Exam-Style Questions on Complex Numbers

1.	IB Analysis and Approaches

Consider \( w = a - bi \) where \( |w| = 1 \)

Show that \( \text{Re} \left( \frac{w + i}{w - i} \right) \) is always equal to 0.

Worked Solution

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2.	IB Analysis and Approaches

A complex number, \(c\), has a real part \(1\) and an imaginary part \( -\sqrt{3} \).

(a) Show that \(c = 2e^{i\frac{5 \pi}{3}}\).

(b) Find the smallest positive integer \(n\) such that \( c^n\) is a real number.

(c) Find the value of \(c^n\) when \(n\) takes the value found in part (b).

Consider the equation \(z^3-9z^2+18z-28=0\), where \(z \in \mathbb{C} \).

(d) Given that \(c\) is a root of \(z^3-9z^2+18z-28=0\), find the other roots.

(e) By using a suitable transformation from \(z\) to \(w\), or otherwise, find the roots of the equation \(1-9w+18w^2-28w^3=0\), where \(w \in \mathbb{C} \).

Consider the equation \(z^2 = 2z^*\) , where \(z \in \mathbb{C}, z \neq 0 \).

(f) By expressing \(z\) in the form \(a + bi\), find the roots of the equation.

Worked Solution

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3.	IB Analysis and Approaches

Consider the complex numbers \(z_1 = c + 3i\) and \(z_2 = c^2-2-ci\)

(a) Find an expression for \(z_1z_2 \) in terms of \(c\).

(b) Hence, given that arg(\(z_1z_2 \)) = \( \tan^{-1} 2 \) show that:

$$c^3 - c^2 + c + 3 = 0 $$

Worked Solution

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