Problem Two. A hollow sphere with rotational inertia 1-(2/3)MR2 is moving with speed v down an incline of angle 6 toward a spring with spring constant k. After traveling a distance d down the incline with no slipping, the sphere makes contact with the spring and compresses it a distance x before it comes momentarily to rest. 2.) Find the distance d in terms of the other quantities given. (A) d = 2Mg sin kx²-Mv2 kx²+Mv² +x (B) d = +x 2Mg sin (D) d=- kx²-Mv² 2Mg cos -x (E) d = 2Mg sin kx²- Mv² -x ト wwwwww e (C) d= kx²-Mv² 2Mg sin -x
Problem Two. A hollow sphere with rotational inertia 1-(2/3)MR2 is moving with speed v down an incline of angle 6 toward a spring with spring constant k. After traveling a distance d down the incline with no slipping, the sphere makes contact with the spring and compresses it a distance x before it comes momentarily to rest. 2.) Find the distance d in terms of the other quantities given. (A) d = 2Mg sin kx²-Mv2 kx²+Mv² +x (B) d = +x 2Mg sin (D) d=- kx²-Mv² 2Mg cos -x (E) d = 2Mg sin kx²- Mv² -x ト wwwwww e (C) d= kx²-Mv² 2Mg sin -x
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Transcribed Image Text:Problem Two. A hollow sphere with rotational inertia
1-(2/3)MR2 is moving with speed v down an incline of angle
6 toward a spring with spring constant k. After traveling a
distance d down the incline with no slipping, the sphere
makes contact with the spring and compresses it a distance x
before it comes momentarily to rest.
2.) Find the distance d in terms of the other quantities given.
(A) d =
2Mg sin
kx²-Mv2
kx²+Mv²
+x
(B) d =
+x
2Mg sin
(D) d=-
kx²-Mv²
2Mg cos
-x
(E) d =
2Mg sin
kx²- Mv²
-x
ト
wwwwww
e
(C) d=
kx²-Mv²
2Mg sin
-x
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