If `y=e^(4x) sin 3x`, find `(d^(2)y)/(dx^(2)).`

1.	If `y=e^(4x) sin 3x`, find `(d^(2)y)/(dx^(2)).`
Answer» Let `y=e^(4x)sin 3x.` Then, `(dy)/(dx)=3e^(4x)cos3x+4e^(4x)sin 3x=e^(4x)(3cos 3x+4sin3x).` `therefore (d^(2)y)/(dx^(2))=(d)/(dx)((dy)/(dx)){e^(4x)(3cos 3x+4sin3x)}` `=e^(4x)(-9sin 3x+12 3x)+4e^(4x)(3cos 3x+4sin 3x)` `=e^(4x)(7sin 3x+24 cos 3x).`

Discussion

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