i. From the Euler Relatins, decude that e^(-3i frac(pi)(4))=-frac(sqrt2)(2)(1+i)

Wribreeminsl

Wribreeminsl

Answered question

2021-09-18

Question No.3, Part (A)
i. From the Euler Relatins, decude that e3iπ4=22(1+i)
ii. Find the cartesian form of the complex number , 2eiπ4
iii. Find polar and exponential forms of the complex number , 32+332i

Answer & Explanation

Faiza Fuller

Faiza Fuller

Skilled2021-09-19Added 108 answers

Step 1
Solution:
Given: e3iπ4
We know ei0=cos(θ)+isin(θ)
e3iπ4=cos(3π4)+isin(3π4)
=12+i(12)
=22(1+i)
e3iπ4=22(1+i)
Step 2
(ii) 2eiπ4=2(cos(π4)+isin(π4))
=2(12+i(12))
=1-i
2eiπ4=1i
(iii)x+iy=32+332i
x=32,y=332
r=x2+y2=94+274=364=62=3
θ=tan1(yx)=tan1(33232)=tan13=π3
Polar form z=r(cosθ+isinθ)=3(cos(π3)+isin(π3))
expenential form z=reiθ=3eiπ3
z=3eiπ3

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