What triangle congruence theorem could you use to prove triangle [math]ADE[/math] is congruent to triangle [math]CBE[/math]?
[list][*]Line [math]AB[/math] is parallel to line [math]DC[/math] and cut by transversal [math]DB[/math]. So angles [math]CDB[/math] and [math]ABD[/math] are alternate interior angles and must be congruent.[/*][*]Side [math]DB[/math] is congruent to side [math]BD[/math] because they're the same segment.[/*][*]Angle [math]A[/math] is congruent to angle[math]C[/math] because they're both right angles.[/*][*]By the Angle-Side-Angle Triangle Congruence Theorem, triangle [math]BCD[/math] is congruent to triangle [math]DAB.[/math][/*][/list][br][br] How can Han fix his proof?
Prove triangle[math]HGE[/math] is congruent to triangle [math]FGE[/math].
Angle [math]BAC[/math] has a measure of 33 degrees and angle [math]BDC[/math] has a measure of 35 degrees. Find the measure of angle [math]ABD[/math].
[size=150]He begins by constructing an angle congruent to angle[math]LKJ[/math]. [/size][br]What is the least amount of additional information that Andre needs to construct a triangle congruent to this one?
[math]C[/math] is the center of one circle, and [math][/math]B is the center of the other. 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[/img][br]Which segment has the same length as segment [math]CA[/math]?