If xy+6e^{y} = 6e, find the value of y" at the point where x = 0.

iohanetc

iohanetc

Answered question

2020-11-12

If xy+6ey=6e, find the value of y" at the point where x = 0.

Answer & Explanation

aprovard

aprovard

Skilled2020-11-13Added 94 answers

Here the Differential equations is given by xy+6ey=6e with y(0)=1y(0)=1. Taking differentiate both sides with respect to x we get (d/dx(xy+6ey))=(d/dx)6ey(d/dx(xy)+6(d/dx)ey=0y+xy+(6ey)y=0 From here putting y(0)=1y(0)=1 we get y′(0)=−1/6e. Agin differentiate both sides above expressions with respect to x we get (d/dx)(y+xy+(6ey)y)=0y+y+xy+(6ey)y2+(6ey)y=0 Now putting x=0x=0 and y(0)=1y(0)=1, y′(0)=−1/6e we get -(1/3e)6e(1/36e2)+6ey=0>6ey=1/3e+1/6e>6ey=1/2e>y=1/12e2

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