Math, asked by Anupam23raj, 10 days ago


6.) Write three pairs of integers which are equidistant from the point corresponding to -7 on
the number line.
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Answers

Answered by Anupriyashingh
6

Answer:

Suppose you have a continuous, closed planar curve. It is allowed to intersect itself.

Is it always possible to find three points on the curve that are equidistant (i.e. form an equilateral triangle?)

If it is always possible, can the curve have a finite number of sets of 3 equidistant points?

If it can have a finite number of sets of 3 equidistant points, What's the minimum number of sets of three equidistant points that the curve can have?

Answered by hotaasutosh
1

Answer:

aj pa wo is ei id dp ap au aap so zl ap

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