Find an equation for the line tangent to y = - 3 - 3x^2 at (5, - 78). The equation for the line tangent to y = - 3 - 3x^2 at (5, – 78)y = ?((I get really close and then I get it…

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asked Oct 3, 2023 220k views

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Thiago Melo · Answer 1 · 2023-10-09T13:55:38+0000

Let's find the derivative of y:

$\begin{gathered} y=-3-3x^2 \\ (dy)/(dx)=-6x \end{gathered}$

With the derivative of the function we know its slope, therefore:

$(dy)/(dx)\begin{cases}x=5 \\ \end{cases}=-30$

Using the point-slope equation:

$\begin{gathered} Let \\ (x1,y1)=(5,-78) \end{gathered}$
$\begin{gathered} y-y1=m(x-x1) \\ y-(-78)=-30(x-5) \\ y+78=-30x+30 \\ y=-30x+72 \end{gathered}$

Find an equation for the line tangent to y = - 3 - 3x^2 at (5, - 78). The equation-example-1

Find an equation for the line tangent to y = - 3 - 3x^2 at (5, - 78). The equation for the line tangent to y = - 3 - 3x^2 at (5, – 78)y = ?((I get really close and then I get it…

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