MathDB

17

Part of 2016 Baltic Way

Problems(1)

Inequality in quadrilateral

Source: Baltic Way 2016, Problem 17

11/5/2016
Let ABCDABCD be a convex quadrilateral with AB=AD.AB = AD. Let TT be a point on the diagonal ACAC such that ABT+ADT=BCD.\angle ABT + \angle ADT = \angle BCD. Prove that AT+ACAB+AD.AT + AC \geq AB + AD.
geometry