M2W3D10-y-part-1-why-cyclic.png

But, actually, the sneaky circle in the diagram is a decoy... Well, at first it is useful, because we can use it to prove that the quadrilateral has two pairs of equal sides. (This means that of its four sides, two are the same shorter length, and the other two are also a same, but longer, length. Take a look at the two triangles below: they each are right triangles with a shorter leg that is a radius and hypotenuses which are the dotted line. Since these are right triangles, by the Pythagorean Theorem, their long legs (the tangent segments to the circle) must be the same length.

M2W3D10-y-part-1-why-cyclic2.png

This shows that the quadrilateral has two same length purple sides and two same length green sides.

M2W3D10-y-part-1-why-cyclic3.png

Now, to show that it's cyclic, we have to ignore the grey circle for now. (I know it's there, but try to pretend it's not!) Instead, using the fact that we are given two opposite angles of \(140^{\circ}\) and \(40^{\circ},\) we know that these two angles add up to \(180^{\circ},\) which is half of a circle. They could both inscribe completely a circle, but a circle which is a different circle!

The yellow angle inscribes the yellow arc of the circle.

M2W3D10-y-part-1-why-cyclic4.png

And the green angle inscribes the green arc of the circle.

M2W3D10-y-part-1-why-cyclic5.png

And, as a check, the right angle inscribes an arc of the circle which have the endpoints of a diameter. This is correct, because an inscribed angle is half of its inscribed arc, so a \(90^{\circ}\) angle inscribes a \(180^{\circ}\) semicircular arc.

Since we can draw a circle circumscribed around the quadrilateral (with the vertices on the circle), this is a cyclic quadrilateral!

ðŸ™‚

]]>