 66 -225Q221 -64 221 250T66 725Q56 737 55 738Q55 746 60 749Z"></path><path id="MJX-12225-TEX-N-3D" d="M56 347Q56 360 70 367H707Q722 359 722 347Q722 336 708 328L390 327H72Q56 332 56 347ZM56 153Q56 168 72 173H708Q722 163 722 153Q722 140 707 133H70Q56 140 56 153Z"></path><path id="MJX-12225-TEX-I-1D434" d="M208 74Q208 50 254 46Q272 46 272 35Q272 34 270 22Q267 8 264 4T251 0Q249 0 239 0T205 1T141 2Q70 2 50 0H42Q35 7 35 11Q37 38 48 46H62Q132 49 164 96Q170 102 345 401T523 704Q530 716 547 716H555H572Q578 707 578 706L606 383Q634 60 636 57Q641 46 701 46Q726 46 726 36Q726 34 723 22Q720 7 718 4T704 0Q701 0 690 0T651 1T578 2Q484 2 455 0H443Q437 6 437 9T439 27Q443 40 445 43L449 46H469Q523 49 533 63L521 213H283L249 155Q208 86 208 74ZM516 260Q516 271 504 416T490 562L463 519Q447 492 400 412L310 260L413 259Q516 259 516 260Z"></path><path id="MJX-12225-TEX-N-22C5" d="M78 250Q78 274 95 292T138 310Q162 310 180 294T199 251Q199 226 182 208T139 190T96 207T78 250Z"></path></defs><g stroke="currentColor" fill="currentColor" stroke-width="0" transform="matrix(1 0 0 -1 0 0)"><g data-mml-node="math"><g data-mml-node="TeXAtom" data-mjx-texclass="ORD"><g data-mml-node="mover"><g data-mml-node="mi"><use xlink:href="#MJX-12225-TEX-I-1D465"></use></g><g data-mml-node="mo" transform="translate(63.8, -47)"><use xlink:href="#MJX-12225-TEX-N-2D9"></use></g></g></g><g data-mml-node="mo" transform="translate(572, 0)"><use xlink:href="#MJX-12225-TEX-N-28"></use></g><g data-mml-node="mi" transform="translate(961, 0)"><use xlink:href="#MJX-12225-TEX-I-1D461"></use></g><g data-mml-node="mo" transform="translate(1322, 0)"><use xlink:href="#MJX-12225-TEX-N-29"></use></g><g data-mml-node="mo" transform="translate(1988.8, 0)"><use xlink:href="#MJX-12225-TEX-N-3D"></use></g><g data-mml-node="mi" transform="translate(3044.6, 0)"><use xlink:href="#MJX-12225-TEX-I-1D434"></use></g><g data-mml-node="mo" transform="translate(4016.8, 0)"><use xlink:href="#MJX-12225-TEX-N-22C5"></use></g><g data-mml-node="mi" transform="translate(4517, 0)"><use xlink:href="#MJX-12225-TEX-I-1D465"></use></g><g data-mml-node="mo" transform="translate(5089, 0)"><use xlink:href="#MJX-12225-TEX-N-28"></use></g><g data-mml-node="mi" transform="translate(5478, 0)"><use xlink:href="#MJX-12225-TEX-I-1D461"></use></g><g data-mml-node="mo" transform="translate(5839, 0)"><use xlink:href="#MJX-12225-TEX-N-29"></use></g></g></g></svg></mjx-container> mit: <mjx-container class="MathJax" jax="SVG" display="true" justify="left"><svg alt="
A=\left(\begin{array}{ll}
6 & -17 \\
8 & -6
\end{array}\right)
" style="vertical-align: -2.149ex" xmlns="http://www.w3.org/2000/svg" width="15.461ex" height="5.43ex" role="img" focusable="false" viewBox="0 -1450 6833.6 2400" xmlns:xlink="http://www.w3.org/1999/xlink"><defs><path id="MJX-12226-TEX-I-1D434" d="M208 74Q208 50 254 46Q272 46 272 35Q272 34 270 22Q267 8 264 4T251 0Q249 0 239 0T205 1T141 2Q70 2 50 0H42Q35 7 35 11Q37 38 48 46H62Q132 49 164 96Q170 102 345 401T523 704Q530 716 547 716H555H572Q578 707 578 706L606 383Q634 60 636 57Q641 46 701 46Q726 46 726 36Q726 34 723 22Q720 7 718 4T704 0Q701 0 690 0T651 1T578 2Q484 2 455 0H443Q437 6 437 9T439 27Q443 40 445 43L449 46H469Q523 49 533 63L521 213H283L249 155Q208 86 208 74ZM516 260Q516 271 504 416T490 562L463 519Q447 492 400 412L310 260L413 259Q516 259 516 260Z"></path><path id="MJX-12226-TEX-N-3D" d="M56 347Q56 360 70 367H707Q722 359 722 347Q722 336 708 328L390 327H72Q56 332 56 347ZM56 153Q56 168 72 173H708Q722 163 722 153Q722 140 707 133H70Q56 140 56 153Z"></path><path id="MJX-12226-TEX-S3-28" 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Bestimme die Lösungsgesamtheit (Fundamentalsystem) des DGL-Systems.

