2022-06-16, 13:17
Buon giorno a tutti voi. Sono sempre alle preso con il bilancio di reazioni redox. Pur con qualche fatica e con il vostro aiuto ne vengo fuori.
Nel guardare un esercizio redox proposto in rete mi sono imbattuto nel concetto di carica formale e numero di ossidazione. Io so facilmente calcolare il numero di ossidazione applicando le usuali regole ma mi trovo in difficoltà quando parlano di carica formale su un atomo perchè se ho capito bene la carica formale serve a stabilire quale formula di Lewis coinvolta in un processo di risonanza è quella che "descrive" meglio la molecola pur contribuendo, in una qualche misura, anche tutte le altre forme di risonanza, mentre non serve per calcolare i numeri di ossidazione e bilanciare le redox. E' giusto o ho capito male.
L'esempio riportato nell'esercizio è:
[img]data:image/png;base64,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[/img]
e fra tutte queste formule di struttura la migliore che descrive il diazometano è la D dove le cariche positive e negative sono portate dall'atomo meno elettronegativo e da quello più elettronegativo.
Con le solite regole dei numeri di ossidazione medi io ricaverei H = + 1, C = +4, N = -3.
Grazie in anticipo per chi vorrà aiutarmi ad uscire dal pantano in cui mi sono ficcato.
P.S. In anteprima vedo un macello sopra la domanda e non capisco cosa fare. Chiedo scusa ancora perchè devo essere un gran pasticcione col computer
Nel guardare un esercizio redox proposto in rete mi sono imbattuto nel concetto di carica formale e numero di ossidazione. Io so facilmente calcolare il numero di ossidazione applicando le usuali regole ma mi trovo in difficoltà quando parlano di carica formale su un atomo perchè se ho capito bene la carica formale serve a stabilire quale formula di Lewis coinvolta in un processo di risonanza è quella che "descrive" meglio la molecola pur contribuendo, in una qualche misura, anche tutte le altre forme di risonanza, mentre non serve per calcolare i numeri di ossidazione e bilanciare le redox. E' giusto o ho capito male.
L'esempio riportato nell'esercizio è:
[img]data:image/png;base64,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[/img]
e fra tutte queste formule di struttura la migliore che descrive il diazometano è la D dove le cariche positive e negative sono portate dall'atomo meno elettronegativo e da quello più elettronegativo.
Con le solite regole dei numeri di ossidazione medi io ricaverei H = + 1, C = +4, N = -3.
Grazie in anticipo per chi vorrà aiutarmi ad uscire dal pantano in cui mi sono ficcato.
P.S. In anteprima vedo un macello sopra la domanda e non capisco cosa fare. Chiedo scusa ancora perchè devo essere un gran pasticcione col computer
![[-]](https://www.myttex.net/forum/images/collapse.png)
