The Sieve of Sundaram is an infinite table of arithmetic sequences - Leaving Cert Mathematics - Question 5 - 2018

To find the number in the 60th row and 70th column, we first need to determine the structure of the table.

1. The formula for determining the number in any row (r) and column (c) is:

   $T(r, c) = 4 + (r - 1) + (c - 1)(r + c - 2)$

2. Substituting r = 60 and c = 70:

   $T(60, 70) = 4 + (60 - 1) + (70 - 1)(60 + 70 - 2)$

   Simplifying yields:

   $= 4 + 59 + 69(128)$

   Performing calculations gives:

   $= 4 + 59 + 8832$

   Therefore, the value is:

   $T(60, 70) = 8895$

Given the first two terms a₁ = 4 and a₂ = 2, we can calculate the next terms using the provided general term relation:

1. Next Terms Calculation:
   • a₃ = a₂ - a₁ = 2 - 4 = -2
   • a₄ = a₃ - a₂ = -2 - 2 = -4
   • a₅ = a₄ - a₃ = -4 - (-2) = -2
   • a₆ = a₅ - a₄ = -2 - (-4) = 2
   • a₇ = a₆ - a₅ = 2 - (-2) = 4
   • a₈ = a₇ - a₆ = 4 - 2 = 2

Now we observe a repeating pattern: 4, 2, -2, -4.

2. Finding a₂₀₁₉:
   • The sequence consists of 6 terms: 4, 2, -2, -4, -2, 2.
   • Notice the pattern every 6 terms: we can calculate a₂₀₁₉ considering the periodicity of 6.
   • 2019 mod 6 = 3 yields a value of a₃ = -2.
   • Therefore, a₂₀₁₉ = -2.