Respuesta :
Answer:
after collision velocity is 87 m/s
Explanation:
given data
mass m1 = 5 g = 5× [tex]10^{-3}[/tex] kg
velocity v1 = 60 m/s
mass m2 = 2 g
velocity v2 = 0 = 2× [tex]10^{-3}[/tex] kg
angle 30°
to find out
after collision velocity v4
solution
we consider here v3 and v4 are velocity after collision
we know after collision 1st particle
v3 at x axis = v3cos30
v3 at y axis = v3sin30
and 2nd particle after collision
v4 at x axis = v4 cos 30
v4 at y axis = v4 sin30
we apply conservation of momentum here
so in x direction
m1v1 + m2v2 = m1v3 + m2v4 ...............1
put the value here
5× [tex]10^{-3}[/tex] (60) + 0 = 5× [tex]10^{-3}[/tex] ( v3cos30) + 2× [tex]10^{-3}[/tex] ( v4 cos 30 )
4.33 v3 + 1.732 v4 = 300 .......................2
in x direction
m1v1 + m2v2 = m1v3 + m2v4
5× [tex]10^{-3}[/tex] (0) + 0 = 5× [tex]10^{-3}[/tex] ( v3sin30) - 2× [tex]10^{-3}[/tex] ( - v4 sin 30 )
2.5 v3 - v4 = 0
v4 = 2.5 v3 ................................3
put equation 3 in equation 2
4.33 v3 + 1.732 (2.5 v3 ) = 300
v3 = 34.6
so
from equation 3
v4 = 2.5 (34.6)
v4 = 86.6
so after collision velocity is 87 m/s
The speed of the 2.0-g particle after the collision is mathematically given as
V4= 86.6m/s
What is the speed of the 2.0-g particle after the collision?
Question Parameter(s):
A 5.0-g particle moving 60 m/s collides with a 2.0-g particle initially at rest.
Generally, the equation for the conservation of momentum is mathematically given as
m1v1 + m2v2 = m1v3 + m2v4
Thereofore
5× (60) + 0 = 5* ( v3cos30) + 2* ( v4 cos 30 )
4.33 v3 + 1.732 v4 = 300
For the X direction
5* (0) + 0 = 5* ( v3sin30) - 2* ( - v4 sin 30 )
2.5 v3 - v4 = 0
v4 = 2.5 v3
In conclusion, comparing the equations
4.33 v3 + 1.732 (2.5 v3 ) = 300
V3 = 34.6
Hence
V4= 86.6m/s
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