1. Give parametric equations x(t), y(t), and bounds for
t
that produce a path from (3,0) to (5,7).
2. Give parametric equations x(t), y(t), and bounds for
t
that produce a unit circle (centered at the origin) beginning at (1,0).
3. Plot the vector field F(x,y) = i + j for the points
(0,0), (2,0), (0,2), and (-3,-2).
1. Give parametric equations x(t), y(t), z(t),
and bounds for t that produce a path from (-2,7, 1) to (a,b,c).
2. Give parametric equations x(t), y(t), and bounds for
t
that produce an arc of a circle (centered at the origin) of radius
a
beginning at (0,a) and continuing counterclockwise through
n
quadrants.
3. Plot the vector field F(x,y) = yi - xj for one point
on each of the positive and negative x and y axes, and for one point in
each of the four quadrants.