Can a whole Arithmetic Progression be determined by just any two non-consecutive terms of the Arithmetic Progression?

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Safeer PP · Accepted Answer

Yes, it could be done efficiently by using the nth term formula. There would be two unknowns, namely the first term and the common difference, and we would have two equations with us; solving them, we would get those. And once the first term and common difference are calculated then, Arithmetic Progression could be determined.

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Can a whole Arithmetic Progression be determined by just any two non-consecutive terms of the Arithmetic Progression?

Related Questions

Can the sum of n terms of the Arithmetic Progression be negative?

How can we find the Common Difference of the Arithmetic Progression?

Who is the father of Arithmetic progression(AP)?

How can we find that a particular term belongs to a certain Arithmetic Progression?

Write some applications of Arithmetic progression(AP) in our daily life.

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