Respuesta :
Complex number x + iy's argument is z = 0.
What is an argument?
- There are two comparable definitions for an argument of the complex number z = x + iy, denoted arg(z): Geometrically and algebraically.
- Any complex number that is non-zero has a wide range of plausible arguments: First off, it is obvious that full circle rotations do not affect the angle's point in terms of geometry.
- Hence angles that differ by an integer multiple of 2 radians (a whole circle) are equal.
- Similar to the first definition, the second definition has this trait with the periodicity of sin and cos.
- Usually, the argument zero is left undefined.
Complex number x + iy's argument is
∅ = tan (y/x) inverse.
Z= -i-1/i = -i - (1*i)/(i *i)= is the complex number.
-i- i/(-1)= -i + I = 0.
z = 0.
Argument of zero is either undefinable or equal to any real number.
Learn more about argument here:
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