SAS similarity is side-angle-side similarity. For proving △DFE ~ △GFH, we need: Option C: ∠DFE is congruent to ∠GFH.
What is SAS similarity theorem?
ΔABC ~ ΔDEF only if ratio of two sides of ΔABC and corresponding two sides of ΔDEF is equal and the angle included in both sides are congruent.
Suppose the two sides of ΔABC are AB and BC, and that of DEF be DE and EF, then for SAS similarity, we need
[tex]\dfrac{|AB|}{|BC|} = \dfrac{|DE|}{|EF|}[/tex] and m∠ABC = m∠DEF
where that small m means measure of that angle.
Remember that in an angle ∠ABC, we mean angle made by like AB and BC , and it is internal to the triangle ABC assuming(assumable for this context)Using the above fact to find necessary statement needed
△DFE ~ △GFH by the SAS similarity theorem,
we already have
[tex]\dfrac{|FD|}{|FE|} = \dfrac{12+4}{9+3} = \dfrac{16}{12} = \dfrac{4}{3} \\\\\\\dfrac{|FG|}{|FH|} = \dfrac{4}{3}[/tex]
Thus,
[tex]\dfrac{|FD|}{|FE|} = \dfrac{|FG|}{|FH|}[/tex]
We also have the common angle F(internal to the triangles) same(since it is common for both triangles)
Thus,
[tex]m\angle DFE = m\angle GFH\\or\\\angle DFE \cong \angle GFH[/tex]
(that middle symbol is the sign of congruency, which for angles show that their measures are same).
Thus,
The needed statement to prove △DFE ~ △GFH by the SAS similarity theorem is given as
Option C: ∠DFE is congruent to ∠GFH.
Learn more about SAS similarity theorem here: https://brainly.com/question/22472034
