Chapter 2 - Fundamentals of Electric Circuits - Part 1 Circuits - Homework Problems - Page 52: 2.22

Final Answer Element A delivers power Element B delivers power Element C absorbs power Element D absorbs power Element E absorbs power

Part a) - Assuming the correct directions/polarities, power is being absorbed if the current enters (heads toward) the positive pole of the voltage - Assuming the correct direction/polarities, power is being delivered if the current exits (heads outwards) the positive pole of the voltage (note: by right direction/polarities we mean the the current/voltage has a positive sign; not the negative sign current) - Or, another way to think of this is if the product of the voltage and current (the power) is positive, power is being delivered; otherwise, it is being absorbed For element A: assume $V_A$ with its positive pole heading up. Apply KVL $-V_A-3+10+5=0$ $V_A=-3+10+5=12\ V$ Now assume a current $I_A$ that enters the positive pole of $V_A$. First, find the $I_A$ current by applying KCL $i_A+3+2=0$ $I_A=-3-2=-5\ A$ Since $I_A$ is negative sign, it means the direction is opposite. Therefore, correct assumption is letting $I_A$ exist the positive pole of $V_A$. Therefore, element A delivers power If we find the power across element A $P_A=-I_A\times V_A=-(-5)\times 12 = 60\ W$ for element B: since we know that $I_A$'s correct direction is heading outwards from the positive pole of the $3\ V$, element B delivers power if we calculate the power $P_B=-5\times 3=15\ W$ for element C: Again. $I_A$'s correct direction is heading toward the positive pole of the $5\ V$. Therefore, power is absorbed $P_C=5\times 5=-25\ W$ for element D: element D is in parallel with element E; therefore, they have same voltage (you can check by applying KVL} $V_D=10\ V$ ($V_D$ polarity matches that of element E) current $3A$ enters the positive pole of voltage $V_D$' thus, the power is being absorbed $P_D=-3\times 10=-30\ W$ element E: current $2A$ heads towards the positive pole of the $10V$ voltage; thus, it absorbs power $P_E=-2\times 10=-20\ W$ Part b) Yes, the conservation of power is satisfied. We can prove this by the power $$\Sigma P_{delivered} +\Sigma P_{absorbed}=0$$ $$\Sigma P_{delivered} =-\Sigma P_{absorbed}$$ $$P_A+P_B=-(P_C+P_D+P_E)$$ $$60+15=-(-25-30-20)$$ $$-75=-75$$ since left-hand side and right-hand side are equal, conservation is satisfied.