A, B, C, D are 4 non collinear points in a plane such that $∠$ ACB = $∠$ ADB, then how many circle(s) can be drawn passing through all 4 points.

True

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False

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Solution

The correct option is B
False

Let us draw the points A, B, C, D such that $∠$ ACB = $∠$ ADB.

Now draw a circle trough A, B, C. let us assume that the circle does not pass through the point D but intersects the extension of line segment CD at $D^{^{'}}$ .

Since angles subtended by an arc in a segment are equal, $∠$ ACB= $∠$ A $D^{^{'}}$ B. It is given that $∠$ ACB= $∠$ ADB. Thus for the angles to be equal, D and $D^{^{'}}$ should coincide. Thus our assumption that the circle does not pass through D is false.

Therefore a circle can be drawn through these 4 points. So given statement is false.

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