Imaginay Nos (2 Viewers)

Lukybear · Jan 21, 2010

Question on Complex Nos.

$(x+iy)^{1/3} = X + iY$

Show that

$4(X^2-Y^2) = \frac{x}{X} + \frac{y}{Y}$

Lukybear · Jan 21, 2010

Also

Find x in the domain 0<x<pi/2

$\frac{\sqrt{2}(cosx-isinx)}{{2+i}} = \frac{1-3i}{5}$

ninetypercent · Jan 21, 2010

cube both sides

(x+iy) = X^3 + 3X^2(iY) + 3X(iy)^2 + (iy)^3 = X^3 + 3X^2iY - 3XY^2 -iY^3

equating real and imaginary parts

$x = X^3 - 3XY^2$
$y = 3X^2Y - Y^3$

$RHS = x/X + y/Y$
$=\frac{X^3 - 3XY^2}{X}+\frac{3X^2Y - Y^3}{Y}\\ = \frac{X^3Y - 3XY^3 + 3X^3Y - XY^3}{XY}\\ = \frac{XY(X^2 - 3Y^2 + 3X^2 - Y^2)}{XY}\\ = X^2 - 3Y^2 + 3X^2 - Y^2\\ = (X^2 - Y^2)+3(X^2 -Y^2)\\ = 4(X^2-Y^2)\\ = LHS$

Cazic · Jan 21, 2010

Lukybear said:
Also

Find x in the domain 0<x>

$\frac{\sqrt{2}(cosx-isinx)}{{2+i}} = \frac{1-3i}{5}$

I can't make sense of the question, but if it's just asking you solve for x then we have:

$\begin{align*}\frac{\sqrt{2}(\cos(x)-i\sin(x))}{{2+i}} = \frac{1-3i}{5} &\Leftrightarrow \cos(-x)+i\sin(-x)) = \frac{1}{\sqrt{2}} - \frac{i}{\sqrt{2}} \\ &\Leftrightarrow x = \frac{\pi}{4} + 2k\pi, \ k \in \mathbb{Z}.\end{align*}$

Lukybear · Jan 21, 2010

What about

Divide
x^3-2-2i by x+1-i

gurmies · Jan 22, 2010

Sorry, that was meant to be:

$\text{Let} \,\, x^{3}-2-2i=\left [ x-\left ( -1+i \right ) \right ]\left ( ax^{2}+bx+c \right ) \\\\ \text{By equating coefficients,} \,\, a=1 \\\\ 1-i+b=0\Rightarrow b=-1+i \\\\ c\left (1-i \right )=-2-2i \\\\ c=\frac{-2-2i}{1-i}\Rightarrow c=\frac{2\sqrt{2}cis\left ( -\frac{3\pi}{4} \right )}{\sqrt{2}cis\left ( -\frac{\pi}{4} \right )}\Rightarrow -2i \\\\ \therefore \text{The quotient is} \,\, x^{2}+\left ( -1+i \right )x-2i$

Lukybear · Jan 23, 2010

Thxs Gurmies, much appreciated.

Ive got more tho.

$\text{If } (x+iy)^{n} = a + ib\\ \text{Find } a^2+b^2$

untouchablecuz · Jan 23, 2010

ninetypercent said:
cube both sides

(x+iy) = X^3 + 3X^2(iY) + 3X(iy)^2 + (iy)^3 = X^3 + 3X^2iY - 3XY^2 -iY^3

equating real and imaginary parts

$x = X^3 - 3XY^2$
$y = 3X^2Y - Y^3$

$RHS = x/X + y/Y$
$=\frac{X^3 - 3XY^2}{X}+\frac{3X^2Y - Y^3}{Y}\\ = \frac{X^3Y - 3XY^3 + 3X^3Y - XY^3}{XY}\\ = \frac{XY(X^2 - 3Y^2 + 3X^2 - Y^2)}{XY}\\ = X^2 - 3Y^2 + 3X^2 - Y^2\\ = (X^2 - Y^2)+3(X^2 -Y^2)\\ = 4(X^2-Y^2)\\ = LHS$

$\\|a+ib|=\sqrt{a^2+b^2}\\$But $ a+ib=(x+iy)^n\\\therefore |(x+iy)^n|=\sqrt{a^2+b^2}\\a^2+b^2=|(x+iy)^n|^2=|x+iy|^{2n}=(x^2+y^2)^{2n}\\\\$For the first question, $\\x+iy=(X+iY)^3=X^3 + 3X^2iY - 3XY^2 -iY^3\\$Equating $\Re (z) $ and $ \Im (z),\\x = X^3 - 3XY^2 \ (*)$ and $y = 3X^2Y - Y^3 \ (**)\\ \Rightarrow \frac{(*)}{X}+\frac{(**)}{Y}\\$i.e. $\frac{x}{X}+\frac{y}{Y}=X^2-3Y^2+3X^2-Y^2=4(X^2-Y^2)$

(this method is abit quicker, good work either way 90%)

Lukybear · Jan 24, 2010

I dont get this question at all.

Prove that if the ratio $\frac{z-1}{z-i} \\$ is purely imaginary, the point z lies on the circle whose centre is at the point 1/2(1+i) and whose radius is 1/sqrt 2

Shouldnt it it mean the ratio $\frac{z-1}{z-i} \\$ = Z (upper case) (since z-1/z-i is a complex no.), and that the point Z lies on the circle...

Because if it is the lower case z, then rearranging the ratio would be necessary, unless im wrong?

Lukybear · Jan 24, 2010

Also this question has me stunned.

Two points, P, Q represent the complex no.s z, 2z+3+i respectively, where P moves on the circle |z|=k how does Q move?

khorne · Jan 24, 2010

Not 100% this is right, but:

let p be a point on the circle |z|=k.

