254 COMPLEX NUMBERSMultiplying equation (1) by 2 gives:2 x+ 2 y= 4 (3)Adding equations (2) and (3) gives:−x=7, i.e.,x=− 7From equation (1), y= 9 , which may be
checked in equation (2).Now try the following exercise.Exercise 102 Further problems on complex
equationsIn Problems 1 to 4 solve the complex equations.- (2+j)(3−j2)=a+jb [a=8,b=−1]
2.2 +j
1 −j=j(x+jy)[
x=3
2,y=−1
2]- (2−j3)=
√
(a+jb)[a=−5,b=−12]- (x−j 2 y)−(y−jx)= 2 +j [x=3,y=1]
- If Z=R+jωL+ 1 /jωC, express Z in
(a+jb) form whenR=10,L=5,C= 0. 04
andω=4. [Z= 10 +j 13 .75]
23.6 The polar form of a complex
number
(i) Let a complex numberzbex+jyas shown
in the Argand diagram of Fig. 23.4. Let dis-
tanceOZberand the angleOZmakes with the
positive real axis beθ.From trigonometry, x=rcosθandy=rsinθHence Z=x+jy =rcosθ+jrsinθ=r(cosθ+jsinθ)Z=r(cosθ+jsinθ) is usually abbreviated to
Z=r∠θwhich is known as thepolar formof
a complex number.
(ii)ris called themodulus(or magnitude) ofZand
is written as modZor|Z|.
ris determined using Pythagoras’ theorem on
triangleOAZin Fig. 23.4,Zr jyθ
O
xA Real axisImaginary
axisFigure 23.4i.e. r=√
(x^2 +y^2 )(iii)θis called theargument(or amplitude) ofZ
and is written as argZ.By trigonometry on triangleOAZ,argZ= θ=tan−^1y
x(iv) Whenever changing from cartesian form to
polar form, or vice-versa, a sketch is invalu-
able for determining the quadrant in which the
complex number occurs.Problem 9. Determine the modulus and argu-
ment of the complex numberZ= 2 +j3, and
expressZin polar form.Z= 2 +j3 lies in the first quadrant as shown in
Fig. 23.5.r0 2 Real axisj 3Imaginary
axisθFigure 23.5