A geometry problem by Parnab Ghosh

Geometry Level pending

Let P 1 , P 2 , , P 2009 P_1, P_2, \ldots , P_{2009} be the points on the side B C BC of a square A B C D ABCD so that B P 1 = P 1 P 2 = P 2 P 3 = = P 2008 P 2009 = P 2009 C BP_1 = P_1 P_2 = P_2 P_3 = \cdots = P_{2008} P_{2009} = P_{2009} C .

Let Q Q be a point on the side A D AD so that A Q = B P 1 AQ = BP_1 .

Find the sum of angles A P 1 Q + A P 2 Q + + A P 2009 Q + A C Q \angle AP_1 Q + \angle AP_2 Q + \cdots + \angle AP_{2009} Q + \angle ACQ in degrees.


The answer is 45.

This section requires Javascript.
You are seeing this because something didn't load right. We suggest you, (a) try refreshing the page, (b) enabling javascript if it is disabled on your browser and, finally, (c) loading the non-javascript version of this page . We're sorry about the hassle.

0 solutions

No explanations have been posted yet. Check back later!

0 pending reports

×

Problem Loading...

Note Loading...

Set Loading...