Dies ist eine interaktive Aufgabe zu: DGL Systeme mit praktischen Tipps zum Lösen und einer Zusammenfassung der nötigen Theorie

Lineare DGL - DGL Systeme | Aufgabe mit Lösung

<h2 class="content_sub_heading">Determinate einer 3x3 Matrix über Sarrus</h2>
<ol>
<li>Schreibe die ersten beiden Spalten der Matrix noch einmal rechts neben die Matrix. 
\begin{align*}
\\
\quad A:=\left(\begin{array}{lll}
a &amp; b &amp; c \\
d &amp; e &amp; f \\
g &amp; h &amp; i
\end{array}\right)
\Rightarrow
\begin{array}{|lll|ll}
\color{#5FAFD2}{a} &amp;\color{#AAC869}{ b} &amp;\color{#DC6955}{c} &amp;a&amp;b\\
d &amp;\color{#5FAFD2}{ e} &amp;\color{#AAC869}{ f} &amp;\color{#DC6955}{d}&amp;e\\
g &amp; h &amp; \color{#5FAFD2}{i}&amp;\color{#AAC869}{g}&amp;\color{#DC6955}{h}
\end{array} \qquad \qquad
\begin{array}{|lll|ll}
a &amp;b &amp;\color{#5FAFD2}{c} &amp; \color{#AAC869}{a}&amp;\color{#DC6955}{b}\\
d &amp;\color{#5FAFD2}{e} &amp;\color{#AAC869}{f} &amp;\color{#DC6955}{d}&amp;e\\
\color{#5FAFD2}{g} &amp; \color{#AAC869}{h} &amp; \color{#DC6955}{i}&amp;g&amp;h
\end{array}
\end{align*} 
</li>
<li>
Addiere die Produkte der entstandenen drei Diagonalen von links oben nach rechts unten und subtrahiere dann die Produkte der Diagonalen von rechts oben nach links unten:
\begin{align*}
\quad \Rightarrow\det(A) =\color{#5FAFD2}{a e i} \ \color{#000}{+} \ \color{#AAC869}{b f g} \ \color{#000}{+} \ \color{#DC6955}{c d h} \ \color{#000}{-} \ \color{#DC6955}{b d i} \ \color{#000}{-} \ \color{#AAC869}{a f h} \ \color{#000}{-} \ \color{#5FAFD2}{c e g}
\end{align*}
</li>
</ol>

<h2 class="content_heading">Gewöhnliche DGL Lösungsansätze Übersicht</h2>
Separierbare DGL 1. Ordnung 
Form: $y^{\prime}=f(x) \cdot g(y)$
Lösung mithilfe Trennung der Variablen:
$$\int \frac{1}{g(y)} d y=\int f(x) d x$$
 
Durch Substitution lösbare DGL Form: $\mathrm{y}^{\prime}=\mathrm{f}(\mathrm{ax}+\mathrm{by}+\mathrm{c})$ mit $b \neq 0$ Lösung durch Substitution und Trennung der Variablen:
Substituiere: $u=a x+b y+c$, somit ist $y^{\prime}=f(u)$ Dann ist $u^{\prime}=\frac{d u}{d x}=a+b \frac{d y}{d x}=1 \cdot(a+b \cdot f(u))$ Durch Trennung der Variablen erhältst du die Lösung von $u(x)$. Die Rücksubstitution liefert dir dann $y(x)$
 
