Answer:
Option B is not necessarily true.
Step-by-step explanation:
Option A.
AD = [tex]A_{L}D[/tex]
Since triangle ABC is reflected to form triangle [tex]A_{L}B_{L}C_{L}[/tex]
So distance AD may be equal to distance [tex]A_{L}D[/tex]. So this option is true.
Option B.
[tex]A_{L}D[/tex] = [tex]B_{L}D[/tex]
This statement is not correct because [tex]A_{L}D[/tex] ≠ [tex]B_{L}D[/tex]
Option C.
m∠ACB = m∠[tex]A_{L}C_{L}B_{L}[/tex]
Since translated triangle [tex]A_{L}B_{L}C_{L}[/tex] and ΔABC are similar.
So the statement is true.
Option D.
m∠BAC = m∠[tex]B_{L}A_{L}C_{L}[/tex]
Since translated triangle [tex]A_{L}B_{L}C_{L}[/tex] and ΔABC are similar.
So the statement is true.
Therefore, option B is not necessarily true.
