IMPEDANCE

Basic AC Reactive Components IMPEDANCE IMPEDANCE Whenever inductive and capacitive components are used in an AC circuit, the calculation of their effects on the flow of current is important. EO 1.9 DEFINE impedance (Z). EO 1.10 Given the values for resistance (R) and inductance (L) and a simple R-L series AC circuit, CALCULATE the impedance (Z) for that circuit. EO 1.11 Given the values for resistance (R) and capacitance (C) and a simple R-C series AC circuit, CALCULATE the impedance (Z) for that circuit. EO 1.12 Given a simple R-C-L series AC circuit and the values for resistance (R), inductive reactance (X_L), and capacitive reactance (X_C), CALCULATE the impedance (Z) for that circuit. EO 1.13 STATE the formula for calculating total current (I_T) in a simple parallel R-C-L AC circuit. EO 1.14 Given a simple R-C-L parallel AC circuit and the values for voltage (V_T), resistance (R), inductive reactance (X_L), and capacitive reactance (X_C), CALCULATE the impedance (Z) for that circuit. Impedance No circuit is without some resistance, whether desired or not. Resistive and reactive components in an AC circuit oppose current flow. The total opposition to current flow in a circuit depends on its resistance, its reactance, and the phase relationships between them. Impedance is defined as the total opposition to current flow in a circuit. Equation (8-6) is the mathematical representation for the magnitude of impedance in an AC circuit. (8-6) Z R² X² Rev. 0 Page 9 ES-08