Tangents to a circle from a point P

Thanks. Provides many insights to circle properties

Te quiero arthur me salvas las clases de dibujo tecnico

Your work has helped prefect my crop circle making game

Best youtube channel for geometric maths
Love from India❤

Love it... Geometry.

I am the first one for once!
I am sure this will be another amazing vid!

You legend, Arthur

Here's the proof (I'll let T1 = T here, look at 2:49 for diagram):
1) First draw auxiliary line MT
2) MT = MP. They are both radii to the same circle OTP centered at M.
∴ ∠MTP = ∠MPT by converse of isosceles triangle theorem
3) ∠MTP + ∠MPT = ∠TMO by external angles theorem
∴ 2 x ∠MPT = ∠TMO
4) OM = OT. They are both radii to the same circle OTP centered at M.
∴ ∠MOT = ∠MTO by converse of isosceles triangle theorem
5) ∠MOT + ∠MTO + ∠TMO = 180° by triangle angle sum.
∠MOT + ∠MOT + ∠TMO = 180° by substituting step (4)
2 x ∠MOT + ∠TMO = 180°
2 x ∠MOT + 2 x ∠MPT = 180°
∠MOT + ∠MPT = 90° divide both sides by 90
∴∠ OTP = 90° by triangle angle sum
6) ∴ OT ⊥ TP and given that OT is a radius of the circle, TP is tangent to the circle because tangent lines are perpendicular to radius.

you missed explaining the why!

Hello, I have seen many videos of tangency but I have a problem, I don't want to memorize the steps for each case of tangency, I want to know why by making several strokes the points of tangency are obtained in the drawing. Where should I start to understand the "why" do the centers join, why does it become bisector, why do we have to add radii or subtract? I don't want to learn just the steps to solve tangency problems. Sorry if it's a lot of text, I hope I explained it well.