It is = 4x^3 + 12x^2 and, at x = −1, = 4(−1)^3 + 12(−1)^2 = 8.
Now, we have the slope of the tangent line and a point that it goes through. We can use the
point-slope formula for the equation of a line, (y − y 1 ) = m(x − x 1 ), and plug in what we have
just found.
We get
(y + 3) = 8(x + 1), which can be rewritten as y = 8x + 5(b) Find the coordinates of the absolute minimum.
First, we set the derivative equal to zero and solve for x.
= 4x^3 + 12x^2 = 04 x^2 (x + 3) = 0x = 0 or x = −3Now, we can use the second derivative test to determine whether a critical value is the x-
coordinate of a minimum or a maximum. The second derivative test is the following:
If c is a critical point, thenc is the x-coordinate of a maximum if f′′ (c) < 0, andc is the x-coordinate of a minimum if f′′ (c) > 0.By the way, c is the x-coordinate of a point of inflection if f′′ (c) = 0, and the second derivative
changes sign at that point.
So now we need to find the second derivative.
= 12x^2 + 24xIf we plug in x = −3, we get
= 12(−3)^2 + 24(−3) = 36
So, the curve has a minimum at x = −3. Finally, to get the y-coordinate of the minimum, we plug
x = −3 into the original equation to get