<h2 class="content_heading">Lineare DGLs</h2>
Die allgemeine Lösung einer inhomogenen linearen DGL setzt sich aus  1. der allgemeinen Lösung $\mathrm{y}_{\mathrm{h}}(\mathrm{x})$ der zugehörigen homogenen DGL 2. der partikulären Lösung $\mathrm{y}_{\mathrm{p}}(\mathrm{x})$ der inhomogenen DGL zusammen:  $\mathrm{y}(\mathrm{x})=\mathrm{y}_{\mathrm{h}}(\mathrm{x})+\mathrm{y}_{\mathrm{p}}(\mathrm{x})$
 
Homogene lineare DGL 1. Ordnung Form: $\mathrm{y}^{\prime}+\mathrm{f}(\mathrm{x}) \cdot \mathrm{y}=0$ Die allgemeine Lösung lautet:
$\mathrm{y}(\mathrm{x})=\mathrm{C} \cdot \mathrm{e}^{-\mathrm{F}(\mathrm{x})}$, wobei $\mathrm{F}(\mathrm{x})=\int \mathrm{f}(\mathrm{x}) \mathrm{d} \mathrm{x}$ und $\mathrm{C} \in \mathrm{R}$.
 
Inhomogene lineare DGL 1. Ordnung Form: $\mathrm{y}^{\prime}+\mathrm{a}(\mathrm{x}) \cdot \mathrm{y}=\mathrm{b}(\mathrm{x})$ Lösung durch Variation der Konstanten:
$\mathrm{y}(\mathrm{x})=\mathrm{c}(\mathrm{x}) \cdot \mathrm{e}^{-\mathrm{A}(\mathrm{x})}$, wobei $c(x)=\int b(x) \cdot e^{+A(x)} d x$ und $\mathrm{A}(\mathrm{x})=\int \mathrm{a}(\mathrm{x}) \mathrm{d} \mathrm{x}$
 
Inhomogene lineare DGL 1. Ordnung mit konstanten Koeffizienten Form: $y^{\prime}+a_{0} y=g(x)$, wobei $a_{0}=konstant$ Allgemeine Lösung der homogenen DGL:
$\mathrm{y}_{\mathrm{h}}(\mathrm{x})=\mathrm{C} \cdot \mathrm{e}^{-\mathrm{a}_{0} \mathrm{x}}$
 
Partikuläre Lösung der inhomogenen DGL: 
<ol>
<li>Wenn $g(x)$ von der Form: $b_{0}+b_{1} x+b_{2} x^{2}+\ldots+b_{n} x^{n}$ Ansatz: $\mathbf{y}_{\mathbf{p}}(\mathbf{x})= c_{o}+c_{1} x+c_{2} x^{2}+\ldots+c_{n} x^{n}$ </li>
<li>Wenn $g(x)$ von der Form: $b \cdot e^{\alpha x}$ und $\alpha \neq-\mathrm{a}_{\mathrm{o}}$ Ansatz: $\mathbf{y}_{\mathbf{p}}(\mathbf{x})=c \cdot e^{\alpha x}$ </li>
<li>Wenn $g(x)$ von der Form: $b \cdot e^{\alpha x}$ und $\alpha=-a_{0}$ Ansatz: $\mathbf{y}_{\mathbf{p}}(\mathbf{x})=c \cdot x \cdot e^{\alpha x}$ </li>
<li>Wenn $g(x)$ von der Form: $b_{1} \cdot \sin (\beta x)+b_{2} \cdot \cos (\beta x)$ Ansatz: $\mathbf{y}_{\mathbf{p}}(\mathbf{x})= c_{1} \cdot \sin (\beta x)+c_{2} \cdot \cos (\beta x)$</li>
</ol>
Die allgemeine Lösung ist dann: $\mathrm{y}(\mathrm{x})=\mathrm{y}_{\mathrm{h}}(\mathrm{x})+\mathrm{y}_{\mathrm{p}}(\mathrm{x})$

