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Meli · Answer 1 · 2022-11-14T17:40:01+0000

Answer:

See Below.

Explanation:

We are given the equation:

$\displaystyle y^2 = 1 + \sin x$

And we want to prove that:

$\displaystyle 2y(d^2y)/(dx^2) + 2\left((dy)/(dx)\right) ^2 + y^2 = 1$

Find the first derivative by taking the derivative of both sides with respect to x:

$\displaystyle 2y (dy)/(dx) = \cos x$

Divide both sides by 2y:

$\displaystyle (dy)/(dx) = (\cos x)/(2y)$

Find the second derivative using the quotient rule:

$\displaystyle \begin{aligned} (d^2y)/(dx^2) &= ((\cos x)'(2y) - (\cos x)(2y)')/((2y)^2)\\ \\ &= (-2y\sin x-2\cos x (dy)/(dx))/(4y^2) \\ \\ &= -(y\sin x + \cos x\left((\cos x)/(2y)\right))/(2y^2) \\ \\ &= -(2y^2\sin x+\cos ^2 x)/(4y^3)\end{aligned}$

Substitute:

$\displaystyle 2y\left(-(2y^2\sin x+\cos ^2 x)/(4y^3)\right) + 2\left((\cos x)/(2y)\right)^2 +y^2 = 1$

Simplify:

$\displaystyle (-2y^2\sin x-\cos ^2x)/(2y^2) + (\cos ^2 x)/(2y^2) + y^2 = 1$

Combine fractions:

$\displaystyle (\left(-2y^2\sin x -\cos^2 x\right)+\left(\cos ^2 x\right))/(2y^2) + y^2 = 1$

Simplify:

$\displaystyle (-2y^2\sin x )/(2y^2) + y^2 = 1$

Cancel:

$\displaystyle -\sin x + y^2 = 1$

Substitute:

$-\sin x + \left( 1 + \sin x\right) =1$

Simplify. Hence:

$1\stackrel{\checkmark}{=}1$

Q.E.D.

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$\displaystyle (dy)/(dx) = (\cos x)/(2y)$

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