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Let \( a_n \) and \( b_n \) be two sequences such that \( a_n = 13 + 6(n-1) \) and \( b_n = 15 + 7(n-1) \) for all natural numbers \( n \). Then, the largest three digit integer that is common to both these sequences, is

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Let \( a_n \) and \( b_n \) be two sequences such that \( a_n = 13 + 6(n-1) \) and \( b_n = 15 + 7(n-1) \) for all natural numbers \( n \). Then, the largest three digit integer that is common to both these sequences, is ยท CATKing Forum

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Let \( a_n \) and \( b_n \) be two sequences such that \( a_n = 13 + 6(n-1) \) and \( b_n = 15 + 7(n-1) \) for all natural numbers \( n \). Then, the largest three digit integer that is common to both these sequences, is

Started 2 months ago by vinay kalsariya in

0 replies 77 views
  • No one is replied to this thread yet. Be first to reply!

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