TrueHappiness
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AB and AC are equal chords of a circle. AD and BE are parallel chords through A and B respectively. Prove that AE is parallel to CD
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Circle Geometry (1 Viewer)
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MetroMattums
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Construct lines AE, CD, BC (extend BC to X)
Let the intersection of AE and BC be F, < ABC = a, < CBE = b
So < ABC = < ACB = a (equal <'s opp equal sides)
But < ACB = < AEB = a (<'s subtended by same arc)
Considering ∆ BEF, < BFE = 180 - (a + b) (< sum of ∆)
So < AFC = 180 - (a + b) (vert opp <'s)
But < BAD = 180 - (a + b) (co-int <'s, AD||BE)
So < BAD = < DCX = 180 - (a + b) (ext < of cyclic quad ABCD)
ie. < AFC = < DCX
ie. AE||DC (corresp <'s)
If I had a diagram that would make it much easier :|
Let the intersection of AE and BC be F, < ABC = a, < CBE = b
So < ABC = < ACB = a (equal <'s opp equal sides)
But < ACB = < AEB = a (<'s subtended by same arc)
Considering ∆ BEF, < BFE = 180 - (a + b) (< sum of ∆)
So < AFC = 180 - (a + b) (vert opp <'s)
But < BAD = 180 - (a + b) (co-int <'s, AD||BE)
So < BAD = < DCX = 180 - (a + b) (ext < of cyclic quad ABCD)
ie. < AFC = < DCX
ie. AE||DC (corresp <'s)
If I had a diagram that would make it much easier :|
Last edited:
TrueHappiness
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O man thxs very much. That was nicely done.