User talk:Mathboy100
THIS IS MY TALK.
Not yours.
SO RESPECT THE RULES.
jkjkjk just like chat here and share problems i guess
Good we can share problems!
is an isosceles triangle where . Let the circumcircle of be . Then, there is a point and a point on circle such that and trisects and , and point lies on minor arc . Point is chosen on segment such that is one of the altitudes of . Ray intersects at point (not ) and is extended past to point , and . Point is also on and . Let the perpendicular bisector of and intersect at . Let be a point such that is both equal to (in length) and is perpendicular to and is on the same side of as . Let be the reflection of point over line . There exist a circle centered at and tangent to at point . intersect at . Now suppose intersects at one distinct point, and , and are collinear. If , then can be expressed in the form , where and are not divisible by the squares of any prime. Find .
Someone mind making a diagram for this?
~Ddk001 Also, in case you are confused, lpieleanu took credits for 2023 AIME I problem #11 because lpieleanu changed minimal casework to Minimal Casework.