20/09/29 15:29:08.58 /PIEwd8l.net
sin(7θ)/sinθ は θ = ±π/7, ±2π/7, ±3π/7 で 0 だから,
sin(7θ)/sinθ
= -64Π[k=1,3] {sinθ - sin(kπ/7)}{sinθ + sin(kπ/7)}
= -64Π[k=1,3] {(sinθ)^2 - sin(kπ/7)^2}
ここで θ→0 とすれば
7 = {8 sin(π/7) sin(2π/7) sin(3π/7)}^2,
∴ sin(π/7) sin(2π/7) sin(3π/7) = (√7)/8,
なお、sin(7θ)/sinθ = U_6(cosθ) = -f(cosθ) f(-cosθ),