## Square Root of Negative i (Polar Form)

The square root of negative i is equal to ±(1-i)/√2 where i=√-1 is an imaginary complex number. That is, √-i= ±(1-i)/√2. In this post, we will find the square root of -i. What is Square Root of Negative i Note that we can write -i as follows. $-i =\dfrac{1}{2} \cdot (-2i)$ Add 1 and subtract … Read more

## What is the Square Root of i [Polar Form]

Note that i=√-1 is an imaginary complex number. The square root of i is equal to ±(1+i)/√2. In this post, we will learn how to find the square root of i. What is the Square Root of i We have: $i =\dfrac{1}{2} \cdot 2i$ = $\dfrac{1}{2} (1+2i-1)$, adding 1 and subtracting 1 will change nothing. … Read more

## How to Multiply Complex Numbers with Examples

Complex numbers can be multiplied like real numbers, but the rule is a bit different. In this post, we will learn how to multiply complex numbers with an example. Note that a complex number can be represented by a+ib where a and b are real numbers and i=√-1 is an imaginary complex number. Method of … Read more