Assume that I = E/(R + r), prove that 1/1 = R/E + r/E

asked Mar 22, 2022 107k views

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$\implies {\blue {\boxed {\boxed {\purple {\sf { (1)/(I) = (R)/(E) + (r)/(E) }}}}}}$

$\large\mathfrak{{\pmb{\underline{\orange{Step-by-step\:explanation}}{\orange{:}}}}}$

$I = ( E)/( R + r) \\$

$➺\:(I)/(1) = (E)/(R + r) \\$

Since
(a)/(b) = (c)/(d) can be written as
ad = bc , we have

$➺ \: I \: (R + r) = E * 1$

$➺ \: (1)/(I) = (R + r)/(E) \\$

$➺ \: (1)/(I) = (R)/(E) + (r)/(E) \\$

$\boxed{ Hence\:proved. }$

$\red{\large\qquad \qquad \underline{ \pmb{{ \mathbb{ \maltese \: \: Mystique35ヅ}}}}}$

William Ross answered Mar 28, 2022

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