Consider a particle moving along the x-axis whose motion is modeled by the differential equation given dv by +v =x sin(21) and * dx = v where v is in m/s, x is in meters and t is in seconds. If dt x = 0, v = 4 m's, whent = 0, use Euler's method to determine the approximate value of v and x from t = 0 to t = 25 s using a step size of 0.5 s. (1) Show the first two steps of your solution (set your caleulator in radian). (ii) Then use spreadsheet to complete the table below: t (s) v (m/s) | x(m) 4 0.5 1.0 25

Transcribed Image Text:

Consider a particle moving along the x-axis whose motion is modeled by the differential equation given dv by dx dt +v =x sin(2r) and dt - = v where v is in m/s, x is in meters and t is in seconds. If x = 0, v = 4 m's, when t = 0, use Euler's method to determine the approximate value of v and x from t = 0 to t = 25 s using a step size of 0.5 s. %3D (i) Show the first two steps of your solution (set your calculator in radian). (ii) Then use spreadsheet to complete the table below: t (s) v (m/s) x(m) 4 0.5 1.0 25 (iii) Plot a graph of v and x as functions of t using the same set of coordinates. Choose smooth from the chart options.