Dynamics Class Notes Ch2 IV
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Transcript of Dynamics Class Notes Ch2 IV
![Page 1: Dynamics Class Notes Ch2 IV](https://reader035.fdocuments.us/reader035/viewer/2022081412/545dfb2bb1af9fed538b47c6/html5/thumbnails/1.jpg)
The description of the Plane Curvilinear Motion by the normal-tangential (n-t) coordinates & the
Polar Coordinates
Lecture IV
t
nPA
PB
PC
t
n
t
nPath
y
x
Pr
r
Path
O
Polar coordinate
s
Normal-Tangential coordinates
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Plane Curvilinear Motion – Normal-Tangential (n-t)
Coordinates
t
nPA
PB
PC
t
n
t
nPath
Here, the curvilinear motions measurements are made along the tangent (t) and the normal (n) to the path.
n-t coordinates are considered to move along the path with the particle.
The positive direction of the normal (n) always points to the center of curvature of the path; while the positive direction of the tangent (t) is taken in the direction of particle advance (for convenience).
et & en are the unit vectors in t-direction and n-direction, respectively.
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(n-t) Coordinates - VelocityNote: is the radius of curvature and d is the increment in the angle (in radians)
(after dt)
tt evv
dt
d
dt
dsvt
Note: as mentioned before that the velocity vector v is always tangent to the path; thus, the velocity has only one component in the n-t coordinates, which is in the t-direction. This means that vn = 0.
Its magnitude is:
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(n-t) Coordinates - Acceleration
Note: et, in this case, has a non-zero derivative, since it changes its direction. Its magnitude remains constant at 1.
tttt
ttevev
dt
evddt
d
a
va
?
t
ntn
t
n
t
nt
vdtds
eeedt
d
dt
ed
dt
ed
ededed
:But
:by Dividing
)after dt(
Note: the vector det , in the limit, has a magnitude equal to the length of the arc |et|d=d. The direction of det is given by en.
Thus,
nt
tt ev
ev
2
a
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(n-t) Coordinates – Acceleration (Cont.)
22
22
tn
tn
tt
aaa
vv
a
sva
Its magnitude is:
Notes:
-an always directed toward the center of curvature.
-at positive if the speed v is increasing and negative if v is decreasing.
= , thus an = 0
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(n-t) Coordinates – Circular Motion
tt
n
tt
t
vrr
va
rva
rv
22
For a circular path: = r
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n-t Coordinates Exercises
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Exercise # 1
2/97: A particle moves in a circular path of 0.4 m radius. Calculate the magnitude a of the acceleration of the particle (a) if its speed is constant at 0.6 m/s and (b) if its speed is 0.6 m/s but is increasing at the rate of 1.2 m/s each second. .
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Exercise # 22/101: The driver of the truck has an acceleration of 0.4g as the truck passes over the top A of the hump in the road at constant speed. The radius of curvature of the road at the top of the hump is 98 m, and the center of mass G of the driver (considered a particle) is 2 m above the road. Calculate the speed v of the truck.
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Exercise # 32/110: Write the vector expression for the acceleration a of the mass center G of the simple pendulum in both n-t and x-y coordinates
for the instant when = 60° if = 2.00 rad/s
and .. = 2.45 rad/s2.
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Exercise # 42/118: The design of a camshaft-drive system of a four cylinder automobile engine is shown. As the engine is revved up, the belt speed v changes uniformly from 3 m/s to 6 m/s over a two-second interval. Calculate the magnitudes of the accelerations of points P1 and P2 halfway through this time interval.
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Exercise # 52/128: The pin P is constrained to move in the slotted guides which move at right angles to one another. At the instant represented, A has a velocity to the right of 0.2 m/s which is decreasing at the rate of 0.75 m/s each second. At the same time, B is moving down with a velocity of 0.15 m/s which is decreasing at the rate of 0.5 m/s each second. For this instant determine the radius of curvature of the path followed by P.
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Plane Curvilinear Motion – Polar Coordinates
Here, the curvilinear motions measurements are made by the radial distance (r) from a fixed pole and by an angular measurement () to the radial line.
The x-axis is used as a reference line for the measurement of . er & e are the unit vectors in r-direction and -direction,
respectively.
y
x
Pr
r
Path
O
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Polar Coordinates – Position & Velocity
tt evv
Note: from (b), der is in the positive -direction and de in the negative r-direction
rerr
The position vector of the particle:
rr
terer
dt
erd
dt
d v r
v
The velocity is:?
)after dt(
)after dt(
rr
r
r
rr
r
r
ee edt
dθ
dt
ed
eeedt
dθ
dt
ed
dt
ed
ededed
ed
ededed
:by Dividing
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Polar Coordinates – Velocity (Cont.)
erer r v
Thus, the velocity is:
22
vvv
rv
rv
r
r
Its magnitude is:
Due to rotation of r
Due to the rate at which the vector stretches
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Polar Coordinates - Acceleration
ererererer
dt
ererd
dt
d
rr
r
a
va
Rearranging,
errerr r 2a 2
22
2
2
aaa
rra
rra
r
r
Its magnitude is:
Coriolis acceleration
Centripetal acceleration
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Polar Coordinates – Circular Motion
ra
ra
rv
v
r
r
2
0For a circular path: r = constant
Note: The positive r-direction is in the negative n-direction, i.e. ar = - an
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Polar Coordinates
Exercises
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Exercise # 6 2/131: The boom OAB pivots about point O, while
section AB simultaneously extends from within section OA. Determine the velocity and acceleration of the center B of the pulley for the following conditions: = 20°,
= 5 deg/s, = 2 deg/s2, l = 2
m, l = 0.5 m/s, l
= -1.2 m/s2. The quantities l
and l
are the first and second time derivatives, respectively, of the length l of section AB.
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Exercise # 72/133: The position of the slider P in the rotating slotted arm OA is controlled by a power screw as shown. At the instant represented, . = 8 rad/s and .. = -20 rad/s2. Also at this same instant, r = 200 mm, r. = -300 mm/s, and r.. = 0. For this instant determine the r- and -components of the acceleration of P .
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Exercise # 82/142: At the bottom of a loop in the vertical (r-) plane at an altitude of 400 m, the airplane P has a horizontal velocity of 600 km/h and no horizontal acceleration. The radius of curvature of the loop is 1200 m. For the radar tracking at O, determine the recorded values of r.. and .. for this instant.