The figure shows a circle with center O and two congruent chords AB and CD. To prove that the chords are equidistant from the center, it has to be proved that segment OS is congruent to segment OT.

Question

anonymous · Answer

Which of these is a step that can be used in the proof?

 Statement: Segment OD is congruent to segment OB.
   Reason: Radius perpendicular to a chord bisects the chord.

 Statement: Segment OS is congruent to segment SD.
   Reason: Congruent sides of isosceles triangle OSD.

 Statement: Segment OD is congruent to segment OB.
       Reason: Radii of the same circle are congruent.

 Statement: Segment OS is congruent to segment OT.
   Reason: Radii of the same circle are congruent.

anonymous · Answer

attachment

anonymous · Answer

are you doing flvs?

anonymous · Answer

yea

anonymous · Answer

Yo @AlexPR787  You thinking what im thinking Hermano?

cwrw238 · Answer

what have OD and OB got in common?

anonymous · Answer

Ik Ik i went to far haha... My B My B

anonymous · Answer

i have no idea how to do this problem...

anonymous · Answer

did u try google?:)

anonymous · Answer

LMAO

anonymous · Answer

yes.

anonymous · Answer

I would help you but i dont know the answer im sorry :/

cwrw238 · Answer

hint: two radius

anonymous · Answer

A or D ?

anonymous · Answer

There not gunna tell you the answer . They just Ask ALOT of questions to make sure that you understand it -__-

anonymous · Answer

Statement: Segment OD is congruent to segment OB.
       Reason: Radii of the same circle are congruent. 
as the two rigth angled triangles will be congruent so OS  and OD are congruent :P