2º BACHILLERATO/06 EQUILIBRIOS REDOX Pilas Con la siguiente relación de potenciales normales de reducción. Indica si las siguientes pilas funcionarán, no lo harán o están mal escritas

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 1.0000000 0.3333333 0 true Respuesta correcta

]]> Respuesta parcialmente correcta.

]]> Respuesta incorrecta.

]]> Ca / Ca⁺² (1M) / / Pb⁺² (1M) / Pb

]]> Correcta Cu / Cu⁺² (1M) / / Pb⁺² (1M) / Pb

]]> Incorrecta Hg ⁺²  / Hg (1M) / / Pb⁺² (1M) / Pb

]]> Incorrecta Ag⁺ /  Ag (1M) / /Pb⁺² (1M) / Pb

]]> Incorrecta H₂ / 2H⁺ (1M) / /Ni⁺² (1M) / Ni

]]> Incorrecta Al / Al⁺³ (1M) / /Ag⁺ (1M) / Ag

]]> Correcta