Travels with My Ant: The Curtate and Prolate Cycloids Earlier in this section, we looked at the parametric equations for a cycloid, which is the path a point on the edge of a wheel traces as the wheel rolls along a straight path. In this project we look at two different variations of the cycloid, called the curtate and prolate cycloids. First, let’s revisit the derivation of the parametric equations for a cycloid. Recall that we considered a tenacious ant trying to get home by hanging onto the edge of a bicycle tire. We have assumed the ant climbed onto the tire at the very edge, where the tire touches the ground. As the wheel rolls, the ant moves with the edge of the tire (Figure 7.13). As we have discussed, we have a lot of ?exibility when parameterizing a curve. In this case we let our parameter t represent the angle the tire has rotated through. Looking at Figure 7.13, we see that after the tire has rotated through an angle of t, the position of the center of the wheel, C = ( x C , y C ) , is given by x C = a t and y C = a . Furthermore, letting A = ( x A , y A ) denote the position of the ant, we note that x C − x A = a sin t and y C − y A = a cos t . Then x A = x C − a sin t = a t − a sin t = a ( t − sin t ) y A = y C − a cos t = a − a cos t = a ( 1 − cos t ) . Figure 7.13 (a) The ant clings to the edge of the bicycle tire as the tire rolls along the ground. (b) Using geometry to determine the position of the ant after the tire has rotated through an angle of t. Note that these are the same parametric representations we had before, but we have now assigned a physical meaning to the parametric variable t. After a while the ant is getting dizzy from going round and round on the edge of the tire. So he climbs up one of the spokes toward the center of the wheel. By climbing toward the center of the wheel, the ant has changed his path of motion. The new path has less up—and-down motion and is called a curtate cycloid (Figure 7.14). As shown in the figure, we let b denote the distance along the spoke from the center of the wheel to the ant. As before, we let t represent the angle the tire has rotated through. Additionally, we let C = ( x C , y C ) represent the position of the center of the wheel and A = ( x A , y A ) represent the position of the ant. Figure 7.14 (a) The ant climbs up one of the spokes toward the center of the wheel. (b) The ant’s path of motion after he climbs closer to the center of the wheel. This is called a curtate cycloid. (c) The new setup, now that the ant has moved closer to the center of the wheel. 4. Using the same approach you used in parts 1— 3, find the parametric equations for the path of motion of the ant.
Travels with My Ant: The Curtate and Prolate Cycloids Earlier in this section, we looked at the parametric equations for a cycloid, which is the path a point on the edge of a wheel traces as the wheel rolls along a straight path. In this project we look at two different variations of the cycloid, called the curtate and prolate cycloids. First, let’s revisit the derivation of the parametric equations for a cycloid. Recall that we considered a tenacious ant trying to get home by hanging onto the edge of a bicycle tire. We have assumed the ant climbed onto the tire at the very edge, where the tire touches the ground. As the wheel rolls, the ant moves with the edge of the tire (Figure 7.13). As we have discussed, we have a lot of ?exibility when parameterizing a curve. In this case we let our parameter t represent the angle the tire has rotated through. Looking at Figure 7.13, we see that after the tire has rotated through an angle of t, the position of the center of the wheel, C = ( x C , y C ) , is given by x C = a t and y C = a . Furthermore, letting A = ( x A , y A ) denote the position of the ant, we note that x C − x A = a sin t and y C − y A = a cos t . Then x A = x C − a sin t = a t − a sin t = a ( t − sin t ) y A = y C − a cos t = a − a cos t = a ( 1 − cos t ) . Figure 7.13 (a) The ant clings to the edge of the bicycle tire as the tire rolls along the ground. (b) Using geometry to determine the position of the ant after the tire has rotated through an angle of t. Note that these are the same parametric representations we had before, but we have now assigned a physical meaning to the parametric variable t. After a while the ant is getting dizzy from going round and round on the edge of the tire. So he climbs up one of the spokes toward the center of the wheel. By climbing toward the center of the wheel, the ant has changed his path of motion. The new path has less up—and-down motion and is called a curtate cycloid (Figure 7.14). As shown in the figure, we let b denote the distance along the spoke from the center of the wheel to the ant. As before, we let t represent the angle the tire has rotated through. Additionally, we let C = ( x C , y C ) represent the position of the center of the wheel and A = ( x A , y A ) represent the position of the ant. Figure 7.14 (a) The ant climbs up one of the spokes toward the center of the wheel. (b) The ant’s path of motion after he climbs closer to the center of the wheel. This is called a curtate cycloid. (c) The new setup, now that the ant has moved closer to the center of the wheel. 4. Using the same approach you used in parts 1— 3, find the parametric equations for the path of motion of the ant.
Travels with My Ant: The Curtate and Prolate Cycloids
Earlier in this section, we looked at the parametric equations for a cycloid, which is the path a point on the edge of a wheel traces as the wheel rolls along a straight path. In this project we look at two different variations of the cycloid, called the curtate and prolate cycloids.
First, let’s revisit the derivation of the parametric equations for a cycloid. Recall that we considered a tenacious ant trying to get home by hanging onto the edge of a bicycle tire. We have assumed the ant climbed onto the tire at the very edge, where the tire touches the ground. As the wheel rolls, the ant moves with the edge of the tire (Figure 7.13).
As we have discussed, we have a lot of ?exibility when parameterizing a curve. In this case we let our parameter t represent the angle the tire has rotated through. Looking at Figure 7.13, we see that after the tire has rotated through an angle of t, the position of the center of the wheel,
C
=
(
x
C
,
y
C
)
, is given by
x
C
=
a
t
and
y
C
=
a
.
Furthermore, letting
A
=
(
x
A
,
y
A
)
denote the position of the ant, we note that
x
C
−
x
A
=
a
sin
t
and
y
C
−
y
A
=
a
cos
t
.
Then
x
A
=
x
C
−
a
sin
t
=
a
t
−
a
sin
t
=
a
(
t
−
sin
t
)
y
A
=
y
C
−
a
cos
t
=
a
−
a
cos
t
=
a
(
1
−
cos
t
)
.
Figure 7.13 (a) The ant clings to the edge of the bicycle tire as the tire rolls along the ground. (b) Using geometry to determine the position of the ant after the tire has rotated through an angle of t.
Note that these are the same parametric representations we had before, but we have now assigned a physical meaning to the parametric variable t.
After a while the ant is getting dizzy from going round and round on the edge of the tire. So he climbs up one of the spokes toward the center of the wheel. By climbing toward the center of the wheel, the ant has changed his path of motion. The new path has less up—and-down motion and is called a curtate cycloid (Figure 7.14). As shown in the figure, we let b denote the distance along the spoke from the center of the wheel to the ant. As before, we let t represent the angle the tire has rotated through. Additionally, we let
C
=
(
x
C
,
y
C
)
represent the position of the center of the wheel and
A
=
(
x
A
,
y
A
)
represent the position of the ant.
Figure 7.14 (a) The ant climbs up one of the spokes toward the center of the wheel. (b) The ant’s path of motion after he climbs closer to the center of the wheel. This is called a curtate cycloid. (c) The new setup, now that the ant has moved closer to the center of the wheel.
4. Using the same approach you used in parts 1— 3, find the parametric equations for the path of motion of the ant.
Using & Understanding Mathematics: A Quantitative Reasoning Approach (7th Edition)
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