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Given: AC I BD and BD bisects AC.Prove: AABDACBD.StepStatementReason1AC I BDBD bisects ACGiven2AD , DCA segment bisector divides a segment into two congruent segmentstryType of StatementB

Given: AC I BD and BD bisects AC.Prove: AABDACBD.StepStatementReason1AC I BDBD bisects-example-1
User Bilal Shah
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1 Answer

12 votes
12 votes

Ok to probe that ABD=CBD you need to prove that:


AB\cong BC

To prove that you have to use the Pythagorean theorem which states that given a rigth triangle abc with c as its hypotenuse:


c^2=a^2+b^2

In this problem AB and BC are the hypotenuses of triangles ABD and CBD respectively. So you have to use the theorem in both:


AB=\sqrt[]{(AD)^2+(BD)^2}\text{ }
BC=\sqrt[]{(DC)^2+(BD)^2}\cong\sqrt[]{(AD)^2+(BD)^2}=AB

So in step 3 the type of statement would be:


AB\cong BC

And the reason would be: according to the pythagorean theorem

The last step would be step 4 and the statement would be:


\Delta ABD\cong\Delta CBD

The reason: they

User Azeemarif
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