howto:hambasics:sections:test
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howto:hambasics:sections:test [2021/02/13 19:02] – va7fi | howto:hambasics:sections:test [2021/02/13 19:04] – va7fi | ||
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... we can also represent a complex number graphically on a complex plane by using the horizontal axis for the real part and the vertical axis for the imaginary part. For example, \$ (1 + i) \$ would be represented as a point 45° up the horizontal axis and \$ \sqrt{2} \$ away from the origin: | ... we can also represent a complex number graphically on a complex plane by using the horizontal axis for the real part and the vertical axis for the imaginary part. For example, \$ (1 + i) \$ would be represented as a point 45° up the horizontal axis and \$ \sqrt{2} \$ away from the origin: | ||
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- | {{ggb>/ | ||
<WRAP center round info 80%> | <WRAP center round info 80%> | ||
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</ | </ | ||
+ | {{ggb>/ | ||
To convert between the Cartesian \$(a,b) \$ and the Polar \$ (r \angle \theta) \$ representations, | To convert between the Cartesian \$(a,b) \$ and the Polar \$ (r \angle \theta) \$ representations, | ||
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* Take that length and lay it down on the perimeter of the circle. | * Take that length and lay it down on the perimeter of the circle. | ||
* The angle that this length covers is 1 radian (because of the length of the radius on the circle). | * The angle that this length covers is 1 radian (because of the length of the radius on the circle). | ||
- | * That's why a circle has 2π (because the circumference is 2πr) | + | * That's why a circle has 2π radians |
==== Roots ==== | ==== Roots ==== |
howto/hambasics/sections/test.txt · Last modified: 2021/02/13 19:14 by va7fi