Two lines are said to be parallel if and only if the value of the angle between them is [tex]180^{o}[/tex].
Thus the required proofs for each question are stated below:
6. A bisector is a line that divides a given line or angle into two equal parts.
Thus to prove that: AD ║BC
Given that: AC ⊥ BD, then:
BX ≅ DX (midpoint property of a line)
<ADX ≅ <DBX (alternate angle property)
<DAX ≅ <BCX (alternate angle property)
<AXD ≅ <BXC (vertical opposite angle property)
Also,
ΔAXD ≅ ΔBXC (congruent property of similar triangles)
Therefore, it can be deduced that;
AD ║BC
7. Given: CD ≅ CE
<B ≅ <D
proof: AB ║DE
<ABC ≅EDC
Thus,
CB ≅ CA (congruent property of similar triangle)
<BAC ≅ <EDC (alternate angle property)
ABC ≅ <DEC (alternate angle property)
Also,
CA ≅ CB (congruent side of similar triangles)
ΔABc ≅ ΔCDE (congruent property of similar triangles)
Thus,
AB ║DE (congruent property)
8. Prove: AB ║ DE
Given: <1 ≅ < 3
Then,
<1 ≅ <2 ≅ <3 ≅ [tex]90^{o}[/tex]
So that,
BC ≅ EF
also,
<1 + <2 = [tex]180^{o}[/tex] (supplementary angles)
Therefore it can be inferred that;
AB ║ DE (congruent property of parallel lines intersected by transversals)
For more clarifications on parallel lines, visit: https://brainly.com/question/24607467
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