Consider the function f(x)=x³+x²-6x+1. Find all the points on the graph of f where the tangent line has slope of -1?

2 Answers
Mar 22, 2018

Well, if we want to find when the slope of the tangent is -1, let's take a derivative!

#f'(x) = 3x^2 + 2x - 6 #

Now #f'(x)# is the slope of the tangent line, so we set it equal to -1:

#-1 = 3x^2 + 2x - 6 implies 3x^2 + 2x -5 = 0 #
This is a quadratic, which we can solve. I did it by manually factoring, but you can also use quadratic formula if you'd like.
#3x^2 + 2x - 5 = (3x+5)(x-1) #
So this is solved when # x in {1, -5/3}#

Plugging this into f(x) gives us the positions where the slope is -1:
#f(1) = 1 + 1 - 6 + 1 = -3 #
#f(-5/3) = -125/27 + 25/9 + 10 + 1 = 247/27 #

So our final answer is:
#(1, -3) and (-5/3, 247/27) #

Mar 22, 2018

#(1, -3), (-5/3, -158/27)#

Explanation:

The points at which the tangent line to #f(x)# has a slope of #-1# are the points at which the derivative of our function #f'(x)=-1#.

#f'(x)=3x^2+2x-6# (As per the Power Rule)

Now, let's solve this for #-1:#

#3x^2+2x-6=-1#

#3x^2+2x-5=0#

Using the quadratic formula:

#x=(-2+-sqrt(64))/6=(-2+-8)/6=1, -5/3#

So, at #x=1, -5/3,# the tangent line has a slope of #-1.# To find the coordinates, let's evaluate #f(1), f(-5/3):#

#f(1)=1^3+1^2-6(1)+1=-3#

#(1, -3)#

#f(-5/3)=-125/27+25/9-15/3+1=-125/27+75/27-135/27+27/27=-158/27#