What is the equation of the normal line of #f(x)=5x^3+3x^2+x-5# at #x=2#?

1 Answer
Dec 31, 2015

Equation of normal is #y-49 = -1/73(x-2)# This is in Slope-Point form.

Explanation:

To find the equation of normal line we need to find the slope of the normal line and a point through which the line passes through.

We are given

#f(x)=5x^3+3x^2+x-5# and we are asked to find equation at #x=2#
First let us find #y# when #x=2#

#y=f(2)=5(2)^3+3(2)^2+(2)-5#
#y=f(2) = 5(8)+3(4)+2-5#
#y=f(2)=40+12-3#
#y=49#

Now we have a point #(2,49)#

The slope of the tangent can be found by finding the derivative of #f(x)# and evaluated at #x=2#

#f(x)=5x^3+3x^2+x-5#
#f'(x) = 15x^2+6x+1#
#m=f'(2)=15(2)^2+6(2)+1#
#m=15(4)+12+1#
#m=60+12+1#
#m=73#

Slope of normal #m_"normal" = -1/m#
Slope of normal #m_"normal" = -1/73#
Equation of a line passing through a point #(x_1,y_1)# and slope #m# is given by

#y-y_1 = m(x-x_1)#

Here we have the point #(2,49) # and slope #-1/73#

Equation of normal is #y-49 = -1/73(x-2)#