A) The roverās coordinates and its distance from the lander at t = 2.0 s are; (1, 4) and 4.1 m
B) The roverās displacement and average velocity vector during the interval are; s = (-1, 4) and v = (-0.5, 2) m/s
C) The magnitude and direction of the instantaneous velocity are; 2.24 m/s and 117Ā°
What is the displacement and Velocity?
The rover's x and y coordinates are given as;
x = 2.0m ā (0.25 m/sĀ²)tĀ²
y = (1.0m/s)t + (0.25 m/sĀ³)tĀ³
A) At t = 2 s, the rovers coordinates are;
x = 2.0m ā (0.25 m/sĀ²)2Ā²
x = 1 m
y = (1.0m/s)2 + (0.25 m/sĀ³)2Ā³
y = 4 m
Distance from the lander is;
s = ā[(1 - 2)Ā² + 4Ā²]
s = 4.1 m
B) Let us first find the distance coordinates for the interval t = 0.0 s to t = 2.0s. Thus;
s = r - rā
s = (1 - 2), (4 - 0)
s = (-1, 4)
Thus, average velocity vector is;
v = Ā¹/ās
v = Ā Ā¹/ā(-1, 4)
v = (-0.5, 2) m/s
C) A general expression for the instantaneous velocity components is;
v_x = -0.5t
v_y = 1 - 0.75tĀ²
Thus, v(2) is;
v_x = -0.5(2) = -1
v_y = 1 - 0.75(2)Ā²
v_y = -2
Instantaneous velocity vector is; v = (-1, -2)
Magnitude of instantaneous Velocity = ā(-1Ā² + -2Ā²) = 2.24 m/s
Direction = 180Ā° - tanā»Ā¹(-2/-1) ā 117Ā°
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