Q-1) Show that Solution: Q-2) If , then find the value of the following series: Solution: Substituting in the equation we have We must remember that to represent a Complex Number in polar form, we take out the modulus from the algebraic form. On those lines we can say Thus the equation boils down… Continue reading
Tag: CMI
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