The figure below shows rectangle ABCD.
http://go.flvs.net/courses/1/flvs_57_3641_12676/ppg/respondus/pool_Geom_3641_1004_02/image0174e983e46.gif
The two-column proof with missing statement proves that the diagonals of the rectangle bisect each other.

Question

The figure below shows rectangle ABCD.
http://go.flvs.net/courses/1/flvs_57_3641_12676/ppg/respondus/pool_Geom_3641_1004_02/image0174e983e46.gif
 The two-column proof with missing statement proves that the diagonals of the rectangle bisect each other.

anonymous · Answer

Statement
	

Reason

ABCD is a rectangle.
	

Given

Line segment AB and Line segment CD are parallel
	

Definition of a Parallelogram

Line segment AD and Line segment BC are parallel
	

Definition of a Parallelogram

∡CAD ≅ ∡ACB
	

Alternate interior angles theorem

Line segment BC is congruent to line segment AD
	

Definition of a Parallelogram

 
	

Alternate interior angles theorem

Triangle ADE is congruent to triangle CBE
	

Angle-Side-Angle (ASA) Postulate

Line segment BE is congruent to line segment DE
	

CPCTC

Line segment AE is congruent to line segment CE
	

CPCTC

Line segment ACbisects Line segment BD
	

Definition of a bisector

Which statement can be used to fill in the blank space?
Answer
		
∡ADB ≅ ∡CBD
		
∡ABE ≅ ∡ADE
		
∡ACD ≅ ∡ACE
		
∡ACE ≅ ∡CBD

anonymous · Answer

@jim_thompson5910 This One Please lol

anonymous · Answer

My Bad i Sent you the wrong link i will tag you on my next question