Sketch the following function as a function of position (X) at a time t = 3x10^-15 s: .
On your graph, indicate the maximum and minimum values of ?, as well as at least 3 values of X for which ? = 0. Compare the wavelength obtained form the zero-crossings of ? to the wavelength obtained from the value of the wavenumber.
Sketch the following function as a function of position (X) at a time t = 3x10^-15...
Sketch the requested graphs Sketch the position versus time graph whose function is r(t) = Sketch the velocity versus time graph derived from the position versus time graph Velocity versus Time u(m/s) t(s) 123 456789 10 11 12 -4
The wave of a plucked, taut-wire is represented by the function, y(x, t) = 3/[(x – 2.0t)2 + 1]. a) Sketch the amplitude of the wave pulse as a function of position for t=0 s, t = 1.0 s, t = 2.0 s. b) The displacement of a wave is given by the expression, y (x, t) = 15cos(1.0x – 100xt). The wavelength is measured to be 2n m. Determine the wavenumber of this wave. c) Sketch the wavefronts of...
1 point) Sketch the graph of the function y = x(4-2) - 103 In x. Indicate the transition points (local extrema and points of inflection) (Use symbolic notation and fractions where needed. Give your answer in the form of comma separated list of e-coordinates. Enter NULL in answer field if there is no such point.) Local maximum at = help (fractions) Local minimum at I= Inflection at I= (1 point) Sketch the graph of the function y = 81x +...
1. The left figure is a history graph that shows the displacement D of a traveling wave at a given position as a function of time. The right figure is a snapshot graph that shows the displacement of the same wave as a function of position. D (cm) D (cm) -1 -2 2/3 4 67 8 -2 (a) Determine the period T, the frequency f, and the angular frequency o for this wave. (b) Determine the wavelength 2, wavenumber K,...
. The position of a partide moving along the x-axis isgiven, as a function of time, by at) 3eft. aFind b)Sketch graphs of vst, vstand a{t)vst. c Use the graph of vit) vs t to estimate the distance travelled by the particle in the first 5 s of motion.Show your work ] Compare the result found in (c above to ds 5)-x(0) and to the result found from
3.) The position of a particle is given by x(t) = 3t3 – 2t2 – 5t + 10, where t is in seconds and x is in meters. Find the initial position of the particle. Find the position of the particle after 5 seconds. Find the average velocity from 0 sec to t = 5sec Find the instantaneous velocity as a function of time Find the instantaneous velocity at t = 2 seconds. Find the instantaneous velocity at t=4 seconds...
A particle inoves along the x-axis. It's position as a function of time is given by z (t)t+22- The following questions refer to that situation. Only consider times t greater than or equal to zero fno negative values of t. Note application of the derivative is finding the maximo and minima of functions. O 1m 0 2m D Question 7 1 pts For times t between t- 0 and t 3 s, what is the minimum value of x attained...
Question 4 (2+4+4+1+4 = 15 marks) Consider the function y = 4 sin (2x-π) for-r below to sketch the graph of y. x < π. Follow the steps (a) State the amplitude and period in the graph of this function 4 sin (22-9 ) for-r (b) Solve y π to find the horizontal intercepts x (a-intercepts) of the function. (c) Find the values of x for-π π for which the maximum. and the x minimum values of the function occur...
1. A certain function of time x (t) has the Fourier transform X(f) shown below Sketch the spectrum of [x(t)]2 and find its bandwidth. Sketch the spectrum of [x(t)cos(2r15t)] and find its bandwidth. a. b. 11 -10 9 9 10 11
(1 point) From Rogawski 2e section 4.5, exercise 26. Sketch the graph of the function y VIlx+ V10- Indicate the transition points (ocal extrema and points of inflection) use symbolic notation and fractions where needed. Give your answer in the form of comma separated list of x-coordinates. Enter NULL in ans (Use there is no such point.) Local maximum at x 1-4 help (fractions) Local minimum at xnull Inflection at null (1 point) From Rogawski 2e section 4.5, exercise 26....