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3 July, 10:54

Match the reasons with the statements in the proof to prove that BC = EF, given that triangles ABC and DEF are right triangles by definition, AB = DE, and A = D.

Given:

ABC and DEF are right triangles

AB = DE

A = D

Prove:

BC = EF

1. ABC and DEF are right triangles

AB = DE

A = D CPCTE (Corresponding Parts of Congruent Triangles are Equal)

2. ABC ≅ DEF Given

3. BC = EF LA (Leg - Angle)

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Answers (1)
  1. 3 July, 11:17
    0
    Answer: Statement Reason

    1. ABC and DEF are right triangles 1. Given

    AB = DE, ∠A = ∠D

    2. Δ ABC ≅ Δ DEF 2. LA (Leg - Angle)

    3. BC = EF 3. CPCTE (Corresponding

    Parts of Congruent

    Triangles are Equal)

    Step-by-step explanation:

    Here, Given: ABC and DEF are right triangles.

    AB = DE and ∠A = ∠D

    Prove: BC = EF

    Since, AB = DE and ∠A = ∠D

    That is, leg and an acute angle of right triangle ABC are congruent to the corresponding leg and acute angle of right triangle DEF,

    Therefore, By Leg angle theorem,

    Δ ABC ≅ Δ DEF

    ⇒ BC ≅ EF (by CPCTC)

    ⇒ BC = EF
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