How do you find the second derivative of $y^2 + x + sin y = 9$ ?

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How do you find the second derivative of $y^2 + x + sin y = 9$ ?

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Answer 1 · 2015-08-04T20:29:55

The second derivative is $y''=(sin(y)-2)/(2y+cos(y))^3$

Explanation:

Implicit differentiation gives us

$d/dx(y^2)+d/dx(x)+d/dx(sin(y))=d/dx(9)$
$2y dy/dx+1+cos(y) dy/dx=0$
$2y dy/dx+cos(y) dy/dx=-1$
$dy/dx(2y +cos(y))=-1$ . Therefore,

$y'=dy/dx=(-1)/(2y +cos(y))$ . This implies that $2y+cos(y)!=0$ .

Taking the second implicit derivative gives us
$d/dx[dy/dx(2y +cos(y))=-1]$

By application of the Product Rule, we have
$d/dx(dy/dx)(2y +cos(y))+dy/dx(2dy/dx-sin(y) dy/dx)=0$
$(d^2y)/dx^2(2y +cos(y))+2((dy)/dx)^2-sin(y) ((dy)/dx)^2=0$
$(d^2y)/dx^2(2y +cos(y))=sin(y) ((dy)/dx)^2-2((dy)/dx)^2$
$(d^2y)/dx^2=(sin(y) ((dy)/dx)^2-2((dy)/dx)^2)/((2y +cos(y)))$ or more succinctly

$y''=(y')^2(sin(y)-2)/(2y+cos(y))$
$y''=((-1)/(2y +cos(y)))^2(sin(y)-2)/(2y+cos(y))$
$y''=1/(2y +cos(y))^2(sin(y)-2)/(2y+cos(y))$
$y''=(sin(y)-2)/(2y+cos(y))^3$

Answer 2 · 2015-08-04T21:44:28

I get: $y'' = (-2+siny)/(2y+cosy)^3$

Explanation:

$x+y^2+siny = 9$

$d/dx(x+y^2+siny) = d/dx(9)$

$1 + 2y dy/dx + cosy dy/dx = 0$

$dy/dx = (-1)/(2y+cosy) = -(2y+cosy)^-1$

$d/dx(dy/dx) = 1(2y+cosy)^-2*[d/dx(2y+cosy)]$

$= (2y+cosy)^-2 [2 dy/dx - siny dy/dx]$

$= (2y+cosy)^-2 [2 - siny] dy/dx$

$= (2y+cosy)^-2 [2 - siny] [-(2y+cosy)^-1]$

$= -(2-siny)(2y+cosy)^-3$

$= (-2+siny)/(2y+cosy)^3$

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How do you find the second derivative of $y^2 + x + sin y = 9$ ?

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How do you find the second derivative of y^2 + x + sin y = 9y^2 + x + sin y = 9?

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How do you find the second derivative of $y^2 + x + sin y = 9$ ?