Answer:
9.98 m/s
Explanation:
The force acting on the particle is defined by the equation:
[tex]F=(0.850) sin (\frac{x}{2.00})[/tex] [N]
where x is the position in metres.
The acceleration can be found by using Newton's second law:
[tex]a=\frac{F}{m}[/tex]
where
m = 150 g = 0.150 kg is the mass of the particle. Substituting into the equation,
[tex]a=\frac{0.850}{0.150}sin (\frac{x}{2.00})=5.67 sin(\frac{x}{2.00})[/tex] [m/s^2]
When x = 3.14 m, the acceleration is:
[tex]a=5.67 sin(\frac{3.14}{2.00})=5.67 m/s^2[/tex]
Now we can find the final speed of the particle by using the suvat equation:
[tex]v^2-u^2=2ax[/tex]
where
u = 8.00 m/s is the initial velocity
v is the final velocity
[tex]a=5.67 m/s^2[/tex]
x = 3.14 m is the displacement
Solving for v,
[tex]v=\sqrt{u^2+2ax}=\sqrt{8.00^2+2(5.67)(3.14)}=9.98 m/s[/tex]
And the speed is just the magnitude of the velocity, so 9.98 m/s.
