Math, asked by ayushkumar9961, 1 year ago

write and prove A.A.A similarity theorem

Answers

Answered by Govindjk123
3

Answer:

Statement: If in two triangles, the corresponding angles are equal, i.e., if the two triangles are equiangular, then the triangles are similar.  

 

Given : Triangles ABC and DEF such that ∠A = ∠D; ∠B = ∠E; ∠C = ∠F  

Prove that : Δ ABC ~ ΔDEF

Construction : We mark point P on the line DE and Q on the line DF such that AB = DP and AC = DQ, we join PQ.  

There are three cases :  

Case ( i ) : AB = DE, thus P coincides with E.

Statements

Reasons

1) AB = DE 1) According to 1st case

2) ∠A = ∠D 2) Given

3) ∠B = ∠E 3) Given

4) ΔABC ≅ ΔDEF 4) By ASA postulate

⇒ AB = DE, BC = EF and AC = DF  

Consequently, Q coincides with F.

AB BC CA  

---- = ------ = ------

DE EF FA

Since the corresponding angles are equal, we conclude that Δ ABC ~ Δ DEF.  

Case( ii ) : AB < DE. Then P lies in DE

In triangles ABC and DPQ,  

Statements

Reasons

1) AB = DP 1) By construction

2) ∠A = ∠D 2) Given

3) AC = DQ 3) By construction

4) ΔABC ≅ ΔDPQ 4) By SAS postulate

5) ∠B = ∠DPQ 5) CPCTC

6) ∠B = ∠E 6) Given

7) ∠E = ∠DPQ 7) By transitive property  

( from above)

8) PQ || EF 8) If two corresponding angles are congruent then the lines are parallel

9) DP/DE = DQ/DF 9) By basic proportionality theorem

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