1.1 Square Root of a Complex Number Let’s assume . Squarring both sides of the equation and comparing real and imaginary parts we have – (1) – (2) We also know . That implies . And thus finally taking the positive square root we arrive at: – (3). Comparing (1) & (3), we have & . Thus, depending… Continue reading
Tag: JEE Mains
Week -1 | Complex Numbers – 2
1.1 Locus of a Complex Number In general, locus of a complex number defines the path that the complex number can travel under certain constraints. Mathematically, it is the set of all points on the Argand Plane (also called the Gaussian Plane) that satisfy a given mathematical relationship. For example, let’s consider a simple equation… Continue reading
Week – 1 | Complex Numbers – 1
1.1 Introduction A Complex Number is represented by a combination of 2 real values – across a 2D plane. The 2 axes form the ‘Real’ and ‘Imaginary’ axes, that are used to uniquely identify a Complex Number on the Complex plane – also called the Argand Plane. Thus an algebraic representation of is given by… Continue reading