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प्रश्न
Solve the following differential equation:
`(cos^2y)/x dy + (cos^2x)/y dx` = 0
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उत्तर
`(cos^2y)/x dy + (cos^2x)/y dx` = 0
∴ y cos2y dy + x cos2 x dx = 0
∴ `x((1 + cos2x)/2) dx + y((1 + cos 2y)/2) dy` = 0
∴ x(1 + cos 2x) dx + y(1 + cos 2y)dy = 0
∴ x dx + x cos 2x dx + y dy + y cos 2y dy = 0
Integrating both sides, we get
`int xdx + int y dy + int x cos 2x dx + int y cos 2y dy = c_1` .....(i)
Using integration by parts
`int x cos 2x dx = x int cos 2x dx - int [d/dx (x) int cos 2x dx]dx`
= `x((sin 2x)/2) - int 1. (sin 2x)/2 dx`
= `(x sin 2x)/2 + 1/2 . (cos 2x)/2`
= `(x sin 2x)/2 + (cos 2x)/4`
Similarly, `int y cos 2y dy = (y sin 2y)/2 + (cos 2y)/4`
∴ From equation (i), we get
`x^2/2 + y^2/2 + (x sin 2x)/2 + (cos 2x)/4 + (y sin 2y)/2 + (cos 2y)/4` = c1
Multiplying throughout by 4, this becomes
2x2 + 2y2 + 2x sin 2x + cos 2x + 2y sin 2y + cos 2y = 4c1
∴ 2(x2 + y2) + 2(x sin 2x + y sin 2y) + cos 2y + cos 2x + c = 0
where c = – 4c1
This is the general solution.
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