Mi az a diszperziós kötés?

Ezek mellett a leggyengébb másodrendű kötés, könnyen felbomlik, a Van der Waals-féle kölcsönhatás egyik formája. A diszperziót a molekulák olyan elrendeződése követi, hogy a dipólusok ellentétes töltésükkel fordulnak egymás felé. Az így rendeződő dipólusok polarizáló hatásuk révén fokozzák egymás polaritását. A molekula méretének növekedésével a diszperziós kölcsönhatás egyre nagyobb felületen alakulhat ki, ezért a molekulák egyre nagyobb erővel kötődnek egymáshoz -> a bróm folyékony, a jód szilárd.

Forrás: Mozaik Kiadó - Kémia 9. - Általános kémia MS-2616

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