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21 Oct 2010, 03:02
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A
Be sure to select an answer first to save it in the Error Log before revealing the correct answer (OA)!
Difficulty:
75%
(hard)
Question Stats:
49% (02:46) correct
51%
(02:32)
wrong
based on 85
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In the figure below, AB is the chord of a circle with center O. AB is extended to C such that BC = OB. The straight line CO is produced to meet the circle at D. If ACD= y degrees and AOD = x degrees such that x = ky, then the value of k is
A. 3
B. 2
C. 1
D. None of the above
please help me with answers in details.
A. 3
B. 2
C. 1
D. None of the above
please help me with answers in details.
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21 Oct 2010, 03:22
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In the figure below, AB is the chord of a circle with center O. AB is extended to C such that BC = OB. The straight line CO is produced to meet the circle at D. If ACD= y degrees and AOD = x degrees such that x = ky, then the value of k is
A. 3
B. 2
C. 1
D. None of the above
ans : OB=BC
thus, in the triangle BOC, angle BOC = angle BCO =y
again, OB=AO (as both are radii of the same circle)
thus, in triangle OAB, angleOAB= angle OBA =y (because OAB and BOC are equal triangle)
thus, we can make the equation like this,
180=y+(180-2y)+x
thus, y=x
thus, ans is
c
A. 3
B. 2
C. 1
D. None of the above
ans : OB=BC
thus, in the triangle BOC, angle BOC = angle BCO =y
again, OB=AO (as both are radii of the same circle)
thus, in triangle OAB, angleOAB= angle OBA =y (because OAB and BOC are equal triangle)
thus, we can make the equation like this,
180=y+(180-2y)+x
thus, y=x
thus, ans is
c
21 Oct 2010, 15:35
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honeyhani
OB=BC, So BCO=BOC=x
ABO=2x (exterior angle of triangle BOC, sum of the two opposite interior angles)
OAB=ABO=2x (Isosceles triangle, 2 sides are the radius of the circle)
AOD is an exterior angle of triangle AOC
Hence AOD=OAB+BCO=x+2x=3x=y
Hence answer is (A)
