1º BACHILLERATO/QUÍMICA/ESTADOS DE LA MATERIA/CAMBIOS DE ESTADO
¡Cómo se llama el cambio de estado que se representa en cada tramo horizontal?
¡Cómo se llama el cambio de estado que se representa en cada tramo horizontal?
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
1.0000000
0.1000000
0
true
true
abc
condensación y fusión]]>
solidificación y fusión]]>
fusión y vaporización]]>
fusión y sublimación]]>
Diagrama de Fase
Para el diagrama de fases del agua mostrado en la figura, indica cuáles de las siguientes afirmaciones son correctas:
]]>
1.0000000
0.1000000
0
false
true
abc
A 100 ºC sólo puede haber agua líquida y gaseosa
A 0 ºC puede haber agua en los tres estados
a 0.003 atm no puede haber agua líquida
La presión no tiene nada que ver con el estado del agua
A 0.006 atm y 0.01 ºC están los tres estados a la vez
Diagrama de fase carbón
El diagrama de fases que se indica es el del carbono. Indica en qué forma se encontrará sí:
]]>
1.0000000
0.3333333
0
true
Respuesta correcta]]>
Respuesta parcialmente correcta.]]>
Respuesta incorrecta.]]>
Su temperatura es #t1 K y la presión es de #p1 Kbares]]>
Diamante
Su temperatura es #t2 K y la presión es de #p2 Kbares]]>
Líquido
Su temperatura es #t3 K y la presión es de #p3 Kbares]]>
grafito
Su temperatura es #t4 K y la presión es de #p4 Kbares]]>
Líquido
Su temperatura es #t5 K y la presión es de #p5 Kbares]]>
Carbono II
Su temperatura es #t6 K y la presión es de #p6 Kbares]]>
Vapor
<question><wirisCasSession><![CDATA[<session lang="es" version="2.0"><library closed="false"><mtext style="color:#ffc800" xml:lang="es">variables</mtext><group><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>t1</mi><mo>=</mo><mi>aleatorio</mi><mo>(</mo><mn>2000</mn><mo>,</mo><mn>3000</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>p1</mi><mo>=</mo><mi>aleatorio</mi><mo>(</mo><mn>200</mn><mo>,</mo><mn>300</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>t2</mi><mo>=</mo><mi>aleatorio</mi><mo>(</mo><mn>2500</mn><mo>,</mo><mn>3000</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>p2</mi><mo>=</mo><mi>aleatorio</mi><mo>(</mo><mn>550</mn><mo>,</mo><mn>650</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>t3</mi><mo>=</mo><mi>aleatorio</mi><mo>(</mo><mn>3500</mn><mo>,</mo><mn>4000</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>p3</mi><mo>=</mo><mi>aleatorio</mi><mo>(</mo><mn>0</mn><mo>,</mo><mn>100</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>t4</mi><mo>=</mo><mi>aleatorio</mi><mo>(</mo><mn>3500</mn><mo>,</mo><mn>5000</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>p4</mi><mo>=</mo><mi>aleatorio</mi><mo>(</mo><mn>450</mn><mo>,</mo><mn>600</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>t5</mi><mo>=</mo><mi>aleatorio</mi><mo>(</mo><mn>0</mn><mo>,</mo><mn>2000</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>p5</mi><mo>=</mo><mi>aleatorio</mi><mo>(</mo><mn>650</mn><mo>,</mo><mn>700</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>t6</mi><mo>=</mo><mi>aleatorio</mi><mo>(</mo><mn>4500</mn><mo>,</mo><mn>5000</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>p6</mi><mo>=</mo><mi>aleatorio</mi><mo>(</mo><mn>0</mn><mo>,</mo><mn>30</mn><mo>)</mo></math></input></command></group></library><group><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"/></input></command></group></session>]]></wirisCasSession><options><option name="precision">4</option><option name="implicit_times_operator">false</option><option name="times_operator">·</option><option name="imaginary_unit">i</option></options><localData><data name="casSession"/></localData></question>
Dilatación y estado
Para que un cuerpo dilate al aumentar su temperatura]]>
1.0000000
0.1000000
0
true
true
abc
Debe ser sólido, los líquidos y gases no dilatan
No puede ser líquido, los líquidos no dilatan
Los cuerpos dilatan en todos los estados de la materia
Su cambio de temperatura debe ser mayor que 20ºC
Ninguna de las otras respuestas es correcta
El paso de sólido a gas
El paso de sólido a gas se llama]]>
1.0000000
0.1000000
0
true
true
abc
Sublimación
Evaporación
Fluidificación
Concatenación
Ninguno de los otros nombres
Estados de la materia
Los estados de la materia son (marca las opciones correctas):]]>
1.0000000
0.1000000
0
false
true
abc
Sólido
Líquido
Gaseoso
Plasma
Bose-Einstein
Born-Openheiner
Estelar
Vacío
Bose-plasmatico
Indica el orden de los estados de la materia
Indica el orden de los estados de la materia de menor a mayor temperatura
1.0000000
0.1000000
0
true
Bose-Einstein
1
Sólido
2
Líquido
3
Gas
4
Plasma
5
La siguiente gráfica representa el enfriamiento de un gas. ¿Cuánto vale la temperatura de condensación?
La siguiente gráfica representa el enfriamiento de un gas. ¿Cuánto vale la temperatura de condensación?
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100 ºC]]>
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La siguiente gráfica representa el enfriamiento de un gas. ¿Cuánto vale la temperatura de condensación?
La siguiente gráfica representa el enfriamiento de un gas. ¿Cuánto vale la temperatura de solidificación?
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1.0000000
0.1000000
0
true
true
abc
-15 ºC]]>
75ºc]]>
100 ºC]]>
0 ºC]]>
Mientras que un cuerpo está cambiando de estado
Mientras que un cuerpo está cambiando de estado..]]>
1.0000000
0.1000000
0
true
true
abc
Su temperatura no cambia
Su volumen no cambia
su estructura interna no cambia
Cambia todo
No hay ningún tipo de cambio interno
Nombra los cambios de estado
Nombra los cambios de estado
1.0000000
0.1000000
0
true
De sólido a gas
Sublimación
De sólido a líquido
Fusión
De líquido a sólido
Solidificación
De líquido a gas
Vaporización
De gas a líquido
Condensación
Enfriamiento
Calcificación
Crionización
Temperatura y cambio de estado
¿Es posible hervir agua a 20ºC? ¿cómo lo harías?]]>
1.0000000
0.5000000
0
true
true
abc
Si. Disminuyendo la presión
No. Es imposible
Si. Aumentando la presión