d. Mat-Mecánica Renca Circuito en serie 2  

Dado el siguiente circuito en serie:

 

 

a) Calcula la resistencia equivalente del circuito.

b) Calcula la intensidad I de la corriente que atraviesa el circuito.

c) Calcula la diferencia de potencial en los extremos del generador.

d) Calcula la diferencia de potencial en extremos de cada una de las resistencias y el valor de la intensidad que las atraviesa. 

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 1 .3333333 0 0 - <question><correctAnswers><correctAnswer>-</correctAnswer></correctAnswers></question>