Solve each equation over the set of complex numbers, find the magnitudes of the solutions and draw them in the complex plane.

Bevan Mcdonald

Bevan Mcdonald

Answered question

2021-09-05

Solve each equation over the set of complex numbers, find the magnitudes of the solutions and draw them in the complex plane. Hint: For some of the equations , to get n roots you must use a3+b3=(a+b)(a2ab+b2) and a3b3=(ab)(a2+ab+b2)
x3+1=0

Answer & Explanation

liannemdh

liannemdh

Skilled2021-09-06Added 106 answers

Step 1
Ans. we have given equation
x3+1=0
As a3+63=(a+6)(a2a6+62)
x3+13=(x+1)(x2x+1)
(x+1)(x2x+1)=0
Case(i) x+1=0 x=1
Case(ii) x2x+1=0
If ax2+6x+c=0
Then roots, x1,2=6±624ac2a
x1,2=(1)±14(1)(1)2x1
x1,2=1±32
x1,2=1±3i2(Asi=1)
x1=1+3i2
x2=13i2
Step 2
So x=x1,x2
x=1+3i2,13i2
So solutions are x=1,1+3i2,13i2
Magnitude = (12)2+(32)2=14+34=44=1
(As (a+6i) gives magnitude a2+62)
  magnitude of solutions is   1
Jeffrey Jordon

Jeffrey Jordon

Expert2022-01-14Added 2605 answers

Answer is given below (on video)

Jeffrey Jordon

Jeffrey Jordon

Expert2022-08-23Added 2605 answers

Answer is given below (on video)

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