Q1: If two arc of a circle are congruent. Then corresponding chord are unequal.
Q2: Two perpendicular bisector of chord intersect at center of circle.
Q3: The line joining the mid-point of a chord to centre perpendicular to chord.
Q4: It is possible to draw two circles from three non-collinear points.
Q1: If O is the center of circle of radius 5 cm OP perpendicular to AB and OQ perpendicular to CD, AB||CD, AB = 6cm and CD = 8 cm. Determine PQ.
Q2: AB and CD are the two chord of the circle such that AB = 6 cm , CD = 12 cm and AB||CD, if the distance between AB and CD is 3 cm, find the radius of the circle.
Q3: Prove that the line joining to the centre of circle to the mid-point of a chord, is perpendicular to the chord.
Q4: Given an arc of circle how you will find its centre and complete the circle.
Q5: Two equal chord AB and CD of circle with center O, when produced meet at a point E, prove that BE=DE and AE=CE
Q6: Two equal circles intersect in P and Q. A straight line through P meets the circles in A and B. Prove that QA=QB.
The solutions of the worksheet "Worksheet Solutions: Circles"
44 videos|412 docs|54 tests
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1. What is the formula for the circumference of a circle? |
2. How do you calculate the area of a circle? |
3. What is the difference between the diameter and the radius of a circle? |
4. Can you explain what a chord is in relation to circles? |
5. How do you find the length of an arc in a circle? |
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