namburger
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Circle question (1 Viewer)
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independantz
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i) <ADC=<ACB=90( the angle between a tangent and radius at the point of contact is 90)
therefore, BCAD is a cyclic quad( opp angles are supplementary)
ii)given: the circles have equal radii
therefore, AE=EB, thus E is the centre of AB
From i), <ACB= 90
thus, AB is the diameter of circle BCAD
Therfore, E is the centre of the circle
iii)let AC=r,
thus, AB=2r
sin<CBA= r/2r=1/2
thus, <CBA=30
similarly for the other angle...
iv)from iii) <DBA=30, thus <DAB= 60 ( angle sum of a triangle
thus, <DCB= 60 ( angles in the same segment are equal when standing on the same arc)
therfore <DCB=<CBD= 60
thus, <CDB=60 ( angle sum of a triangle
Hence, triangle BCD is equilateral, ( all angles equal 60)
Here's the attachment if you cant see the text lol
therefore, BCAD is a cyclic quad( opp angles are supplementary)
ii)given: the circles have equal radii
therefore, AE=EB, thus E is the centre of AB
From i), <ACB= 90
thus, AB is the diameter of circle BCAD
Therfore, E is the centre of the circle
iii)let AC=r,
thus, AB=2r
sin<CBA= r/2r=1/2
thus, <CBA=30
similarly for the other angle...
iv)from iii) <DBA=30, thus <DAB= 60 ( angle sum of a triangle
thus, <DCB= 60 ( angles in the same segment are equal when standing on the same arc)
therfore <DCB=<CBD= 60
thus, <CDB=60 ( angle sum of a triangle
Hence, triangle BCD is equilateral, ( all angles equal 60)
Here's the attachment if you cant see the text lol
Last edited:
independantz
Member
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^ WTf is it just me or is half the text up there missing?
when i click edit i can see the text, however half of it is missing in the post lol?
when i click edit i can see the text, however half of it is missing in the post lol?
(ii) < ACB = < ADB = 90 degrees (tangents perpendicular to radius)
<ACB + <ADB = 180 degrees
BCAD is cyclic (opposite angles added up to 180 in a cyclic quadrilaterial)
(iii)
Since< ACB = 90
and < ADB = 90
Thus, AB must be diameter (< in semi circle = 90)
But, AE = EB (=equal radius of equal circles)
Thus E is the centre of the circle passing through B,C,A,D
(iv)??
(v) from iv) < CBD = 60
But CB = DB (tangents from external point are =)
Thus, < DCB = < CDB
< DCB + < CDB + 60 = 180 (< sum of triangle)
2< DCB = 120
<DCB = 60
and it follows < CDB = 60 degrees
Therefore triangle BCD is equaliteral, as all angles are equal.
<ACB + <ADB = 180 degrees
BCAD is cyclic (opposite angles added up to 180 in a cyclic quadrilaterial)
(iii)
Since< ACB = 90
and < ADB = 90
Thus, AB must be diameter (< in semi circle = 90)
But, AE = EB (=equal radius of equal circles)
Thus E is the centre of the circle passing through B,C,A,D
(iv)??
(v) from iv) < CBD = 60
But CB = DB (tangents from external point are =)
Thus, < DCB = < CDB
< DCB + < CDB + 60 = 180 (< sum of triangle)
2< DCB = 120
<DCB = 60
and it follows < CDB = 60 degrees
Therefore triangle BCD is equaliteral, as all angles are equal.