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Isomeria ISOMERIA PLANA ISOMERIAESPACIAL ISOMERIA DE CADEIA é observada quando os compostos de mesma fórmula molecular se diferem apenas no tipo de cadeia carbônica (cadeias abertas, fechadas, ramificadas, saturadas, insaturadas etc) ISOMERIA DE POSIÇÃO observamos que compostos de mesma fórmula molecular se diferem na posição de ramificações (grupos substituintes) ou das insaturações (ligações duplas ou triplas) ISOMERIA DE COMPENSAÇÃO é observada quando a diferença ocorre pela mudança na posição de heteroátomos ISOMERIA DE FUNÇÃO moléculas de mesma fórmula molecular se diferem quanto às funções orgânicas TAUTOMERIA Os isômeros coexistem em solução aquosa e diferem pela posição de um átomo de hidrogênio ISOMERIA GEOMÉTRICA Condições para essa iso geométrica em compostos de cadeia aberta 1.Dupla ligação entre os átomos de carbono 2.Ligantes diferentes entre si nos dois átomos de carbono da dupla Condições para essa iso geométrica em compostos de cadeia fechada 1. Em pelo menos dois átomos de carbono do ciclo devemos encontrar dois ligantes diferentes entre si Isomeros cis-trans 1. Eles diferem pela fórmula espacial ISOMERIA ÓPTICA Carbonos quirais são saturados, ou seja, fazem quatro ligações simples. Os quatro ligantes presentes neste carbono são diferentes entre si. 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