prove that two distinct circles cant intersect at more than 2 points
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Hey buddy here is ur answer !!!
》 Let us consider that 2 distinct circle intersect at more than 2 points .
》These points are collinear points determine one and only one circle .
》 there should be only one circle .
》But , the superimpotion of 2 circle of different radii is impossible , i.e.
》Concentric circles would instead .
》This contradicts our assumption .Therefore our assumption is wrong .
》Hence , 2 circles cannot intersect each other at more than 2 points .
Hope u like !!
》》 BE BRAINLY 《《
》 Let us consider that 2 distinct circle intersect at more than 2 points .
》These points are collinear points determine one and only one circle .
》 there should be only one circle .
》But , the superimpotion of 2 circle of different radii is impossible , i.e.
》Concentric circles would instead .
》This contradicts our assumption .Therefore our assumption is wrong .
》Hence , 2 circles cannot intersect each other at more than 2 points .
Hope u like !!
》》 BE BRAINLY 《《
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