Segment of Secants ; Chords ; Tangent

Circles - Tangent And Secant|Numbers Of Tangent From A Point Inside The Circle|Length Of The Tangent|Theorem|NCERT Examples

Two perpendicular chords intersect in a circle.The segments of one chord are 3 and 4 the segments of the other chord are 6 and 2. The diameter of the circle is

If two equal chords of a circle in intersect within the circle, prove that : the segments of the chord are equal to the corresponding segments of the other chord. the line joining the point of intersection to the centre makes equal angles with the chords.

If two equal chords of a circle in intersect within the circle, prove that: the segments of the chord are equal to the corresponding segments of the other chord. the line joining the point of intersection to the centre makes equal angles with the chords.

If two chords of a circle intersect inside or outside the circle when produced ; the rectangle formed by the two segments of one chord is equal in area to the rectangle formed by the two segments of the other chord.

Intro,Tangent ,Normal, Intro Chord Target & Normal

If PAB are secant to the circle and PT is tangent segment; then PA xx PB=PT^(2)

If a chord is drawn through the point of contact of a tangent to a circle; then the angle which this chord makes with the given tangent are equal respectively to the angles formed in the corresponding alternate segments.

If two equal chords of a circle intersect within the circle, prove that the segments of one chord are equal to corresponding segments of the other chord.

If two equal chords of a circle in intersect within the circle, prove that: the segments of the chord are equal to the corresponding segments of the other chord.