in the given figure opqr is a square a circle is drow with centre o , cut with the square in x and you prove that qx=qy
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Given,
In this fig.a circle is drawn in side a square.
where X & Y are points on sides PQ & QR.
BUT,
qx=qy because q is an external point from the circle with centre o.
using the theorem tangents drawn from external point to a circle are equal.
In this fig.a circle is drawn in side a square.
where X & Y are points on sides PQ & QR.
BUT,
qx=qy because q is an external point from the circle with centre o.
using the theorem tangents drawn from external point to a circle are equal.
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