8). The series x 0 equals 2² (1!) 2* (2!)? 2° (3!)? (i) 'v½ (x) (ii) jo(x) (iii) x Jo (x) (iv) x J/2 (x) 9).The value of Bessel function J2 (x) in term of Ji (x) and Jo (x) is (i) 2 J, (x) – x J (x) (ii) J, (x) – Jo (x) (ii) ² 1, (x) – 2 1, (x) (iv) – J, (x) – Jo (x) Jo (x)

Advanced Engineering Mathematics
10th Edition
ISBN:9780470458365
Author:Erwin Kreyszig
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Chapter2: Second-order Linear Odes
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8). The series x
Do equals
2² (1!)
24 (2!)?
2° (3!)?
(i) 'v½ (x) (ii) jo(x)
9).The value of Bessel function J2 (x) in term of J1 (x) and J, (x) is
(iii) x Jo (x)
(iv) x J1/2 (x)
(i) 2 J, (x) – x Jo (x)
(ii) ÷J, (x) – Jo (x)
2
(iii) –, (x) – J, (x)
(iv) = J, (x)
Jo (x)
10). The polynomial 2x² +.x + 3 in terms of Legendre polynomials is
Transcribed Image Text:8). The series x Do equals 2² (1!) 24 (2!)? 2° (3!)? (i) 'v½ (x) (ii) jo(x) 9).The value of Bessel function J2 (x) in term of J1 (x) and J, (x) is (iii) x Jo (x) (iv) x J1/2 (x) (i) 2 J, (x) – x Jo (x) (ii) ÷J, (x) – Jo (x) 2 (iii) –, (x) – J, (x) (iv) = J, (x) Jo (x) 10). The polynomial 2x² +.x + 3 in terms of Legendre polynomials is
9).The value of Bessel function J2 (x) in term of J¡ (x) and Jo (x) is
(i) 2 J, (x) – x J (x)
(ii) *J, (x) – Jo (x)
(iii) –J, (x) – J, (x)
(iv) – J, (x) – Jo (x)
10). The polynomial 2r² +x + 3 in terms of Legendre polynomials is
Transcribed Image Text:9).The value of Bessel function J2 (x) in term of J¡ (x) and Jo (x) is (i) 2 J, (x) – x J (x) (ii) *J, (x) – Jo (x) (iii) –J, (x) – J, (x) (iv) – J, (x) – Jo (x) 10). The polynomial 2r² +x + 3 in terms of Legendre polynomials is
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