Construction of Segment on Given Circle Admitting Given Angle

Construction

 * Euclid-III-34.png

Let $ABC$ be the given circle, and let $D$ be the given rectilineal angle.

Let $EF$ be drawn tangent to $ABC$ at $B$.

Let $\angle FBC$ be constructed equal to $\angle D$.

Then $BC$ is a straight line which forms the base of a segment which admits an angle equal to $D$.

Proof
Let $A$ be selected anywhere on the circle opposite the segment in question.

From the Tangent-Chord Theorem, $\angle BAC = \angle FBC$.

But $\angle FBC = \angle D$.

Hence the result.