<h2 class="content_sub_heading">Typen von DGLs</h2>
Triviale Differentialgleichung $$y^{(n)}=f(x)$$ Getrennte Variablen $$y^{\prime}=f(x) \cdot g(y)$$ Linear 1. Ordnung $$y^{\prime}+a(x) \cdot y=b(x)$$ Euler-homogen $$y^{\prime}=f\left(\frac{y}{x}\right)$$ Lineare Transformation $$y^{\prime}=f(a x+b y+c)$$ Gebrochen rationale Transformation $$y^{\prime}=f\left(\frac{a x+b y+c}{d x+e y+f}\right)$$ Linear höherer Ordnung mit konstanten Koeffizienten $$y^{(n)}+a_{n-1} y^{(n-1)}+\ldots+a_{1} y^{\prime}+a_{0} y=b(x)$$ Bernoulli $$y^{\prime}+g(x) \cdot y+h(x) \cdot y^{\alpha}=0$$ Ricatti $$y^{\prime}+g(x) \cdot y+h(x) \cdot y^{2}=k(x)$$

<h2 class="content_sub_heading">Kategorien von DGLs</h2>
gewöhnliche DGL: nur Ableitungen von einer Variablen
Beispiel: $y(x) = 4y^{\prime}(x) + y^{\prime \prime}(x)$
 
partielle DGL: mehrere Variablen mit partiellen Ableitungen
Beispiel: $y(x,t) = 4 \frac{\partial^2{y}}{\partial{t^2}} + 3 \frac{\partial{y}}{\partial{x}}$
 
Ordnung: Anzahl der höchsten Ableitung
Beispiel: $y = 4y^{\prime} + y^{\prime \prime}$ (diese DGL ist 2. Ordnung).
 
lineare DGL: nur Linearkombinationen der Funktion und ihrer Ableitungen
Beispiel: $y = 4x^2y^{\prime} + 3xy^{\prime \prime}$
 
nicht-lineare DGL: gesuchte Funktion hat Potenzen oder ist in anderen Funktionen verkettet
Beispiel: $y^{\prime} = sin(y)$
 
homogene DGL: es gibt keinen Term ohne $y$ (die gesuchte Funktion oder ihre Ableitungen)
Beispiel: $y + 2y^{\prime} + 3xy^{\prime \prime} = 0$
 
inhomogene DGL: es gibt Störfunktion (Term ohne $y$)
Beispiel: $y + 2y^{\prime} + 3xy^{\prime \prime} = 2x^2$
 
explizite DGL: höchste Ableitung steht alleine auf einer Seite. (Falls nicht, implizite DGL).

<h2 class="content_sub_heading">Differentialgleichung</h2>
Eine Differentialgleichung (DGL) ist eine Gleichung, die eine Funktion und ihre Ableitungen enthält. Die Lösung einer DGL ist also eine differenzierbare Funktion, die diese Gleichung erfüllt.

DGL Systeme sind auch zum Lösen von Differentialgleichungen $n$-ter Ordnung sehr nützlich, weil sich jede Differentialgleichung höherer Ordnung auf ein DGL System zurückführen lässt. Das funktioniert ganz einfach folgendermaßen: 
Wenn du eine DGL höherer Ordnung gegeben hast, sieht das so aus: \[x^{(n)}=f\left(t, x, x^{\prime}, \ldots, x^{(n-1)}\right)\] 
Das kannst du in die oben eingeführte Form eines DGL Systems bringen, indem du schreibst: 
\[x \rightarrow x_1\] \[x^{\prime} \rightarrow x_2\] \[x^{\prime \prime} \rightarrow x_3\] usw.

