For V1=V1x^(unit vector) and V2=V2x^, it is V1>0 and V2<0. Accelerations are a1=a1x^, a2=a2x^and a3=a3y^. ropes and pulleys are massless and frictionless. Solve the problem using the coordinate system given in the figure. For m1=m2, find a1, a2, a3 in terms of (m1, m2, m3, g and µ).
For V1=V1x^(unit vector) and V2=V2x^, it is V1>0 and V2<0. Accelerations are a1=a1x^, a2=a2x^and a3=a3y^. ropes and pulleys are massless and frictionless. Solve the problem using the coordinate system given in the figure. For m1=m2, find a1, a2, a3 in terms of (m1, m2, m3, g and µ).
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For V1=V1x^(unit vector) and V2=V2x^, it is V1>0 and V2<0. Accelerations are a1=a1x^, a2=a2x^and a3=a3y^. ropes and pulleys are massless and frictionless. Solve the problem using the coordinate system given in the figure.
For m1=m2, find a1, a2, a3 in terms of (m1, m2, m3, g and µ).
Hint given in figure 2
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