Complex Numbers Part 2

Section: Mathematics

Question : 57 of 97

Marks: +1, -0

Let C be the circle in the complex plane with centre z0=‌

(1+3i) and radius r=1. Let z1=1+i and the complex number z2 be outside the circle C such that |z1−z0|z2−z0|=1. If z0⋅z1 and z2 are collinear, then the smaller value of |z2|2 is equal to

[12-Apr-2023 shift 1]

‌
7
2
‌
13
2
‌
5
2
‌
3
2

Validate

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