contestada

The condition_________? proves that ∆ABC and ∆EFG are congruent by the SAS criterion.

A. Angle A is congruent to angle E
B. B is congruent to angle F
C. AB=EF
D. Angle C is congruent to angle G

If AB ≠ EF, ______?the criterion for congruency is violated
A. SSA
B. ASA
C. SSS
D. SAS

In this situation, angle C ______?angle G.

A.May be congruent to
B.Is congruent to
C.Cannot be congruent to

The condition proves that ABC and EFG are congruent by the SAS criterion A Angle A is congruent to angle E B B is congruent to angle F C ABEF D Angle C is congr class=

Respuesta :

MissPhiladelphia
I believe that the best answer among the choices provided by the question are:

A. Angle A is congruent to angle EA. SSA
C.Cannot be congruent to


Hope my answer would be a great help for you.    If you have more questions feel free to ask here at Brainly.


toolboxj10

Answer:

The condition  angle A is congruent to angle E proves that ∆ABC and ∆EFG are congruent by the SAS criterion.

If AB ≠ EF, the  SSA criterion for congruency is violated.

In this situation, angle C  cannot be congruent to angle G.

Step-by-step explanation:

Otras preguntas