E = ic sq, solve for c
if e=1/1! + 1/2! + 1/3! ...
and i = the sqrt(-1)
then C = -(-1)^(3/4) sqrt(e)
or (-1)^(3/4) sqrt(e)
both being complex numbers
Online, c^2 = c squared
Do you mean E = i * c^2 or E = (ic)^2?
If the former, divide both sides by i and get the square root of both sides.
If the latter, E = i^2 * c^2. Divide both sides by i^2 and get the square root of both sides.
To solve for c in the equation E = ic², we need to isolate c on one side of the equation.
Step 1: Start with the equation E = ic².
Step 2: Divide both sides of the equation by i to isolate c².
E/i = ic² / i
E/i = c²
Step 3: Take the square root of both sides to solve for c.
√(E/i) = √(c²)
√(E/i) = c
So the solution for c is c = √(E/i).