phragg
Sep9-08, 12:10 AM
A position-time graph for a particle moving along the x-axis is shown below:
(a) Find the average velocity in the time interval t = 1.50 s to t = 4.00 s.
(b) Determine the instantaneous velocity at t = 2.00 s by measuring the slope of the tangent line shown in the graph.
(c) At what value of t is the velocity zero?
http://img241.imageshack.us/img241/1514/tangetsb6.jpg
I figured that (a) was the easy part as I went ahead to solving that
v_{ave} = \frac{\Delta x}{\Delta t}
\Delta t = t_f - t_i
\Delta t = 4.00 s - 1.50s
\Delta t = 2.50 s
\Delta x = x_f - x_i
\Delta x = 2m - 7m
\Delta x = -5m
v_{ave} = \frac{-5m}{2.50s}
v_{ave} = -2m/s
So after that was done I went on to part (b) which first asked to find the slope of the tangent point was easily done by:
m = \frac{y_2 - y_1}{x_2 - x_1}
m = \frac{0 - 12}{4 - 0}
m = \frac{-3}{1}
Now I am completely stumped as to what they're asking for how to Determine the instantaneous Velocity at t = 2.00 s and Don't get me started on (c). Oh an p.s. Hey I'm new to PF ;p!
(a) Find the average velocity in the time interval t = 1.50 s to t = 4.00 s.
(b) Determine the instantaneous velocity at t = 2.00 s by measuring the slope of the tangent line shown in the graph.
(c) At what value of t is the velocity zero?
http://img241.imageshack.us/img241/1514/tangetsb6.jpg
I figured that (a) was the easy part as I went ahead to solving that
v_{ave} = \frac{\Delta x}{\Delta t}
\Delta t = t_f - t_i
\Delta t = 4.00 s - 1.50s
\Delta t = 2.50 s
\Delta x = x_f - x_i
\Delta x = 2m - 7m
\Delta x = -5m
v_{ave} = \frac{-5m}{2.50s}
v_{ave} = -2m/s
So after that was done I went on to part (b) which first asked to find the slope of the tangent point was easily done by:
m = \frac{y_2 - y_1}{x_2 - x_1}
m = \frac{0 - 12}{4 - 0}
m = \frac{-3}{1}
Now I am completely stumped as to what they're asking for how to Determine the instantaneous Velocity at t = 2.00 s and Don't get me started on (c). Oh an p.s. Hey I'm new to PF ;p!