DGL Systeme sind auch zum Lösen von Differentialgleichungen <mjx-container class="MathJax" jax="SVG"><svg alt="n" style="vertical-align: -0.025ex" xmlns="http://www.w3.org/2000/svg" width="1.357ex" height="1.025ex" role="img" focusable="false" viewBox="0 -442 600 453" xmlns:xlink="http://www.w3.org/1999/xlink"><defs><path id="MJX-1294-TEX-I-1D45B" d="M21 287Q22 293 24 303T36 341T56 388T89 425T135 442Q171 442 195 424T225 390T231 369Q231 367 232 367L243 378Q304 442 382 442Q436 442 469 415T503 336T465 179T427 52Q427 26 444 26Q450 26 453 27Q482 32 505 65T540 145Q542 153 560 153Q580 153 580 145Q580 144 576 130Q568 101 554 73T508 17T439 -10Q392 -10 371 17T350 73Q350 92 386 193T423 345Q423 404 379 404H374Q288 404 229 303L222 291L189 157Q156 26 151 16Q138 -11 108 -11Q95 -11 87 -5T76 7T74 17Q74 30 112 180T152 343Q153 348 153 366Q153 405 129 405Q91 405 66 305Q60 285 60 284Q58 278 41 278H27Q21 284 21 287Z"></path></defs><g stroke="currentColor" fill="currentColor" stroke-width="0" transform="scale(1,-1)"><g data-mml-node="math"><g data-mml-node="mi"><use data-c="1D45B" xlink:href="#MJX-1294-TEX-I-1D45B"></use></g></g></g></svg></mjx-container>-ter Ordnung sehr nützlich, weil sich jede Differentialgleichung höherer Ordnung auf ein DGL System zurückführen lässt. Das funktioniert ganz einfach folgendermaßen: 
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xlink:href="#MJX-1295-TEX-N-2C"></use></g><g data-mml-node="msup" transform="translate(2419.3,0)"><g data-mml-node="mi"><use data-c="1D465" xlink:href="#MJX-1295-TEX-I-1D465"></use></g><g data-mml-node="TeXAtom" transform="translate(605,413) scale(0.707)" data-mjx-texclass="ORD"><g data-mml-node="mi"><use data-c="2032" xlink:href="#MJX-1295-TEX-V-2032"></use></g></g></g><g data-mml-node="mo" transform="translate(3268.8,0)"><use data-c="2C" xlink:href="#MJX-1295-TEX-N-2C"></use></g><g data-mml-node="mo" transform="translate(3713.5,0)"><use data-c="2026" xlink:href="#MJX-1295-TEX-N-2026"></use></g><g data-mml-node="mo" transform="translate(5052.1,0)"><use data-c="2C" xlink:href="#MJX-1295-TEX-N-2C"></use></g><g data-mml-node="msup" transform="translate(5496.8,0)"><g data-mml-node="mi"><use data-c="1D465" xlink:href="#MJX-1295-TEX-I-1D465"></use></g><g data-mml-node="TeXAtom" transform="translate(605,413) scale(0.707)" data-mjx-texclass="ORD"><g data-mml-node="mo"><use data-c="28" xlink:href="#MJX-1295-TEX-N-28"></use></g><g data-mml-node="mi" transform="translate(389,0)"><use data-c="1D45B" xlink:href="#MJX-1295-TEX-I-1D45B"></use></g><g data-mml-node="mo" transform="translate(989,0)"><use data-c="2212" xlink:href="#MJX-1295-TEX-N-2212"></use></g><g data-mml-node="mn" transform="translate(1767,0)"><use data-c="31" xlink:href="#MJX-1295-TEX-N-31"></use></g><g data-mml-node="mo" transform="translate(2267,0)"><use data-c="29" xlink:href="#MJX-1295-TEX-N-29"></use></g></g></g><g data-mml-node="mo" transform="translate(8029.9,0) translate(0 -0.5)"><use data-c="29" xlink:href="#MJX-1295-TEX-LO-29"></use></g></g></g></g></svg></mjx-container> 
Das kannst du in die oben eingeführte Form eines DGL Systems bringen, indem du schreibst: 
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data-mml-node="msub" transform="translate(2127.6,0)"><g data-mml-node="mi"><use data-c="1D465" xlink:href="#MJX-1296-TEX-I-1D465"></use></g><g data-mml-node="mn" transform="translate(605,-150) scale(0.707)"><use data-c="31" xlink:href="#MJX-1296-TEX-N-31"></use></g></g></g></g></svg></mjx-container> <mjx-container class="MathJax" jax="SVG" display="true" justify="left"><svg alt="x^{\prime} \rightarrow x_2" style="vertical-align: -0.339ex" xmlns="http://www.w3.org/2000/svg" width="7.723ex" height="2.17ex" role="img" focusable="false" viewBox="0 -809 3413.6 959" xmlns:xlink="http://www.w3.org/1999/xlink"><defs><path id="MJX-1297-TEX-I-1D465" d="M52 289Q59 331 106 386T222 442Q257 442 286 424T329 379Q371 442 430 442Q467 442 494 420T522 361Q522 332 508 314T481 292T458 288Q439 288 427 299T415 328Q415 374 465 391Q454 404 425 404Q412 404 406 402Q368 386 350 336Q290 115 290 78Q290 50 306 38T341 26Q378 26 414 59T463 140Q466 150 469 151T485 153H489Q504 153 504 145Q504 144 502 134Q486 77 440 33T333 -11Q263 -11 227 52Q186 -10 133 -10H127Q78 -10 57 16T35 71Q35 103 54 123T99 143Q142 143 142 101Q142 81 130 66T107 46T94 41L91 40Q91 39 97 36T113 29T132 26Q168 26 194 71Q203 87 217 139T245 247T261 313Q266 340 266 352Q266 380 251 392T217 404Q177 404 142 372T93 290Q91 281 88 280T72 278H58Q52 284 52 289Z"></path><path id="MJX-1297-TEX-V-2032" d="M79 43Q73 43 52 49T30 61Q30 68 85 293T146 528Q161 560 198 560Q218 560 240 545T262 501Q262 496 260 486Q259 479 173 263T84 45T79 43Z"></path><path id="MJX-1297-TEX-N-2192" d="M56 237T56 250T70 270H835Q719 357 692 493Q692 494 692 496T691 499Q691 511 708 511H711Q720 511 723 510T729 506T732 497T735 481T743 456Q765 389 816 336T935 261Q944 258 944 250Q944 244 939 241T915 231T877 212Q836 186 806 152T761 85T740 35T732 4Q730 -6 727 -8T711 -11Q691 -11 691 0Q691 7 696 25Q728 151 835 230H70Q56 237 56 250Z"></path><path id="MJX-1297-TEX-N-32" d="M109 429Q82 429 66 447T50 491Q50 562 103 614T235 666Q326 666 387 610T449 465Q449 422 429 383T381 315T301 241Q265 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<h2 class="content_sub_heading">Fundamentalsystem eines homogenen DGL Systems 1. Ordnung finden</h2>
Gegeben sei ein DGL System mit diagonalisierbarer Matrix $A \in \mathbb{R}^{n \times n}$ in der Form \[x^{\prime}=A(t) x\]
 
