Angles in Alternate Segments
Trending Questions
Prove that the tangents at the extremities of any chord make equal angles with the chord. [3 MARKS]
If △ABC is isosceles with AB = AC, prove that the tangent at A to the circumcircle of △ABC is parallel to BC. [2 MARKS]
OABC is a rhombus whose three vertices A, B and C lie on a circle with centre O.
(i) If the radius of the circle is 10 cm, find the area of the rhombus.
(ii) If the area of the rhombus is 32√3 cm2 find the radius of the circle.
Prove that any four vertices of a regular pentagon are concyclic (lie on the same circle).
The angles of a quadrilateral are in the ratio 1 : 2 : 3 : 4. The smallest angle is
a) 72∘
b) 144∘
c) 36∘
d) 18∘
In the following figure, PQ and PR are tangents to the circle, with centre O. If ∠QPR=60o, calculate :
(i)∠QOR,
(ii)∠OQR,
(iii)∠QSR,
A chord PQ of a circle is parallel to the tangent drawn at a point R of the circle. Prove that R bisects the arc PRQ.
In the given figures, O is the centre of the circle and AB is a tangent to it at point B. ∠BDC = 650 Find ∠BAO.
40°
60°
30°
50°
In fig., O is the center of the circle, PA and PB are tangent segments. Show that the quadrilateral AOBP is cyclic.
In teh figure; PA is a tangent to the circle, PBC is secant and AD bisects angle BAC. Show that triangle PAD is an isosceles triangle. Also, show that :
∠CAD=12[∠PBA−∠PAB]
In the given figure, △ABC is inscribed in a circle. The bisector of ∠BAC meets BC at D and the circle at E. If EC is joined, then ∠ECD=30∘. Find ∠BAC.
30°
60°
50°
70°
The quadrilateral formed by joining the angle bisectors of a cyclic quadrilateral is a
square
Rectangle
parallelogram
cyclic quadrilateral
In figure, and are tangents to the circle with centre such that .
Write the measure of
In the given figure, PAT is tangent to the circle with centre O, at point A on its circumference and is parallel to chord BC. If CDQ is a line segment, show that :
(i) ∠ BAP = ∠ ADQ
(ii) ∠ AOB = 2∠ ADQ
(iii) ∠ ADQ = ∠ ADB.
In the figure, ABCD is a cyclic quadrilateral with BC = CD. TC is tangent to the circle at point C and DC is produced to point G. If ∠ BCG =108o and O is the centre of the circle, find :
(i) angle BCT
(ii) angle DOC
Two circles intersect each other at points A and B. Their common tangent touches the circles at points P and Q as shown in the figure. Show that the angle PAQ and PBQ are supplementary.
In the given figure, ABCD is a cyclic quadrilateral, OB is the radius, PB is the tangent at point B and ∠OBC=30∘. AOC is a straight line passing through the centre O. Then, the value of x is:
60∘
30∘
120∘
90∘
Circles with centres P and Q intersect at points A and B as shown in the figure.
CBD is a line segment and EBM is tangent to the circle, with centre Q, at point B. If the circles are congruent ;
show that CE = BD.
In the figure given below, find x if AB || CD.
45∘
55∘
60∘
70∘
If ABCD is a cyclic quadrilateral, then x = ___.
- 80∘
- 120∘
- 90∘
- 100∘
In the given figure , △ ABC is inscribed in a circle. The bisector of ∠BAC meets BC at D and thecircle at E, if EC is joined then∠ECD=300. Find ∠BAC.
30°
60°
50°
70°
Question 1 (ii)
In an isosceles triangle ABC, with AB = AC, the bisectors of ∠ B and ∠ C intersect each other at O. Join A to O. Show that:
AO bisects ∠ A
In the above figure, ∠CAB=60∘, ∠CBA=60∘. PQ is a tangent at A. What is the value of ∠BAQ.
60∘
20∘
40∘
80∘
In the figure, PC is the tangent to the circle. If ∠BPC = 60∘ and ∠APB = 55∘, then find ∠ABP .
55∘
60∘
65∘
70∘
In a quadrilateral HOPE, PS and ES are bisectors of ∠P and ∠E respectively. Give reason.
If two circles intersect at two points, then prove that their centers lie on the perpendicular bisector of the common chord. [2 MARKS]
In a figure, the common tangents AB and CD to two circles with centres O and O’ intersect at E. Prove that the points O, E and O’ are collinear.
In figure, ABCD is a trapezium with AB||DC, If △AED is similar to △BEC, prove that AD = BC
(i) they subtend equal angles at the centre
(ii) they are equally inclined to the segment, joining the centre to that point.