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CHAPTER 46 DE MOIVRE’S THEOREM
EXERCISE 192 Page 522
1. Determine in polar form: (a) [1.5∠15°]5 (b) (1 + j2)6
(a) 5 5 = 7.594∠75°
1.5∠15° =1.5 5∠×15 °
[ ]
(b) 1 + j2 =
5∠°63.435
Hence, (1 + j2)6 = 66 = 125∠20.61°
5∠63.435° =5 6∠63.435× 125°=380.61∠ °
( ) ( )
2. Determine in polar and Cartesian forms: (a) [3∠41°]4 (b) (–2 – j) 5
(a) 4 4 = 81∠164° = 8 cos 164° + j8 sin 164° = –77.86 + j22.33
3∠41° =3 ∠×4 41 °
[ ]
5 5 5
(b)
(−2−j) =5 153.435∠− ° =5 5 153.435∠ ×− °
( )
= 55.90∠–767.175° = 55.90∠–47.18°
= 55.90 cos – 47.18° + j55.90 sin –47.18°
= 38 – j41
3. Convert (3 – j) into polar form and hence evaluate (3 – j)7 , giving the answer in polar form.
1
22 −1
+∠ −
(3 – j) = 3 1 tan = 10∠−18.43°
3
7 7 7
Hence, = 3162∠–129°
(3−j) =10 18.43∠− ° 10=7 18.43∠ ×− °
( )
4. Express in both polar and rectangular forms: (6 + j5)3
3 3 3
(6+j5) =61 39.806∠ ° 61=3 39.806∠× °
( )
= 476.4∠119.42°
779 © 2014, John Bird
= 476.4 cos 119.42° + j476.4 sin 119.42°
= –234 + j415
5. Express in both polar and rectangular forms: (3 – j8)5
5 5 5
= 45530∠–347.22° = 45 530∠12.78°
(3−j8) =73 69.444∠− ° 73=5 69.444∠ ×− °
( )
= 45 530 cos 12.78° + j45 530 sin 12.78°
= 44 400 + j10 070
4
6. Express in both polar and rectangular forms: (–2 + j7)
7
22 −1
=tan 74.054= °
From the diagram below, r = 2 +=7 53 and α
2
and θ =180 74.054°− 105.945° = °
4 4 4
Hence,
(−2+j7) =53 105.945∠ ° =53 4 105.945∠× °
( )
= =
2809∠°423.78 2809∠°63.78
2809∠63.78 =2809cos63.78°+ j2809sin63.78°
( )
= 1241+ j2520
7. Express in both polar and rectangular forms: (–16 – j9)6
9
From the diagram below, r = 22 and −1
16 +9 = 337 α =tan 29.358= °
16
and θ =180 29.358°+ 209.358° = °
6 6 6
Hence,
(−16−j9) =337 209.358∠ °337=6 209.358∠× °
( )
780 © 2014, John Bird
= 6 = 6
(38.27×∠10 ) 176.15°
38.27×∠10 1256.148°
66
(38.27×10 )∠176°9'=10 38.27cos176.15°+j38.27sin176.15°
( )
= 106(−38.18+j2.570)
781 © 2014, John Bird
EXERCISE 193 Page 524
1. Determine the two square roots of the given complex numbers in Cartesian form and show the
results on an Argand diagram: (a) 1 + j (b) j
1
2
(a)
1+j =2 45∠°=2 45∠°
1 1
The first root is: ( 2)2 ∠ ×45°=1.1892 22.5∠(1.099°=j0.455) +
2
and the second root is: 1.1892∠(22.5°+180°) =( −1.099 −j0.455)
Hence, as shown in the Argand diagram below.
(1+=j)±(1.099+j0.455)
1
(b) 2
jj=0+= 1∠°90 =1∠°90
[ ] [ ]
1 1
The first root is: 1 2 ∠ ×90°=1 ∠45 °=(0.707 +j0.707)
( ) 2
and the second root is: 1∠(45°+180°) =( −0.707 −j0.707)
Hence, as shown in the Argand diagram below.
±+jj= (0.707 0.707)
2. Determine the two square roots of the given complex numbers in Cartesian form and show the
results on an Argand diagram: (a) 3 – j4 (b) –1 – j2
782 © 2014, John Bird
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