Unterschied Zwischen James Lange Theorie Und Cannon Bard Theorie

The James‐Lange theory of emotion: A critical examination. And an alternative theory. American Journal of Psychology, 39, 106‐124. 7. Alternative Theorie von Cannon und Bard • Die Auslösung emotionaler Reaktionen beruht auf zentralnervösen Prozessen in emotionsspezifischen Hirnregionen • Emotionale Reize lösen gleichzeitig physiologische Reaktionen und subjektives Gefühlserleben.

Great one! and by no means do i understand this completely, but what i gathered was that the lazarus theory is similar slightly to cannon bard and the singer one, in the sense that once an event occurs, we will label everything opposite to singer, since the labelling took place after the physiological response and then after labelling we will simultaneously do physiological response and.</plaintext> Parallel zu James entwickelte der Däne Carl Lange eine ähnliche Theorie. Der einzige wichtige Unterschied: Lange geht davon aus, daß vasomotorische Reaktionen also Erweiterung und Verengung der Blutgefäße und die damit einhergehende unterschiedliche Versorgung der Organe mit Blut für die Emotionsentstehung verantwortlich sind, während. Theorie von James-Lange The James-Lange theory proposes that an event or stimulus causes a physiological arousal without any interpretation or conscious thought, and you experience the resulting emotion only after you interpret the physical response. The Cannon-Bard theory, on the other hand, suggests that the given stimulus evokes both a. Cannon und Bard 1927, 1928 - Thalamustheorie - Theorie der zentralen neuralen Prozesse. Der Physiologe Walter Cannon 1927 lehnte die peripheralistische Theorie ab und sprach sich für eine zentralistische Sicht der Vorgänge im Zentralnervensystem aus. Er erhob vier Einwände gegen die James-Lange-Theorie. Cannon emphasized that the viscera had been separated from the central nervous system with no impact on emotional behavior in experiments on animals. He said this contradicted the James–Lange theory because James believed that the viscera were the center of emotion.<img 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alt="Unterschied Zwischen James Lange Theorie Und Cannon Bard Theorie" title="Unterschied Zwischen James Lange Theorie Und Cannon Bard Theorie" width="416"/> James-Lange-Theorie. Die James-Lange-Theorie besagt, dass das Erleben einer Situation und die daraus resultierenden physischen Veränderungen eine Emotion auslösen. Diese Theorie ist etwa auf akute Gefahrensituationen gut anwendbar. Hierbei wird einem häufig erst im weiteren Verlauf etwa durch das Wahrnehmen des schnellen Herzschlages bewusst. • James-Lange-Theorie und die Kritik von Cannon • Zwei-Faktoren-Theorie von Schacter und Singer. Wie erklären kognitive Bewertungstheorien die Unterschiede zwischen diskreten Emotionen? 26. Diskrete Emotionen als Ergebnis spezifischer Muster kognitiver Einschätzungen Diskrete Emotionen werden als Resultat spezifischer Einschätzungsmuster betrachtet • z.B. Furcht = Person meint. 3.1 James-Lange-Theorie 3.2 Cannon-Bard-Theorie 3.3 Kognitive Bewertungstheorie nach Lazarus 3.4 Zwei Faktoren Theorie nach Schachter. Literaturverzeichnis. Abbildungsverzeichnis. Abbildung 1 Kognitive Bewertungstheorie Lazarus. Abbildung 2 Emotionstheorien im Vergleich. 1. Motiv und Motivation. Im Alltag gehen wir verschiedenen Tätigkeiten nach, so entschließen wir uns zum Beispiel. De theorie van James-Lange is in 1920 door Walter Cannon en Philip Bard bestreden. Kernpunt van hun theorie de theorie van Cannon-Bard was dat de emotionele prikkel bijvoorbeeld het zien van een slang eerst in de hersenen wordt verwerkt, en pas daarna een gelijktijdige reactie in de vorm van een emotionele ervaring bijvoorbeeld vrees en. The theory was developed in 1927 by Walter B. Cannon and his graduate student, Philip Bard. It was established as an alternative to the James-Lange theory of emotion. 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