ارداکنجی ardâkonji
Fr.: orthogonalité 1) The property of → orthogonal functions.
2) The following conditions satisfied by the → Fourier series: ∫ cos (mx) sin (nx) dx = 0 (summed from -π to
+π) for all m, n ∫ cos (mx) cos (nx) dx = 0 (summed from -π to
+π) for all m ≠ n,
= 2π for m = n = 0, = π for (m = n) > 0 ∫ sin (mx) sin (nx) dx = 0 (summed from -π to +π)
for m ≠ n, = π for (m = n) > 0. → orthogonal; → -ity. |