Table of Contents
How do you find the principal value of arg z?
The principal value is simply what we get when we adjust the argument, if necessary, to lie between -π and π. For example, z = 2e5 i/4 = 2e-3 i/4, subtracting 2π from the argument 5π/4, and the principal value of the argument of z is -3π/4.
What is the formula for arg Z1 z2?
If z2 = 0, then arg(z1/z2) = arg(z1) − arg(z2). If z = a + bi, the conjugate of z is defined as z = a − bi, and we have the following properties: |z| = |z|, arg z = − arg z, z1 + z2 = z1 + z2, z1 − z2 = z1 − z2, z1z2 = z1z2, Re z = (z + z)/2, Im z = (z − z)/2i, zz = |z|2.
What is the difference between Arg(z) and Arg(1/z)?
In the diagram, arg ( z) is about 65° while arg (1/ z) is about –65°. You can see in the diagram another point labelled with a bar over z. That is called the complex conjugate of z. It has the same real component x, but the imaginary component is negated.
How do you find the conjugate of Z?
Therefore, 1/ z is the conjugate of z divided by the square of its absolute value | z | 2 . In the figure, you can see that 1/| z | and the conjugate of z lie on the same ray from 0, but 1/| z | is only one-fourth the length of the conjugate of z (and | z | 2 is 4).
How do you find the conjugate of a reciprocal?
Complex conjugates give us another way to interpret reciprocals. You can easily check that a complex number z = x + yi times its conjugate x – yi is the square of its absolute value | z | 2. Therefore, 1/ z is the conjugate of z divided by the square of its absolute value | z | 2.
How do you find the conjugate of a complex number?
Complex conjugates give us another way to interpret reciprocals. You can easily check that a complex number z = x + yi times its conjugate x – yi is the square of its absolute value | z | 2 . Therefore, 1/ z is the conjugate of z divided by the square of its absolute value | z | 2 .