5 Must Know Facts For Your Next Test

1. The modulus provides the magnitude of a complex number and is always non-negative.
2. If $z = a + bi$, then the modulus $|z|$ is given by $\sqrt{a^2 + b^2}$.
3. The modulus is used when expressing complex numbers in polar form as $r(cos(\theta) + i\sin(\theta))$, where $r$ is the modulus.
4. In trigonometric applications, the modulus helps in converting between rectangular and polar coordinates.
5. The properties of moduli include: $|zw| = |z||w|$ and $|z/w| = |z|/|w|$ for any complex numbers z and w.

Review Questions

• What formula do you use to find the modulus of a complex number?
• How does the modulus relate to converting a complex number into polar form?
• What are some key properties of moduli that can simplify calculations?

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