Tipos de Isomeria em Química

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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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