Mod. p = k
Arg p = @

2z + 3+i = 2z + (3+i)

so in a sense you are multiplying z by 2 and adding 3+i

Since the argument of 2z and z are the same, |2z| = 2k

I.e 2z would just move as a circle with twice the radius.

3+i however, moves the circle down ,i and to the left, 3, so the origin is at (-3,-i) and its radius is 2k.

untouchablecuz · Jan 24, 2010

Lukybear said:
I dont get this question at all.

Prove that if the ratio $\frac{z-1}{z-i} \\$ is purely imaginary, the point z lies on the circle whose centre is at the point 1/2(1+i) and whose radius is 1/sqrt 2

Shouldnt it it mean the ratio $\frac{z-1}{z-i} \\$ = Z (upper case) (since z-1/z-i is a complex no.), and that the point Z lies on the circle...

Because if it is the lower case z, then rearranging the ratio would be necessary, unless im wrong?

$\\$If the ratio $\frac{z-1}{z-i} $ is imaginary, then $ \arg(\frac{z-1}{z-i})=\pm \frac{\pi}{2}$

im sure you can find the equation of the locus of $z$ now

(which is indeed a circle)

cyl123 · Jan 24, 2010

Close but not quite.... cos adding 3+i onto the vector 2z should move it upwards by i and right by 3, so logically the centre of the circle should shift by the same amount

Or convert into parametrics question:
Let P=z=x+iy so x^2+y^2=k^2 (x,y,X,Y are real)

Let Q=X+iY such that Q=2z+3+i
So equating gives X=2x+3, Y=2y+1
So 2x=X-3 , 2y=Y-1
So since 4x^2+4y^2=4k^2
then (X-3)^2+(Y-1)^2=4k^2
where coordinates of Q is (X,Y) and Q moves in a circle with centre (3,1) and radius 2k

khorne said:
Not 100% this is right, but:

let p be a point on the circle |z|=k.

Mod. p = k
Arg p = @

2z + 3+i = 2z + (3+i)

so in a sense you are multiplying z by 2 and adding 3+i

Since the argument of 2z and z are the same, |2z| = 2k

I.e 2z would just move as a circle with twice the radius.

3+i however, moves the circle down ,i and to the left, 3, so the origin is at (-3,-i) and its radius is 2k.

khorne · Jan 24, 2010

my bad, I forgot I was working with vectors still

Lukybear · Jan 25, 2010

More to go:

$w=\frac{z+2i}{2iz-1}$ , show that when z describes the circle |z| = 1, completely in one direction, then w describes the circle |w|=1 competely in the other direction.

Lukybear · Jan 25, 2010

Just on this one, when using parametrics, as so stated, did anyone get two varaible for one value? If then, how do you solve, since i havent done parametrics yet.

Trebla · Jan 25, 2010

Lukybear said:
More to go:

$w=\frac{z+2i}{2iz-1}$ , show that when z describes the circle |z| = 1, completely in one direction, then w describes the circle |w|=1 competely in the other direction.

Not sure about the "other direction" part:

$\left | z \right |=1 \Rightarrow x^2+y^2=1\quad($for $z=x+iy)\\\\\left | w \right |^2=\dfrac{x^2+(y+2)^2}{(-2y-1)^2+4x^2}\\\\=\dfrac{x^2+y^2+4y+4}{4(x^2+y^2)+4y+1}\\\\=\dfrac{4y+5}{4y+5}\\\\= 1\\\\\therefore \left | w \right | = 1$

Trebla · Jan 25, 2010

Lukybear · Jan 25, 2010

Trebla said:
$$Using parametrics let $ z = x+iy $ so $ \left | z \right |=1 \Rightarrow x^2+y^2=1\quad\\\\w=\dfrac{z+2i}{2iz-1}\\\\=\dfrac{(x+i(y+2))((-2y-1)-2ix)}{(2y+1)^2+4x^2}\\\\=-\dfrac{-3x+i(2x^2+2y^2+5y+2)}{4(x^2+y^2)+4y+1}\\\\=\dfrac{3x-i(4+5y)}{4y+5}\\\\$Let $w=X+iY $ now equate real and imaginary parts$\\\\X = \dfrac{3x}{4y+5}\quad Y=-\dfrac{(4+5y)}{4y+5}\\\\$Consider $\\\\X^2+Y^2=\dfrac{9x^2+25y^2+40y+16}{16y^2+40y+25}\\\\=\dfrac{9(x^2+y^2)+16y^2+40y+16}{16y^2+40y+25}\\\\=\dfrac{16y^2+40y+25}{16y^2+40y+25}\\\\=1\\\\\therefore \left | w \right |=1$

I do observe my mistake Trebla. I do very indeed thank you, for being such a good person, helping me on a monday morning.

cutemouse · Jan 25, 2010

gurmies said:
Sorry, that was meant to be:

$\text{Let} \,\, x^{3}-2-2i=\left [ x-\left ( -1+i \right ) \right ]\left ( ax^{2}+bx+c \right ) \\\\ \text{By equating coefficients,} \,\, a=1 \\\\ 1-i+b=0\Rightarrow b=-1+i \\\\ c\left (1-i \right )=-2-2i \\\\ c=\frac{-2-2i}{1-i}\Rightarrow c=\frac{2\sqrt{2}cis\left ( -\frac{3\pi}{4} \right )}{\sqrt{2}cis\left ( -\frac{\pi}{4} \right )}\Rightarrow -2i \\\\ \therefore \text{The quotient is} \,\, x^{2}+\left ( -1+i \right )x-2i$

Or you could use long division...

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