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Section 6.5 Complex Numbers in Polar Form
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Overview Recall that a complex number is written in the form a + bi, where a and b are real numbers and While it is not possible to graph complex numbers on a real number plane, a similar setup can be used.
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The Complex Plane
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Graph Each of the Following z = 3i z = -5 + 2i z = 3 – 4i
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Absolute value of a complex number The absolute value of a complex number z is the distance from the origin to the point z in the complex plane:
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Polar form of a complex number When a complex number is in a + bi form, it is said to be in rectangular form. Just as we superimposed the polar plane onto the rectangular coordinate plane, we can do the same thing with the complex plane.
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Continued r is called the modulus and “theta” is called the argument.
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Examples Graph each of the following, then write the complex number in polar form:
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Now, the Other Way Write each complex number in rectangular form:
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Products and Quotients Given, two complex numbers in polar form. Their product and quotient can be found by the following:
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In Other Words… When multiplying, multiply the moduli and add the arguments. When dividing, divide the moduli and subtract the arguments. Keep in mind that you may have to re- name your argument so that is an angle between 0 and 360° or 0 and 2π radians.
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Raising to a Power When raising a complex number to a power, use DeMoivre’s Theorem: In other words, raise the modulus to the nth power and multiply the argument by n (again, be prepared to rename your argument).
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A Final Word Before the Examples Pay particular attention to the form your final answer should take (complex polar or complex rectangular).
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Find the Product (Answer in Polar Form)
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Find the Quotient z 1 /z 2 (Answer in Polar Form)
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Use the French Guy’s Theorem (write answers in rectangular form)
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Finding Complex Roots Let w = r(cos θ + i sin θ) be a complex number in polar form. w has n distinct complex n th roots given by
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Examples Find all the complex cube roots of 8. Write your answers in rectangular form. Find all the complex fourth roots of 16(cos120° + I sin120°). Write your answers in polar form.
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