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Margot is walking in a straight line from a point 20 feet due east of a statue in a park toward a point 12 feet due north of the statue. She walks at a constant speed of 5 feet per second. (a) Write parametric equations for Margot's position t seconds after she starts walking.

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Answer:

a) [tex]x = 20\,ft - \left(12\,\frac{ft}s}\cdot \cos 59.036^{\textdegree} \right)\cdot t[/tex], [tex]y = 0\,ft +\left(12\,\frac{ft}{s}\cdot \sin 59.036^{\textdegree}\right)\cdot t[/tex]

Step-by-step explanation:

Let consider +x and +y the north and east directions. Given that Margot travels at constant speed, the formula is:

[tex]v = \frac{s}{t}[/tex]

Where:

[tex]t[/tex] - Time, in seconds.

[tex]s[/tex] - Travelled distance, in meters.

The traveled distance is:

[tex]s = v\cdot t[/tex]

a) The parametric equations are described below:

[tex]x = 20\,ft - \left(12\,\frac{ft}s}\cdot \cos 59.036^{\textdegree} \right)\cdot t[/tex]

[tex]y = 0\,ft +\left(12\,\frac{ft}{s}\cdot \sin 59.036^{\textdegree}\right)\cdot t[/tex]

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