VECTOR MECH...,STAT.+DYNA.(LL)-W/ACCESS
VECTOR MECH...,STAT.+DYNA.(LL)-W/ACCESS
11th Edition
ISBN: 9781259633133
Author: BEER
Publisher: MCG
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Chapter 18.1, Problem 18.34P

(a)

To determine

The component (ωz) of the final angular velocity of the probe.

(a)

Expert Solution
Check Mark

Answer to Problem 18.34P

The component (ωz) of the final angular velocity of the probe is 0.726rad/s_.

Explanation of Solution

Given information:

The weight of the space probe (w) is 3,000 lb.

The radius of gyration along x axis (kx) is 1.375 ft.

The radius of gyration along y axis (ky) is 1.425 ft.

The radius of gyration along z axis (kz) is 1.250 ft.

The weight of the meteorite (w) is 5 oz.

The angular velocity (ω) is (0.05rad/s)i(0.12rad/s)j+(ωz)k.

The change in velocity of the mass center of the probe (vx) is -0.675 in./s.

The width of the side panel from center to point A (b) is 9 ft.

The length of the panel from center to point A (l) is 0.75 ft.

The speed is reduced by 25 percent.

Calculation:

Calculate the mass of the space probe (m) using the formula:

w=mgm=wg

Here, g is the acceleration due to gravity.

Substitute 32.2ft/s2 for g and 3,000 lb for w.

m=3,00032.2=93.17lbs2/ft

Calculate the mass of the meteorite (m) using the formula:

w=mgm=wg

Substitute 32.2ft/s2 for g and 5 oz for w.

m=5oz×116lboz32.2=0.009705lbs2/ft

Write the relative position vector (rA) at the point (A) of impact as follows:

rA=bi+lk

Substitute 9 ft for b and 0.75 ft.

rA=(9ft)i+(0.75ft)k

Write the expression for the velocity (v0) along x, y and z axis as follows:

v0=vxi+vyj+vzk

Calculate the initial liner momentum of the meteorite using the relation:

Initial linear momentum=mv0

Substitute 0.009705lbs2/ft for m and vxi+vyj+vzk for v0.

mv0=(0.009705lbs2/ft)×(vxi+vyj+vzk)

Calculate the moment about origin (HA)O using the relation:

(HA)O=rA×mv0

Substitute (0.009705lbs2/ft)×(vxi+vyj+vzk) for mv0 and (9ft)i+(0.75ft)k for rA.

(HA)O=0.009705|ijk900.75vxvyvz|=0.009705[(0.75vy)i(9vz0.75vx)j+(9vy)k]

The speed is reduced to 25 percent.

Calculate the final liner momentum of the meteorite using the relation:

Final linear momentum=0.75mv0

Substitute 0.009705lbs2/ft for m and vxi+vyj+vzk for v0.

0.75mv0=0.75(0.009705lbs2/ft)×vxi+vyj+vzk=(0.007279)×(vxi+vyj+vzk)

Calculate the final linear momentum of meteorite and its moment about the origin using the relation:

M=rA×(0.75mv0)

Substitute (0.007279)×(vxi+vyj+vzk) for 0.75mv0 and (9ft)i+(0.75ft)k for rA.

M=0.007278|ijk900.75vxvyvz|=0.007278[(0.75vy)i(9vz0.75vx)j+(9vy)k]

The initial linear momentum of the space probe (mv0) is zero.

Calculate the final linear momentum of the space probe using the relation:

Final linear momentum=mv0

Substitute vxi+vyj+vzk for v0 and 93.17lbs2/ft for m.

mv0=93.17(vxi+vyj+vzk)

Substitute -0.675 in./s for vx.

mv0=93.17((0.675in.12ftin.)i+vyj+vzk)=93.17(0.05625i+vyj+vzk)

Calculate the final angular momentum of the space probe (HA) using the formula:

HA=m(kx2ωxi+ky2ωyj+kz2ωzk)

Substitute 93.17lbs2/ft for m, 1.375 ft for kx, 1.425 ft for ky, 1.25 ft for kz, 0.05 rad/s for ωx, and –0.12 rad/s for ωy.

HA=93.17[(1.3752×0.05)i+(1.4252×0.12)j+(1.252×ωz)k]=93.17[0.09453i0.243675j+1.5625ωzk]=8.8074i22.703j+145.58ωzk

Write the expression for the conservation of linear momentum of the probe plus the meteorite as follows:

mv0=0.75mv0+mv0

Substitute (0.009705lbs2/ft)×(vxi+vyj+vzk) for mv0, (0.007279)×(vxi+vyj+vzk) for 0.75mv0 and 93.17(0.05625i+vyj+vzk) for mv0.

