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http://functions.wolfram.com/03.03.21.0030.01
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Integrate[Sin[b + a z] BesselY[\[Nu], a z], z] ==
(z ((1/((-2 + \[Nu]) Gamma[1 - \[Nu]])) (4^\[Nu] a z Cos[b] Csc[Pi \[Nu]]
HypergeometricPFQ[{3/4 - \[Nu]/2, 1 - \[Nu]/2, 5/4 - \[Nu]/2},
{3/2, 1 - \[Nu], 3/2 - \[Nu], 2 - \[Nu]/2}, (-a^2) z^2]) -
(1/Gamma[2 - \[Nu]]) (4^\[Nu] Csc[Pi \[Nu]] HypergeometricPFQ[
{1/4 - \[Nu]/2, 1/2 - \[Nu]/2, 3/4 - \[Nu]/2},
{1/2, 1/2 - \[Nu], 1 - \[Nu], 3/2 - \[Nu]/2}, (-a^2) z^2] Sin[b]) +
((a z)^(2 \[Nu]) Cot[Pi \[Nu]] (a z Cos[b] Gamma[2 + \[Nu]]
HypergeometricPFQ[{3/4 + \[Nu]/2, 1 + \[Nu]/2, 5/4 + \[Nu]/2},
{3/2, 2 + \[Nu]/2, 1 + \[Nu], 3/2 + \[Nu]}, (-a^2) z^2] +
(2 + \[Nu]) Gamma[1 + \[Nu]] HypergeometricPFQ[{1/4 + \[Nu]/2,
1/2 + \[Nu]/2, 3/4 + \[Nu]/2}, {1/2, 3/2 + \[Nu]/2, 1/2 + \[Nu],
1 + \[Nu]}, (-a^2) z^2] Sin[b]))/(Gamma[1 + \[Nu]]
Gamma[3 + \[Nu]])))/(2^\[Nu] (a z)^\[Nu])
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