alexabegly152
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Suppose △PKN≅△BGH.


Which other congruency statements are correct?




Select each correct answer.



△KNP≅△GHB


△KPN≅△BHG


△NKP≅△HBG


△NPK≅△HBG


Nevermind, I figured it out. its the first one and the last one.

Respuesta :

frika

Answer:

△KNP ≅ △GHB

△NPK ≅ △HBG

Step-by-step explanation:

Given: △PKN≅△BGH

This means two triangles PKN and BGH are congruent. Congruent triangles havecongruent  corresponding parts.

So,

  • PK ≅ BG;
  • PN ≅ BH;
  • KN ≅ GH;

and corresponding vertices

  • P to B;
  • K to G;
  • N to H.

Hence,

A. Triangle KNP is congruent to triangle GHB - true

B. Triangle KPN is congruent to triangle GBH - false

C. Triangle NKP is congruent to triangle HGB - false

D. Triangle NPK is congruent to triangle HBG - true

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