Use the method of variation of parameters to find a particular solution of the g

Yasmin

Yasmin

Answered question

2021-10-26

Use the method of variation of parameters to find a particular solution of the given differential equation.
y+y=csc2x

Answer & Explanation

pierretteA

pierretteA

Skilled2021-10-27Added 102 answers

Take a look at the differential equation.
y +y=csc2x
Finding a certain solution is the goal. yp of the given equation.
The homogeneous equation connected to the previous equation is
y +y=0
Equation that is auxiliary to the homogeneous differential equation is
r2+1=0
r2=1
r=±1
r=±i
Consequently, the auxiliary equation's roots are
r1=i, r2=i
Consequently, the complimentary role is
yc(x)=c1cosx+c2sinx
We have
y1(x)=cosx y2(x)=sinx
y1(x)=sinx y2(x)=cosx
Hence,
W=W(y1,y2)
W=[cosxsinxsinxcosx]
W=cos2x+sin2x
W=1
Here,
f(x)=csc2x
The specific response is provided by
yp(x)=(y2(x)f(x) dx W(x))y1(x)+(y1(x)f(x) dx W(x))y2(x)
yp(x)=(sinxcsc2x dx )cosx+(cosxcsc2x dx )sinx
yp(x)=(sinxsin2x dx )cosx+(cosxsin2x dx )sinx
 

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