What is the equation of the normal line

Alessandra Carrillo

Alessandra Carrillo

Answered question

2022-04-09

What is the equation of the normal line of f(x)=(x3)3(x+2) at x=-1?

Answer & Explanation

gsmckibbenx7ga

gsmckibbenx7ga

Beginner2022-04-10Added 17 answers

First, find the point on the curve that the normal line will pass through:
f(1)=(4)3(1)=64
So the normal line passes through (-1, -64).
Now recall that the normal line is perpendicular to the line tangent to the curve. So, if we know the slope of the tangent line at this point, we take its opposite reciprocal to find the slope of the perpendicular normal line.
To find the slope of the tangent line we take the derivative of the function. We could expand (x3)3(x+2) into a polynomial but it might be easier to just use the product rule, since it's given already in this factored form.
f(x)=(ddx(x3)3)(x+2)+(x3)3(ddx(x+2))
We use the chain rule on ddx(x3)3. Note ddx(x+2)=1.
f(x)=3(x3)2(ddx(x3))(x+2)+(x3)3(1)
Moreover, ddx(x3)=1, so:
f(x)=3(x3)2(x+2)+(x3)3
f(x)=(x3)2[3(x+2)+(x3)]
f(x)=(x3)2(4x+3)
Then the slope of the tangent line at x=-1 is:
f(1)=(4)2(1)=16
Thus, the slope of the normal line is 116.
The line passing through (-1, -64) with slope 116 is:
y+64=116(x+1)

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