can you please solve number 3, thanks

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1. Solve the following differential equations using any of the methods discussed up to Lecture 8: 1. (x+a)y' = bx – ny; a, b, and n are constants with n + 0,n ± 1 2. (1+t²) ds + 2t[st² – 3(1+t²)²]dt = 0; when t = 0,s = 0 %3D 4. x*yl = –x³y – csc(xy) 6. xy(dx – dy) = x²dy+y² dx 3. y' = 1+ 3y tan x %3D 5. y(y² + 1) dx +x(y² – 1) dy = 0 7.x(x² – y² – x) dx – y(x² – y²) dy = 0 when x=0, y=0 8. y dx = (3x + y³ – y²) dy; when x=1, y=-1 %3D %3D 9. (y – cos² x) dx + cos x dy = 0 10. [1+y tan(xy)] dx + x tan(xy) dy = 0 %3D 11. (x³ + xy² – y) dx + (y3 + x²y + x) dy = 0 12. (sin x sin y+tan x) dx cos x cos y dy = 0 |