Without the wave function or more specific parameters related to the wave's phase, wave number, or angular frequency, it is not possible to calculate the exact displacement, velocity, and acceleration of the wave at a given position and time.
When dealing with the displacement, velocity, and acceleration of a wave, the wave function can be used to provide these values at any given position and time. If the wave function is not provided, it is impossible to calculate the exact displacement, velocity, and acceleration without further information. The wave function normally has the form of y (x, t) = A sin (kx — wt) or y (x, t) = A cos (kx — wt), where A is the amplitude, k is the wave number (related to wavelength), and w is the angular frequency (related to frequency). To calculate specific values for displacement, velocity, and acceleration, we differentiate the wave function with respect to time.
Without the wave function or additional information about the phase of the wave or its wave number and angular frequency, we cannot provide a answer to the question of displacement, velocity, and acceleration at x = 1.35 m and t = 3 s. A complete explanation requires the wave function or additional parameters such as phase constant. In conclusion, to proceed with the calculations, further information on the wave's phase, wave number, or angular frequency is essential.