For the circle |z - (a+ib)| = r, what is the radius?

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Boost your skills in A Level Further Mathematics Core Pure. Study with flashcards and multiple choice questions, each question is followed by hints and explanations. Get prepared for your exam with confidence!

Multiple Choice

For the circle |z - (a+ib)| = r, what is the radius?

Explanation:
In the complex plane, a circle with center at c and radius R is described by the set of points z with |z − c| = R. Here the center is a + ib, so |z − (a + ib)| measures the distance from z to that center. Since all points on the circle are at this fixed distance R from the center, that fixed distance is the radius. Therefore, the radius is r. The values a and b only determine where the center sits; they don’t change the size of the circle. By contrast, sqrt(a^2 + b^2) would be the distance from the origin to the center, not the radius.

In the complex plane, a circle with center at c and radius R is described by the set of points z with |z − c| = R. Here the center is a + ib, so |z − (a + ib)| measures the distance from z to that center. Since all points on the circle are at this fixed distance R from the center, that fixed distance is the radius. Therefore, the radius is r. The values a and b only determine where the center sits; they don’t change the size of the circle. By contrast, sqrt(a^2 + b^2) would be the distance from the origin to the center, not the radius.

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