Answer:
D:Length side LM over length of side MN equals length of side XY over length of side XZ.
Step-by-step explanation:
We are given that two triangles LMN and XYZ are similar.
We have to find the not necessarily true information about given triangles.
We know that when two triangles are similar then their corresponding angles are congruent and the ratio of corresponding sides of two triangles are equal.
[tex]\triangle LMN\sim \triangle XYZ[/tex]
Therefore, [tex]\angle L\cong \angle X[/tex]
[tex]\angle M\cong \angle Y[/tex]
[tex]\angle N\cong \angle Z[/tex]
[tex]\frac{LM}{XY}=\frac{MN}{YZ}=\frac{LN}{XZ}[/tex]
[tex]\frac{LM}{MN}=\frac{XY}{YZ}[/tex]
But , [tex]\frac{LM}{MN}=\frac{XY}{XZ}[/tex] is not necessarily true.
Hence, option D is true option.
Answer : D:Length side LM over length of side MN equals length of side XY over length of side XZ.
