16. Parametric Equations & Polar Coordinates

Parametric Equations

16. Parametric Equations & Polar Coordinates

Parametric Equations

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Multiple Choice

Graph the plane curve formed by the parametric equations and indicate its orientation.
$x (t) = 2 t - 1$ ; $y (t) = 2 \sqrt{t}$
$t is greater than or equal to 0$

Graph of a parametric curve with arrows indicating direction, showing points plotted on a grid.

Graph of a linear parametric curve with arrows indicating direction, showing points plotted on a grid.

Verified step by step guidance

Step 1: Understand the parametric equations given: x(t) = 2t - 1 and y(t) = 2√t, with the condition t ≥ 0. These equations describe the x and y coordinates of a curve as functions of the parameter t.

Step 2: Determine the range of t. Since t ≥ 0, the parameter starts at 0 and increases. This will help establish the orientation of the curve.

Step 3: Calculate specific points on the curve by substituting values of t into the parametric equations. For example, for t = 0, x(0) = -1 and y(0) = 0; for t = 1, x(1) = 1 and y(1) = 2; for t = 4, x(4) = 7 and y(4) = 4.

Step 4: Plot the calculated points on a graph and connect them smoothly to form the curve. Ensure the orientation is indicated by arrows showing the direction of increasing t.

Step 5: Analyze the graph to confirm the shape and orientation. The curve starts at (-1, 0) and moves to the right and upward as t increases, following the calculated points and the parametric equations.