<ol>
<li>Bestimme die Eigenwerte $\lambda_i$ der Matrix $A$ und ihre zugehörigen Eigenvektoren $\boldsymbol v_i$.  </li>
<li>Setze die Eigenwerte und deren zugehörige Eigenvektoren in die Form \[x_i (t) = c_i \cdot e^{\lambda_i t} \cdot \boldsymbol v_i \] mit $c_i \in \mathbb{C}$ ein, wodurch du ein Fundamentalsystem (also Vektoren, die eine Basis bilden) erhältst. </li>
</ol>

<h2 class="content_sub_heading">DGL Systeme</h2>
Ein DGL System ist ein System aus mehreren Differentialgleichungen, die man allgemein nicht einzeln lösen kann. DGL Systeme haben die folgende Form:
 
\[\begin{aligned} x_{1}^{\prime} &amp;=a_{11}(t) x_{1}+\cdots+a_{1 n}(t) x_{n}+b_{1}(t) \\ &amp; \vdots \\ x_{n}^{\prime} &amp;=a_{n 1}(t) x_{1}+\cdots+a_{n n}(t) x_{n}+b_{n}(t) \end{aligned}\]

<h2 class="content_sub_heading">DGL Systeme</h2>
Ein DGL System ist ein System aus mehreren Differentialgleichungen, die man allgemein nicht einzeln lösen kann. DGL Systeme haben die folgende Form:
 
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x_{1}^{\prime} &=a_{11}(t) x_{1}+\cdots+a_{1 n}(t) x_{n}+b_{1}(t) \\
& \vdots \\
x_{n}^{\prime} &=a_{n 1}(t) x_{1}+\cdots+a_{n n}(t) x_{n}+b_{n}(t)
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Aufgabenstellung:

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Lösung: