Question: 1. Solve the linear first-order ODE (x] + 1) dy A. y = C+ 2(x3+ 1)-3/2, where C is an arbitrary constant. B. y= 4+

1. Solve the linear first-order ODE (x] + 1) dy A. y = C+ 2(x3+ 1)-3/2, where C is an arbitrary constant. B. y= 4+ C(x3 + 1)2, where C is an arbitrary constant C. #= -2+0(s' + 1)-2, where C is an arbitrary constant. D. y = 4+ C(x3 + 1)-5/2, where C is an arbitrary constant. E. y = 2+ C(x' + 1)-2/3, where C is an arbitrary constant. F. y= 4+ C(x3 + 1)3/5, where C is an arbitrary constant. G. y = 2+ C(x + 1)-3/3, where O is an arbitrary constant

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