BackIn Exercises 1–8, parametric equations and a value for the parameter t are given. Find the coordinates of the point on the plane curve described by the parametric equations corresponding to the given value of t. x = t² + 3, y = 6 − t³; t = 2
Graph each plane curve defined by the parametric equations for t in [0, 2π] Then find a rectangular equation for the plane curve. See Example 3.
x = 2 cos t , y = 2 sin t
Graph the plane curve formed by the parametric equations and indicate its orientation.
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Graph each plane curve defined by the parametric equations for t in [0, 2π] Then find a rectangular equation for the plane curve. See Example 3.
x = 2 + sin t , y = 1 + cos t
For each plane curve, (a) graph the curve, and (b) find a rectangular equation for the curve. See Examples 1 and 2.
x = t + 2 , y = t ―4 , for t in (― ∞ , ∞)
Graph each plane curve defined by the parametric equations for t in [0, 2π] Then find a rectangular equation for the plane curve. See Example 3.
x = 1 + cos t , y = sin t ― 1