92 Single-phase a.c. circuits
II
tO(a)ILI,
[RI(b)v (reference)Figure 4.29Dividing through by V we see that
1/Z = ~/[(1/R) 2 + (1/XL) 2] (4.28)
We have seen (Chapter 2) that the reciprocal of resistance (l/R) is called
conductance (G). The reciprocal of reactance (l/X) is called susceptance (B)
and the reciprocal of impedance (I/Z) is called admittance (Y), so that
Equation (4.28) may be rewritten as
Y = ~r 2 + BL 2) (4.29)
In complex form we have the following relationship:
I= IR -- jlL
so that
V/Z = V/R -jV/XL
Dividing throughout by V gives
1/Z = 1/R -jl/XL
and
Y = G -jBL (4.30)If we divide each phasor in Fig. 4.29(b) by V we obtain the admittance triangle
shown in Fig. 4.30.
GBLFigure 4.30Note that the phase angle r is given by tan -~ (BL/G) = tan
XL = wL, we have
4, = tan -1 (R/toL)-' (R/XL) and since(4.31)