How do you find the point where the graphs of #f(x)=x^3-2x# and #g(x)=0.5x^2-1.5# are tangent to each other?

1 Answer
GiĆ³
Sep 14, 2015

I found #(1,-1)# although I have the strong sensation that there is an easier way!

Explanation:

Let us try deriving both of them! We should find the slope of the tangent...to both curves!!!!
#f'(x)=3x^2-2#
#g'(x)=2*1/2x=x#

Let us set them equal:
#3x^2-2=x#
Using the Quadratic Formula you get:
#x_(1,2)=(1+-sqrt(1+24))/6=#
#x_1=1#
#x_2=-2/3#
Apparently we have 2 possible #x# values where the two curves share the tangent with the same inclination. Let us use these values to find #y#:
#x_1=1# #y_1=-1# FOR BOTH
#x_2=-2/3# #y_(2a)=28/27# first curve
#y_(2b)=-23/18# for the second curve.
This means that at #x_2# the curves have the tangent with the same inclination but they do not touch each others!

Graphically you can see the tangents (in black):
enter image source here

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