The perpendicular bisector of two chords intersect at centre of circle ( True /False).
Answers
Recall the theorem, perpendicular bisector of a chord of a circle passes through its centre. Since there are two chords to the given circle. Both the chords will pass through the centre. This means that both the perpendicular bisectors intersect each other at the centre of the circle.
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Answer: The given statement is true that the perpendicular bisector of two chords intersect at centre of circle.
Step-by-step explanation: The given statement is true that the perpendicular bisector of two chords intersect at centre of circle.
According to theorem, the perpendicular bisector of the chord of a circle passes through its centre .If there are two chords in the circle then both the chords pass through the centre of the circle and hence intersect at that point. The two equal chords will have the same distance from the centre of the circle. This means that both the perpendicular bisector of two chords intersect at centre of circle.
hence, from the above explanation the given statement is true .
To know more about chords of a circle from the given link
https://brainly.in/question/253396
To know more about perpendicular bisector from the given link
https://brainly.in/question/6779610
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