Consider the parametric curve x = 2t^(3)-3t^(2)+2 and y = t^(3)-12t,-pi leq t leq pi . (a) Find the values of t (if any) where the slope of the line tangent to the curve is 0. (b) Find the values of t (if any) where the line tangent to the curve is vertical. (c) If the curve represents the motion of a particle, describe the general direction of the particle when t = 3. Be sure to justify your answer.

Answer:   (a) t = ±2   (b) t ∈ {0, 1}   (c) In navigation terms: east by north. The slope is about 0.42 at that point.Step-by-step explanation:(a) dy/dx = 0 when dy/dt = 0   dy/dt = 3t^2 -12 = 0 = 3(t -2)(t +2)The slope is zero at t = ±2.__(b) dy/dx = (dy/dt)/(dx/dt) = undefined when dx/dt = 0   dx/dt = 6t^2 -6t = 6(t)(t -1) = 0The slope is undefined for t ∈ {0, 1}.__(c) At t=3, dy/dx = (dy/dt)/(dx/dt) = 3(3-2)(3+2)/(6(3)(3-1)) = 15/36 = 5/12The general direction of movement is away from the origin along a line with a slope of 5/12, about 22.6° CCW from the +x direction._____The first attachment shows the derivative and its zeros and asymptotes. It also shows some of the detail of the parametric curve near the origin.The second attachment shows the parametric curve over the domain for which it is defined, along with the point where t=3.