Answer:
-22.2 m/s²
Explanation:
The equation for position x for a constant acceleration a, time t and initial velocity v₀, initial position x₀:
(1) [tex]x=\frac{1}{2}at^2+v_0t+x_0[/tex]
For rocket A the initial and final position: x = x₀= 0. Using these values in equation 1 gives:
(2) [tex]0=\frac{1}{2}at^2+v_0t[/tex]
Solving for time t:
[tex]-\frac{1}{2}at^2=v_0t[/tex]
(3) [tex]t=-\frac{2v_0}{a}[/tex]
The times for both rockets must be equal, since they start and end at the same location. Using equation 3 for rocket A and B gives:
(4) [tex]\frac{v_{0A}}{a_A}=\frac{v_{0B}}{a_B}[/tex]
Solving equation 4 for acceleration of rocket B:
(5) [tex]a_B=a_A\frac{v_{0B}}{v_{0A}}[/tex]
