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aνxν−1y(x)+axνy′(x)+y(5)(x)=0 ✓ Mathematica : cpu = 0.471735 (sec), leaf count = 787
{{y(x)→c5(4ν+1)−16ν+4ν−16ν+4a4ν+4(xν)4(4ν+1)ν+41F4(4ν(1+4ν)+11+4ν;1+1(1+4ν)ν,1+2(1+4ν)ν,1+3(1+4ν)ν,1+4(1+4ν)ν;−a(xν)1+4ν(1+4ν)4ν4)+c4(4ν+1)−12ν+4ν−12ν+4a3ν+4(xν)3(4ν+1)ν+41F4(3ν(1+4ν)+11+4ν;1−1(1+4ν)ν,1+1(1+4ν)ν,1+2(1+4ν)ν,1+3(1+4ν)ν;−a(xν)1+4ν(1+4ν)4ν4)+c3(4ν+1)−8ν+4ν−8ν+4a2ν+4(xν)2(4ν+1)ν+41F4(2ν(1+4ν)+11+4ν;1−2(1+4ν)ν,1−1(1+4ν)ν,1+1(1+4ν)ν,1+2(1+4ν)ν;−a(xν)1+4ν(1+4ν)4ν4)+c2(4ν+1)−4ν+4ν−4ν+4a1ν+4(xν)4ν+1ν+41F4(1ν(1+4ν)+11+4ν;1−3(1+4ν)ν,1−2(1+4ν)ν,1−1(1+4ν)ν,1+1(1+4ν)ν;−a(xν)1+4ν(1+4ν)4ν4)+c11F4(11+4ν;1−4(1+4ν)ν,1−3(1+4ν)ν,1−2(1+4ν)ν,1−1(1+4ν)ν;−a(xν)1+4ν(1+4ν)4ν4)}}
✗ Maple : cpu = 0. (sec), leaf count = 0 , result contains DESol
{y(x)=DESol({d5dx5_Y(x)+axνddx_Y(x)+aνxν−1_Y(x)},{_Y(x)})}
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