So we use conservation of linear momentum in horizontal and vertical direction so we write
in horizontal direction
and in vertical directon
so
so, plug in value we get
so using this in 1st eqiuation
we get
and using this
? 2M 3.M An object of mass 3M, moving in the +x direction at speed Do,...
>= ? 2M An object of mass 3M, moving in the +x direction at speed Do, breaks into two pieces of mass M and 2M as shown in the figure. If o, = 65.0 and 02 = 23.0, determine the final velocities , and Uy of the resulting pieces in terms of vo. 3M M = ? Di = Do U2 = Uo
2M An object of mass 3M, moving in the + x[direction at speed Vo, breaks into two pieces of mass M and 2M as shown in the figure If 0 = 62.09 and 02 = 23.0", determine the final velocities v and v2 of the resulting pieces in terms of vo. 3M
2M An object of mass 3M, moving in the + x[direction at speed vo, breaks into two pieces of mass M and 2M as shown in the figure If 0, = 62.09 and 02 = 23.0", determine the final velocities U and v2 of the resulting pieces in terms of vo. 3M M
V = ? 2M An object of mass 3M, moving in the +x direction at speed vo, breaks into two pieces of mass M and 2M as shown in the figure. If 0,= 64.0 and 02 = 25.0', determine the final velocities vi and 2 of the resulting pieces in terms of Uo. 3M M * = ? UL Uo U2 = Do
2M An object of mass 3M, moving in the +x direction at speed Do breaks into two pieces of mass M and 2M as shown in the figure. If 0, = 67.0 and 02 = 22.0", determine the final velocities Vand U2 of the resulting pieces in terms of Uo. 3M M U= 00 U2 = VO
2M An object of mass 3M, moving in the +x direction at speed Do, breaks into two pieces of mass M and 2M as shown in the figure. If θη 69.0 and 02 = 22.0°, determine the final velocities Dy and v2 of the resulting pieces in terms of Uo. 3M M Vi = DO U2 = UO
V = ? 2M An object of mass 3M, moving in the +x direction at speed vo, breaks into two pieces of mass M and 2M as shown in the figure. If 01 = 68.0° and 02 = 20.0", determine the final velocities vi and v2 of the resulting pieces in terms of vo. 3M M V = ? Vi = VO U2 = VO
V = ? 2M An object of mass 3M, moving in the +x direction at speed vo, breaks into two pieces of mass M and 2M as shown in the figure. If 01 = 70.0° and 02 = 24.0°, determine the final velocities vj and v2 of the resulting pieces in terms of vo. 3M M V = ? v1 = VO v2 = VO
2M V = ? An object of mass 3M, moving in the +x direction at speed vo, breaks into two pieces of mass M and 2M as shown in the figure. If 01 = 70.0° and 02 = 24.0°, determine the final velocities v1 and v2 of the resulting pieces in terms of vo- 3M M V1 = VO v2 = VO
V2 = ? 2M An object of mass 3M, moving in the +x direction at speed vo, breaks into two pieces of mass M and 2M as shown in the figure. If 01 = 69.0° and 02 20.0°, determine the final velocities Vi and v2 of the resulting pieces in terms of vo. 3M e M V = ? Vi = 2.80 Vo Incorrect U2 = 0.51 UO Incorrect