How to Easily Solve This Geometry Puzzle
<p>(If you’re confused, just note that the smaller circles both touch the larger cicle in exactly one point, touch each other in exactly one point, and touch the line <em>PQ</em> in exactly one point. This makes the 3 centers of the circles line up.)</p>
<p>Talwalkar goes on to (excellently) <a href="https://mindyourdecisions.com/blog/2023/03/13/shaded-area-between-circles-and-a-chord/#more-35162" rel="noopener ugc nofollow" target="_blank">solve</a> this puzzle, using <em>a</em> and <em>b</em> as radii of the smaller circles. But as it turns out, there’s a much easier way to do this.</p>
<p>The key is this: nothing forbids us from positioning <em>PQ</em> on the diameter of the big circle. That would make the diameter of the big circle <em>6</em>. Furthermore, it means the smaller circles are equal in size (with diameter <em>3</em>):</p>
<p><a href="https://medium.com/street-science/how-to-easily-solve-this-geometry-puzzle-a856c038a72b"><strong>Click Here</strong></a></p>