Answer:
ax = 1.23 m/s²
ay = -6.32 m/s²
Explanation:
The acceleration is equal to the change in velocity over time. So, the acceleration of in the x-component is equal to
[tex]a_x=\frac{v_{fx}-v_{ix}}{t}[/tex]Where vfx is the final velocity on the x-direction which is equal to 0 m/s because at the end the velocity is in the y-axis. vix is the initial velocity which is -2.70 m/s and t is the time, so t = 2.20s.
Replacing the values, we get:
[tex]a_x=\frac{0-(-2.70\text{ m/s\rparen}}{2.20\text{ s}}=1.23\text{ m/s}^2[/tex]In the same way, we can calculate the y-component of the acceleration as
[tex]a_y=\frac{v_{fy}-v_{iy}}{t}[/tex]Replacing vfy = -13.9 m/s and viy = 0 m/s, we get:
[tex]a_y=\frac{-13.9\text{ m/s - 0 m/s}}{2.20\text{ s}}=-6.32\text{ m/s}^2[/tex]Therefore, the answer is
ax = 1.23 m/s²
ay = -6.32 m/s²
