Find the e.m.f. (in V) ε1 and ε2 in the circuit as shown in the figure. Also find the potential
difference (in V) of point 'a' relative to point 'b'. ε1 = ε2 = Va−Vb =
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Solution
Let Vb and Va be the potentials at point b and a respectively.
On Applying Kirchhoff's current rule at junction a, we can say 1A+ current in arm ab=2A ⟹ current in arm ab=1A
Mark points (c,d,e,f) on the circuit and apply Kirchhoff's voltage rule in loop (abcd)
⟹1×4+1×1−ϵ1−6×1+20−1×1=0 ⟹4+1−ϵ1−6+20−1=0 ⟹ϵ1=18V
Now apply Kirchhoff's voltage law in loop abfe ⟹−2×1−ϵ2−2×2+ϵ1−1×1−1×4=0 ⟹−2−ϵ2−4+18−1−4=0 ⟹ϵ2=7V
On further applying Kirchhoff's voltage rule in arm ab,we get Vb+18−1×1−4×1=Va ⟹Va−Vb=13V