Pure 4
Pure 5
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AS/A2 Pure 4 Pure 5 |
| P6 Topic 1: Complex numbers | |
| Circle region 1: |z| £ a |   |
| The locus of z when
|z| £ a, where a is
a fixed constant. If the complex number z=x+iy is represented on an Argand diagram by the vector going from the origin to the point P with coordinates (x,y), then the equation |z| £ a requires the distance of P from the origin, ie., the vector OP, to be of length at most a units. So the locus is the inside of the circle, centre the origin, with radius a units. In the diagram below you can vary the value of a and the position of P. Clearly, P must lie within the circle shown. |
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