1.

\fFind an equation of the tangent to the curve given by 3226*, 3,.'=(t1]2 at the point (at, y) = (1, 1). Your answer should be in the form of y = f(a:) without 53. yim) = C] Given * = sin 4t and y = cos 4t, find the following derivatives as functions of t. dy/dx = d'y/da' =Find the area of the region enclosed by the parametric equation a: = t3 3t y=3t2 C] dy (a) Find d as a function oft for the given parametric equations. a: m = t y = 1% d dm (b) Find dy as a function of t for the given parametric equations. m :1: = Qtl y 2 tie:7