Toronto Math Forum

MAT334-2018F => MAT334--Tests => Quiz-1 => Topic started by: Victor Ivrii on September 28, 2018, 04:13:59 PM

Title: Q1: TUT 0203
Post by: Victor Ivrii on September 28, 2018, 04:13:59 PM
$\renewcommand{\Re}{\operatorname{Re}}
\renewcommand{\Im}{\operatorname{Im}}$
Write (in complex number notation) the equation of the the circle through $0$, $2+2i$, and $2 - 2i$.
Title: Re: Q1: TUT 0203
Post by: Ge Shi on September 28, 2018, 05:11:53 PM
Since the circle through 0, 2+2i, 2-2i,
It means that the circle through (0,0), (2,2) and (2,-2)
thus, the equation of this circle in complex form is  |z-2|=2
Title: Re: Q1: TUT 0203
Post by: Vedant Shah on September 28, 2018, 06:03:17 PM
This is the circle centered at $z_0=2$ with radius 2.
In other words, it is the set of points 2 units away from $z_0 = 2$. The distance of a given point, $z$, from $z_0$ is:
$d=|z-z_0|$
Thus the equation of this circle is:
$|z-2| = 2$