Answer:
At time 10.28 s after A is fired bullet B passes A.
Passing of B occurs at 4108.31 height.
Explanation:
Let h be the height at which this occurs and t be the time after second bullet fires.
Distance traveled by first bullet can be calculated using equation of motion
[tex]s=ut+0.5at^2 \\ [/tex]
Here s = h,u = 450m/s a = -g and t = t+3
Substituting
[tex]h=450(t+3)-0.5\times 9.81\times (t+3)^2=450t+1350-4.9t^2-29.4t-44.1\\\\h=420.6t-4.9t^2+1305.9 [/tex]
Distance traveled by second bullet
Here s = h,u = 600m/s a = -g and t = t
Substituting
[tex]h=600t-0.5\times 9.81\times t^2=600t-4.9t^2\\\\h=600t-4.9t^2 \\ [/tex]
Solving both equations
[tex]600t-4.9t^2=420.6t-4.9t^2+1305.9\\\\179.4t=1305.9\\\\t=7.28s \\ [/tex]
So at time 10.28 s after A is fired bullet B passes A.
Height at t = 7.28 s
[tex]h=600\times 7.28-4.9\times 7.28^2\\\\h=4108.31m \\ [/tex]
Passing of B occurs at 4108.31 height.
