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What else can I help you with?
If ABC DEF DEF MNO and MNO PQR then ABC PQR by the transitive property.?
false
If ABC def def mno and mno pqr then ABC pqr by the transitive property?
false
What else need to be congruent that abc def by asa?
B e
How do you find a triangle congruent by cpctc?
A triangle if not found congruent by CPCTC as CPCTC only applies to triangles proven to be congruent. If triangle ABC is congruent to triangle DEF because they have the same side lengths (SSS) then we know Angle ABC (angle B) is congruent to Angle DEF (Angle E)
Is ABC DEF If so name the postulate that applies.?
Nope Congruent - SSS Apex. You're welcome.
Which property is illustrated by the following statement if ABC is congruent to def and def to xyz then ABC is congruent to xyz?
Transitive
If ABC DEF DEF MNO and MNO PQR then ABC PQR by the transitive property.?
false
If ABC def def mno and mno pqr then ABC pqr by the transitive property?
false
If abc def equal def equal mno and mno equal pqr then abc equal pqr by the transitive property?
False. If ABC definitely equals DEF equals MNO and MNO equals PQR then ABC does not equal PQR by the transitive property.
What else need to be congruent that abc def by asa?
B e
How do you find a triangle congruent by cpctc?
A triangle if not found congruent by CPCTC as CPCTC only applies to triangles proven to be congruent. If triangle ABC is congruent to triangle DEF because they have the same side lengths (SSS) then we know Angle ABC (angle B) is congruent to Angle DEF (Angle E)
How can you prove triangles ABC and DEF are congruent?
They are congruent when they have 3 identical dimensions and 3 identical interior angles.
Is ABC congruent to DEF if so name the postulate that applies?
Congruent-SSS
Is ABC DEF If so name the postulate that applies.?
Nope Congruent - SSS Apex. You're welcome.
What else would need to be congruent to show that abc def by asa?
Angle "A" is congruent to Angle "D"
Based on the information marked in the diagram, ABC and DEF must be congruent. (Apex)?
True [APEX]
If ABC DEF which congruences are true by CPCTC?
Oh, dude, if ABC DEF, then congruences like angle A is congruent to angle D, angle B is congruent to angle E, and side AC is congruent to side DF would be true by CPCTC. It's like a matching game, but with triangles and math rules. So, just remember CPCTC - Corresponding Parts of Congruent Triangles are Congruent!
