How do you find the equation of a line tangent to the function #y=x^3-6x+1# at x=2?

1 Answer
Steve M
Nov 16, 2016

# y = 6x-15 #

Explanation:

We have

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

The gradient of the tangent at any particular point is given by the derivative: So differntiating wrt #x# we have,

# dy/dx=3x^2-6 #

When #x=2 => y=8-12+1=-3 #
And, # dy/dx = (3)(4)-6=6 #

So the tangent passes through #(2,-6)# and has gradient #m=6#, so using the equation #y-y_1=m(x-x_1)# the tangent equation is:
# y-(-3) = 6(x-2) #
# :. y+3 = 6x-12 #
# :. y = 6x-15 #

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