The diameter of a circle subtends a right angle at the circumference
Answers
Answer:
This is a known and a very useful property of inscribed angles that they measure half the central angle subtended by the same arc, or, which is the same, by the same chord. When a chord is a diameter, the central angles measures _________
right angles and the corresponding inscribed angles are all _________
. The applet above specifically demonstrates this fact, which is sufficiently important to warrant an independent proof. (The statement is often referred to as Thales' theorem.)
Let P be a point on a circle with diameter AB and center O. So that OA = OB = OP, as three radii of the same circle. This makes triangles AOP and BOP _________
. In each, the base angles are equal and their sum equals the opposite exterior angle:
∠OAP + ∠APO = ∠ _________
and also
∠OBP + ∠BPO = ∠ _________
.
But since ∠OAP = ∠ _________
and ∠OBP = ∠BPO, we further have
2∠APO = ∠ _________
and also
2∠BPO = ∠ _________
.
Adding the two up
2∠ _________
+ 2∠BPO = ∠AOP + ∠ _________
= 180°.
In other words,
∠APB = ∠ _________
+ ∠BPO = 90°.
I hope this will help uhh