Question

12. In \(\triangle ABC\), \(\angle A \cong \angle C\). Which sides of \(\triangle ABC\) must be congruent? 13. \(\triangle ABC \cong \triangle GHK\). In \(\triangle ABC\), \(\overline{AM}\) is the median from vertex A to side \(\overline{BC}\). Likewise, \(\overline{GN}\) is the median of \(\triangle GHK\) from vertex G to side \(\overline{HK}\). How are \(\overline{AM}\) and \(\overline{GN}\) related?

          12. In \(\triangle ABC\), \(\angle A \cong \angle C\). Which sides of \(\triangle ABC\) must be congruent?
13. \(\triangle ABC \cong \triangle GHK\). In \(\triangle ABC\), \(\overline{AM}\) is the median from vertex A to side \(\overline{BC}\). Likewise, \(\overline{GN}\) is the median of \(\triangle GHK\) from vertex G to side \(\overline{HK}\). How are \(\overline{AM}\) and \(\overline{GN}\) related?

12. In ABC, ∠ A ≅∠ C. Which sides of ABC must be congruent?
13. ABC ≅ GHK. In ABC, AM is the median from vertex A to side BC. Likewise, GN is the median of GHK from vertex G to side HK. How are AM and GN related?

Added by Kelly C.

Geometry A Common Core Curriculum

Ron Larson, Laurie Boswell 1st Edition

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Solved by Expert Carrie Godfrey

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This means that the lengths of side LA and side ZC are equal. Show more…

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In AABC, LA = ZC. Which sides of AABC must be congruent? AABC = AGHK. In AABC, AM is the median from vertex A to side BC. Likewise, GN is the median of AGHK from vertex G to side HK. How are AM and GN related?