When proving two triangles are congruent, there are different postulates to use. One is A.S.A., or Angle Side Angle. This is where you show that two sets of angles on two different triangles are congruent, with the side in between them congruent to the one one the other triangle, also in between the angles. Here's a good image:
Angle side angle congruence postulate. The side has to be in the middle of the two angles
Gram crackers
The SSS, ASA and SAA postulates together signify what conditions must be present for two triangles to be congruent. Do all of the conditions this postulates represent together have to be present for two triangles to be congruent ? Explain.
I assume "throemand" is your fail at spelling "theorem and".The theorem states that if two angles and the included side of one triangle are congruent to the corresponding parts of another triangle, then the triangles are congruent.
Could you please specify which postulate you are referring to?
Since ASA is a congruence postulate and congruence implies similarity, then the answer is : yes.
Angle side angle congruence postulate. The side has to be in the middle of the two angles
ASA
The Angle Side Angle postulate( ASA) states that if two angles and the included angle of one triangle are congruent to two angles and the included side of another triangle, then these two triangles are congruent.
congruent - asa
ASA
AAS theorem and ASA postulate by john overbay
Gram crackers
Asa /sss
The correct answer is the AAS theorem
To be congruent, the three angles of a triangle must be the same and the three sides must be the same. If triangles TRS and WUV meet those conditions, they are congruent.
The SSS, ASA and SAA postulates together signify what conditions must be present for two triangles to be congruent. Do all of the conditions this postulates represent together have to be present for two triangles to be congruent ? Explain.