Putnam 51/A3 solution

11th Putnam 1951

Problem A3

Find ∑₀^∞ (-1)ⁿ/(3n + 1).

Solution

We have ln(1 + x) = x - x²/2 + x³/3 - x⁴/4 + ... (1). Put ω = e^2πi/3, so that ω³ = 1 and 1 + ω + ω² = 1. Then ω² ln(1 + ωx) = x - ωx²/2 + ω²x³/3 - x⁴/4 + ... (2) and w ln(1 + ω²x) = x - ω²x²/2 + ωx³/3 - x⁴/4 + ... (3).

Adding (1), (2), (3) we get 3(x - x⁴/4 + x⁷/7 - ... ) = ln(1 + x) + ω² ln(1 + ωx) + ω ln(1 + ω²x). Hence the required series sums to 1/3 (ln 2 + ω² ln(1 + ω) + ω ln(1 + ω²) ).

If k = ln(1 + ω), then e^k = 1 + ω = - ω² = e^iπ/3, so k = iπ/3. Hence ω² ln(1 + ω) = -(1 + i√3)/2 iπ/3 = π/2√3 - iπ/6. Similarly, ω ln(1 + ω²) = -iπ/3 (-1/2 + i√3/2) = π/2√3 + iπ/6. Hence the series sums to 1/3 ln 2 + π/3√3.

11th Putnam 1951