Question

Medal to who can answer this question the fastest!

Answer 1

Prove that the diagonals of the rhombus bisect the interior angles

Answer 2

@flybuddyricky, do not under any circumstances be rude or vulgar to another user. These people are willing to help you, but if you keep your attitude, you will be suspended.

Answer 3

it is not hard but it needs time you could look at that rhombus and you will see that you have four triangles (Equilateral triangles) and one property of the Equilateral triangle is that the two angles are the same. If you want more exp tell me.:)

Answer 4

and @Kreshnik, please don't post on someone else's question just to say you can't help. If you were kidding and planned to follow up with help, I understand. But if that was your sole purpose for posting, then it's kinda distracting. Thanks :)

and @RED123url, way to be above it all and help 'em out!

Answer 5

@red123url yes please.

Answer 6

lol I was here to help him... that was just a joke, (Although now I'll never help him) .. and I think I didn't deserve that at all ! @mattfeury anyway, it won't happen again.

Answer 7

@Kreshnik I doubt it and I don't care. You're help most likely wouldn't have been useful.

Answer 8

your*

Answer 9

whatever , I'm not going to argue.

Answer 10

@Kreshnik Don't. Bye.

Answer 11

first consider that the four angles are right.
second: AE=CE=DE=BE
third: AE=DE then the triangle AED is an Equilateral triangle that means the angle ADE= the angle EAD
4: Apply the same thing for the other triangles
5: you can find that the four triangles are Identical triangles
6: Because the triangle AED and the triangle AEB are Identical, so the angle EAB= the angle EAD and it =45 that
7: By applying the same on the other angles you can say that you proved what is written there.

Answer 12

Thanks bro