Answer to Question #308119 in Differential Equations for Papi Chulo

Question #308119

The differential equation

dy/dx= cos(x)(y^2 +6y+8)/(6y+16)

has an implicit general solution of the form F(x,y)=K

In fact, because the differential equation is separable, we can define the solution curve implicitly by a function in the form

F(x,y)=G(x)+H(y)=K

Find such a solution and then give the related functions requested.

F(x,y)=G(x)+H(y)=

Expert's answer

The given equation can be separated as, "\\cos x~ dx = \\dfrac{6y+16}{(y+2)(y+4)}dy".

Now using partial fractions for the term on the right hand side,

"\\begin{aligned}\n\\frac{6y+16}{(y+2)(y+4)} & = \\frac{A}{y+2} + \\frac{B}{y+4}\\\\\n6y+16 & =A(y+4) + B(y + 2)\\\\\n\\end{aligned}"

Taking "y = -4" gives, "B = 4" and taking "y = -2" gives, "A = 2".

Therefore,

"\\cos x~ dx = \\left\\{\\dfrac{2}{y+2} + \\dfrac{4}{y+4}\\right\\}dy"

Integrating both sides, we get

"\\begin{aligned}\n\\sin x &= 2\\log (y+2) + 4\\log (y+4) \\\\\n\\sin x &= \\log (y+2)^2 + \\log (y+4)^4\\\\\n\\sin x + c &= \\log \\{(y+2)^2 (y+4)^4\\}\\\\\ne^{(\\sin x) + c} &= (y+2)^2(y+4)^4\\\\\n(y+2)^2(y+4)^4 - e^{\\sin x} &= c_1~~~~(\\text{where }c_1 = e^c)\n\\end{aligned}"

Answer to Question #308119 in Differential Equations for Papi Chulo

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