It is given that triangleABC is congruent to triangleDEF. Is it true to say that AB = EF. Justify your answer
Answers
Answered by
29
We say that triangle ABC is congruent to triangle DEF if
AB = DE
BC = EF
CA = FD
Angle A = Angle D
Angle B = Angle E
Angle C = Angle F
AB = DE
BC = EF
CA = FD
Angle A = Angle D
Angle B = Angle E
Angle C = Angle F
Neerjasharma:
Sorry I can't get it
Answered by
4
Step-by-step explanation:
In ABC and DEF ,
In ABC and DEF ,AB=DE ,BC=EF,AC=EF
In ABC and DEF ,AB=DE ,BC=EF,AC=EFANGLE A=D, ANGLE B =C, ANGLE C=F
In ABC and DEF ,AB=DE ,BC=EF,AC=EFANGLE A=D, ANGLE B =C, ANGLE C=F ABC IS CONGRUENT TO DEF (PROVED)
In ABC and DEF ,AB=DE ,BC=EF,AC=EFANGLE A=D, ANGLE B =C, ANGLE C=F ABC IS CONGRUENT TO DEF (PROVED) SO, AB IS NOT =EF
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