In Fig. 10.32, AB is a diameter of the circle, CD is a chord equal to theradius of the circle. AC and BD when extended intersect at a point E. Prove that`/_A E B\ =\ 60^@`

In the adjoinig figure, AB is a diameter of the circle, CD is a chord equal to the radius of the circle. AC and BD when extended intersect at a point E. Prove that angleAEB=60^@ .

In Figure,AB is a diameter of a circle C(O,r)* Chord CD is equal to radius OC .If AC and BD when produced intersect at P prove that /_APB is constant.

AB is diameter of a circle with centre 'O'. CD is a chord which is equal to the radius of the circle. AC and BD are extended so that they intersect each other at point P. Then find the value of angleAPB .

AB is a diameter of the circle with centre O and chord CD is equal to radius OC (fig). AC and BD proudced meet at P. Prove that angle CPD=60^(@) .

In a circle with centre O, AB is a diameter and CD is a chord which is equal to the radius OC. AC and BD are extended in such a way that they intersect each other at a point P, exterior to the circle. The measure of angleAPB is

AB is a diameter of a circle. CD is a chord parallel to AB and 2CD = AB. The tangent at B meets the line AC produced at E then AE is equal to

AB and CD are equal chords of a circle whose centre is O,when produced these chords meet at E,Prove that EB=ED