d1v0-2026-01-27_14_22_53-congruence-of-triangle-notes-and-activities.pdf
d1v0-2026-01-27_14_22_53-congruence-of-triangle-notes-and-activities.pdf
Two X plus one equals forty-five degrees. Two X equals forty-four degrees. ASA (Angle-Side-Angle)
If any two angles and the side included between the angles of one triangle are equivalent to the corresponding two angles and side included between the angles of the second triangle, then the two triangles are said to be congruent by ASA rule.
X minus five. X equals forty-five degrees. X. X minus five equals one hundred five degrees. X equals one hundred ten degrees. AAS (Angle-Angle-Side)
When two angles and a non-included side of a triangle are equal to the corresponding angles and sides of another triangle, then the triangles are said to be congruent.
EXAMPLE:
EXAMPLE:
Five X equals twenty-five degrees. X equals five degrees. Two (X minus three) equals forty degrees. Two X minus six equals forty. Two X equals forty-six. X equals twenty-three degrees. Three
One. Given: CB equals WY; CE equals WR; BE equals YR
Two. Given: LE equals two R; CE equals WR; BE equals YR
Three. Given: two C equals and W; two B equals LY; CB equals WY
Four. Given: two C equals and W; LE equals and R; BE equals YR
Five. Given: two B equals LY; EB equals RY; LE equals ZR
Six. Given: CB equals WY; CE equals WR ;; less than C equals LW
B. Given an isosceles ASYU, point H as the midpoint of YU and SH as angle bisector LYSU. Fill in the blank with the correct answer to illustrate that AYHS and AUHS.
One. By SSS Congruence Postulate
Two. By SAS Congruence Postulate HS =
Three. By ASA Congruence Postulate LUHS =
LHSU =