/ Cadena de Markov estable de dimensión 2. EL PROBLEMA DEL CLIMA CADENA DE MARKOV ESTABLE

PROBLEMA DEL CLIMA PARA DOS ESTADOS: SOLEADO Y NUBLADO

En un pueblo, el #p de los días soleados, le siguen días soleados y el #t de los días nublados le siguen días nublados. Con esta información, modelar el clima del pueblo como una cadena de Markov definiendo la matriz de transición.

El grafo asociado se puede generalizar de la forma:

Calcula la matriz de transición en el estado n=#n.

La matriz de transición es: M= #M.

La matriz de transición para la etapa #n-ésima es: «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«msup»«mi»M«/mi»«mrow»«mo»#«/mo»«mi»n«/mi»«/mrow»«/msup»«mo»=«/mo»«/math»{#1}

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xmlns="http://www.w3.org/1998/Math/MathML"><mi>A</mi><mo> </mo><mo>=</mo><mo> </mo><mfenced><mtable><mtr><mtd><mi>a</mi></mtd><mtd><mn>1</mn><mo>-</mo><mi>a</mi></mtd></mtr><mtr><mtd><mi>b</mi></mtd><mtd><mn>1</mn><mo>-</mo><mi>b</mi></mtd></mtr></mtable></mfenced></math></input></command><maction actiontype="comment"><comment><math xmlns="http://www.w3.org/1998/Math/MathML"><mo>-</mo><mo>-</mo><mo>-</mo><mo>-</mo><mo>-</mo><mo>-</mo><mo>-</mo><mo>-</mo><mo>-</mo><mo>-</mo><mo>-</mo><mo>-</mo><mo>-</mo><mo>-</mo><mo>-</mo><mo>-</mo><mo>-</mo><mo>-</mo><mo>-</mo><mo>-</mo><mo>-</mo><mo>-</mo><mo>-</mo><mo>-</mo><mo>-</mo><mo>-</mo><mo>-</mo><mo>-</mo><mo>-</mo><mo>-</mo><mo>-</mo><mo>-</mo><mo>-</mo><mo>-</mo><mo>-</mo><mo>-</mo></math></comment></maction><maction actiontype="comment"><comment><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>Pensando</mi><mo> </mo><mi>en</mi><mo> </mo><mi>los</mi><mo> </mo><mi>cálculos</mi><mo> </mo><mi>que</mi><mo> </mo><mi>deben</mi><mo> </mo><mi>hacer</mi><mo> </mo><mi>los</mi><mo> </mo><mi>alumnos</mi><mo>,</mo><mo> </mo><mi>quizá</mi></math></comment></maction><maction actiontype="comment"><comment><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>sería</mi><mo> </mo><mi>mejor</mi><mo> </mo><mi>que</mi><mo> </mo><mi>los</mi><mo> </mo><mi>elementos</mi><mo> </mo><mi>de</mi><mo> </mo><mi>la</mi><mo> </mo><mi>matriz</mi><mo> </mo><mi>fueran</mi><mo> </mo><mi>fracciones</mi><mo>.</mo><mo> </mo><mi>En</mi></math></comment></maction><maction actiontype="comment"><comment><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>tal</mi><mo> </mo><mi>caso</mi><mo>,</mo><mo> </mo><mi>el</mi><mo> </mo><mi>algoritmo</mi><mo> </mo><mi>sería</mi><mo>:</mo></math></comment></maction><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"/></input></command><maction actiontype="comment"><comment><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>Definimos</mi><mo> </mo><mi>una</mi><mo> </mo><mi>función</mi><mo> </mo><mi>que</mi><mo> </mo><mi>devuelve</mi><mo> </mo><mi>un</mi><mo> </mo><mi>entero</mi><mo> </mo><mi>en</mi><mo> </mo><mi>el</mi><mo> </mo><mi>intervalo</mi><mo> </mo><mo>[</mo><mn>1</mn><mo>,</mo><mn>50</mn><mo>]</mo></math></comment></maction><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>rint</mi><mo>(</mo><mo>)</mo><mo>:</mo><mo>=</mo><mi>random</mi><mo>(</mo><mn>1</mn><mo>,</mo><mn>50</mn><mo>)</mo></math></input></command><maction actiontype="comment"><comment><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>Creamos</mi><mo> </mo><mi>dos</mi><mo> </mo><mi>variables</mi><mo>,</mo><mo> </mo><mi>p</mi><mo> </mo><mi>y</mi><mo> </mo><mi>q</mi><mo>,</mo><mo> </mo><mi>que</mi><mo> </mo><mi>contienen</mi><mo> </mo><mi>un</mi><mo> </mo><mi>número</mi><mo> </mo><mi>aleatorio</mi><mo> </mo><mi>en</mi></math></comment></maction><maction actiontype="comment"><comment><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>el</mi><mo> </mo><mi>intervalo</mi><mo> </mo><mo>(</mo><mn>0</mn><mo>,</mo><mn>1</mn><mo>)</mo></math></comment></maction><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>pn</mi><mo> </mo><mo>=</mo><mo> </mo><mi>rint</mi><mo>(</mo><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>pd</mi><mo> </mo><mo>=</mo><mo> </mo><mi>random</mi><mo>(</mo><mi>pn</mi><mo>+</mo><mn>1</mn><mo>,</mo><mn>60</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>p</mi><mo> </mo><mo>=</mo><mo> </mo><mi>pn</mi><mo>/</mo><mi>pd</mi></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>qn</mi><mo> </mo><mo>=</mo><mo> </mo><mi>rint</mi><mo>(</mo><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>qd</mi><mo> </mo><mo>=</mo><mo> </mo><mi>random</mi><mo>(</mo><mi>qn</mi><mo>+</mo><mn>1</mn><mo>,</mo><mn>60</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>q</mi><mo> </mo><mo>=</mo><mo> </mo><mi>qn</mi><mo>/</mo><mi>qd</mi></math></input></command><maction actiontype="comment"><comment><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>Creamos</mi><mo> </mo><mi>la</mi><mo> </mo><mi>matriz</mi><mo> </mo><mi>de</mi><mo> </mo><mi>Markov</mi><mo> </mo><mi>asociada</mi></math></comment></maction><command><input><math 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name="syntax_expression"/><assertion name="equivalent_symbolic"/></assertions><options><option name="tolerance">10^(-3)</option><option name="relative_tolerance">true</option><option name="precision">4</option><option name="times_operator">·</option><option name="implicit_times_operator">false</option><option name="imaginary_unit">i</option><option name="answer_parameter">true</option></options><localData><data name="inputField">popupEditor</data><data name="casSession"></data></localData></question>