Eliminate the arbitrary constants: y = c_{1}e^{x} + c_{2xe^{x}

zakinutuzi

zakinutuzi

Answered question

2021-12-26

Eliminate the arbitrary constants:
y=c1ex+c2xex

Answer & Explanation

otoplilp1

otoplilp1

Beginner2021-12-27Added 41 answers

Step 1
Given y=c1ex+c2xex. Since we have two arbitrary constant, so we have to differentiate two times to eliminate arbitrary constants.
Step 2
Differentiating with respect to x we get
y=c1ex+c2ex+c2xex (1)
Again differentiating with respect to x we get
yc1ex+c2ex+c2ex+c2xex (2)
Now, y2y+y=(c1ex+c2ex+c2ex+c2xex)2(c1ex+c2ex+c2xex.)+(c1ex+c2xex)=0
Hence, the required differential equation is
y2y+y=0
hysgubwyri3

hysgubwyri3

Beginner2021-12-28Added 43 answers

y=C1ex+C2xex
y=C1ex+C2xex+C2ex
yC1ex+C2xex+2C2ex
Require equation yay+by=0;
C1ex+C2xex+2C2ex+aC1ex+aC2xex+aC2ex+bC1ex+bC2xex=0.
Therefore, since e^x cannot be zero, we can divide through by ex:
C1+C2x+2C2+aC1+aC2x+aC2+bC1+bC2x=0=C2(1+a+b)x+C1(1+a+b)+C2(2+a).
We need to make the coefficients of C1 and C2 zero by choosing suitable a and b.
From this 2+a=0,tex{so}a=2,1+a+b=0=1+b,b=1.
y2y+y=0 is a second order DE that doesn't contain C1 or C2 but satisfies y.
karton

karton

Expert2022-01-10Added 613 answers

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