Mind Blank with this Q PLs Help Appreciated Thanks (1 Viewer)

jimmysmith560

Le Phénix Trilingue
Moderator
Joined
Aug 22, 2019
Messages
4,548
Location
Krak des Chevaliers
Gender
Male
HSC
2019
Uni Grad
2022
You may wish to have a look at the following thread where this question was asked in order to gain insight into this question:


I hope this helps! :D
 

Modern4DaBois

Member
Joined
Oct 25, 2021
Messages
42
Gender
Male
HSC
2022
Ah ok. Conceptually that explanation makes sense. But how would you go about the working out? Are explanations enough, or do you have to set it up like a proper proof question?
 

jimmysmith560

Le Phénix Trilingue
Moderator
Joined
Aug 22, 2019
Messages
4,548
Location
Krak des Chevaliers
Gender
Male
HSC
2019
Uni Grad
2022
Perhaps you need to go beyond explanations, as seen in the following working:

Step 1:

Given the complex number z has modulus one, and 0 < Arg z < π/2.

So, we may take complex number z as

z = cost + i sint.

Then |z| = 1 and

Argz = tan^-1(sint/cost) [since, 0 < Argz < π/2]
= tan^-1(tant)
= t [since, 0 <Argz <π/2 (given)]

Step 2:

z = cost +i sint,

Therefore,

z +1 = 1 + cost + i sint
= 2cos²(t/2) + i 2sin(t/2) cos(t/2)

[Since, 1+cost= 2cos²(t/2), sint=2sin(t/2)cos(t/2)]

Arg(z+1) = tan^-1[{ 2sin(t/2)cos(t/2)}/{2cos2(t/2)}] [since, 0 < Argz < π/2 (given)]
= tan^-1{tan(t/2)}
= t/2 [since, 0 < Argz < π/2 (given)]

or, 2Arg(z+1) = t = Arg(z) (Proved)
 

yanujw

Well-Known Member
Joined
May 23, 2020
Messages
339
Gender
Male
HSC
2022
Alternatively, by a geometrical method;
1641216637255.png
This diagram illustrates the situation. Then you must prove the two angles in red are equal because the bottom angle in red is arg(z+1), and the two angles combined are arg(z), making Arg(z) = 2arg(z+1)

The lower red angle is equal to the green angle by alternate angles. Then, since |z| = 1, the triangle bounded by the points 0, z and z+1 is isosceles. The green angle is equal to the upper red angle.
 

Modern4DaBois

Member
Joined
Oct 25, 2021
Messages
42
Gender
Male
HSC
2022
Oh ok that makes sense as well. Thank you so much for your help m8! Really appreciate it
 

Users Who Are Viewing This Thread (Users: 0, Guests: 1)

Top