{(0.009705lbs2/ft)×(vxi+vyj+vzk)[(0.007279)×(vxi+vyj+vzk)]}=[93.17(0.05625i+vyj+vzk)]{0.009705vxi+0.009705vyj+0.009705vzk(0.007279vxi+0.007279vyj+0.007279vzk)}=(5.2408i+93.17vyj+93.17vzk)5.2408i+93.17vyj+93.17vzk=(0.009705vxi+0.009705vyj+0.009705vzk0.007279vxi0.007279vyj0.007279vzk)5.2408i+93.17vyj+93.17vzk=(0.002426vxi+0.002426vyj+0.0024265vzk) (1)

Equate the i component from the Equation (1).

5.2408=0.002426vxvx=5.24080.002426vx=2,160ft/s

Equate j component from the Equation (1).

93.17vy=0.002426vy

Equate k component from the Equation (1).

93.17vz=0.002426vz

Write the expression for the conservation of angular momentum about the origin as follows:

(HA)O=M+HA

Substitute 0.009705[(0.75vy)i(9vz0.75vx)j+(9vy)k] for (HA)O, 0.007278[(0.75vy)i(9vz0.75vx)j+(9vy)k] for M, and 8.8074i22.703j+145.58ωzk for HA.

{0.009705[(0.75vy)i(9vz0.75vx)j+(9vy)k]}={0.007278[(0.75vy)i(9vz0.75vx)j+(9vy)k]}+(8.8074i22.703j+145.58ωzk)(0.00727875vyi0.087345vzj+0.00727875vxj+0.087345vyk)=(0.0054585vyi0.065502vzj+0.0054585vxj+0.065502vyk)+(8.8074i22.703j+145.58ωzk)(0.00727875vyi0.087345vzj+0.00727875vxj+0.087345vyk+0.0054585vyi+0.065502vzj0.0054585vxj0.065502vyk)=(8.8074i22.703j+145.58ωzk)(0.00182vyi0.02184vzj+0.00182vxj+0.02184vyk)=(8.8074i22.703j+145.58ωzk) (2)

Equate i component from the Equation (2).

0.00182vy=8.8075vy=8.80750.00182vy=4840ft/s

Equate k component from the Equation (2).

0.02184vy=145.58ωz

Substitute –4,840 ft/s for vy.

0.02184(4,840)=145.58ωzωz=0.02184(4,840)145.58ωz=0.726rad/s

Thus, the component (ωz) of the final angular velocity of the probe is 0.726rad/s_.

(b)

To determine

The relative velocity (v0) with which the meteorite strikes the panel.

(b)

Expert Solution
Check Mark

Answer to Problem 18.34P

The relative velocity (v0) with which the meteorite strikes the panel is (2160ft/s)i(4840ft/s)j+(860ft/s)k_.

Explanation of Solution

Given information:

The weight of the space probe (w) is 3,000 lb.

The radius of gyration along x axis (kx) is 1.375 ft.

The radius of gyration along y axis (ky) is 1.425 ft.

The radius of gyration along z axis (kz) is 1.250 ft.

The weight of the meteorite (w) is 5 oz.

The angular velocity (ω) is (0.05rad/s)i(0.12rad/s)j+(ωz)k.

The change in velocity of the mass center of the probe (vx) is –0.675 in./s.

The width of the side panel from center to point A (b) is 9 ft.

The length of the panel from center to point A (l) is 0.75 ft.

The speed is reduced by 25 percent.

Calculation:

Find the velocity along z direction:

Equate j component from the equation (2).

0.02184vz+0.00182vx=22.702

Substitute -2160 ft/s for vx.

0.02184vz+0.00182(2160)=22.7020.02184vz=22.702+3.9312vz=22.702+3.93120.02184vz=860ft/s

Calculate the relative velocity (v0) using the relation:

v0=vxi+vyj+vzk

Substitute -2160 ft/s for vx, -4840 ft/s for vy and 860 ft/s for vz.

v0=(2160ft/s)i(4840ft/s)j+(860ft/s)k

Thus, the relative velocity (v0) with which the meteorite strikes the panel is (2160ft/s)i(4840ft/s)j+(860ft/s)k_.

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Chapter 18 Solutions

VECTOR MECH...,STAT.+DYNA.(LL)-W/ACCESS

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