A certain transverse wave is described by the equation y(x,t) = (6.50 mm)sin2pi((t/0.0360 s)-(x/0.280m)) Determine the wave's (a) amplitude (b) wavelength (c) frequency (d) speed of propagation and (e) direction of propagation
9.I A certain transverse wave is described by the equation (0.036 -0.280m) or y(x, t)-(6.50 mm) sin 2 Determine this wave's (a) amplitude, (b) wavelength, (c) frequen (d) speed of propagation, and (e) direction of propagation
A certain transverse wave is described by y(x,t)=Bcos[2π(xL−tτ)], where B = 5.40 mm , L = 30.0 cm , and τ = 3.60×10−2 s . Determine the wave's amplitude. Determine the wave's wavelength. Determine the wave's frequency. Determine the wave's speed of propagation. Determine the wave's direction of propagation. Answers : 1- +x direction 2- -x direction
A certain transverse wave is described by y(x,t)=Bcos[2π(xL−tτ)], where B = 6.00 mm , L = 30.0 cm , and τ = 3.10×10−2 s . Determine the wave's amplitude. A?? Determine the wave's wavelength. λ?? Determine the wave's frequency. f??? Determine the wave's speed of propagation. v???
A certain transverse wave is described by the equation y(x,t)= ( 10.5 mm )sin2π(t0.0360s−x0.280m). Determine this wave’s a. amplitude, b. wavelength, c. frequency, d. wave speed, e. period.
A transverse wave is described by y(x, t)-(6.50 mm) cos 2π y(r,t) (6.50 mm) cos 2T 28.0cm 0,0360 28.0cm0.0360s Calculate the speed of propagation of this wave in m/s. Sample submission: 1.23
please provide me both part A and B A certain transverse wave is described by y(e,t) = Bcos 24 (Ž -4) where B = 6.00 mm , L = 26.0 cm, and T = 3.20x10^2 s. A certain transverse wave is described by y(x,t) = Bcos 2 (3-4): where B = 6.00 mm. L = 26.0 cm, and 3.20x10-28 Part A Determine the wave's amplitude. 30 AXP R O ? Submit Request Answer Part B Determine the wave's wavelength. 0...
A wave is modeled by the wave function 2Tt y(x, t) (0.30 m) sin 4.50 7m(x+18.00t (A) Determine the wave's (a) amplitude; (b) wavelength; (c) propagation speed (d) frequency (e) direction of propagation (B) An element of the string is located at x 2.25 m (a) Show that the motion of this element is a simple harmonic motion with a transverse displacement of the form y(t) Acos ( t + ф). (b) Determine the phase constant φ (c) Give its...
The equation of a transverse wave traveling along a very long string is y = 3.96 sin(0.0444πx+ 7.89πt), where x and y are expressed in centimeters and t is in seconds. Determine (a) the amplitude, (b) the wavelength, (c) the frequency, (d) the speed, (e) the direction of propagation of the wave and (f) the maximum transverse speed of a particle in the string. (g) What is the transverse displacement at x = 1.05 cm when t = 0.843 s?
The equation of a transverse wave traveling along a very long string is y = 6.28 sin(0.0223πx+ 3.63πt), where x and yare expressed in centimeters and t is in seconds. Determine (a) the amplitude, (b) the wavelength, (c) the frequency, (d) the speed, (e) the direction of propagation of the wave and (f) the maximum transverse speed of a particle in the string. (g) What is the transverse displacement at x = 4.95 cm when t = 0.876 s?
The equation of a transverse wave traveling along a very long string is given by y = 6.1 sin(0.018πx + 3.1πt), where x and y are expressed in centimeters and t is in seconds. Determine the following values. (a) the amplitude cm (b) the wavelength cm (c) the frequency Hz (d) the speed cm/s (e) the direction of propagation of the wave +x−x +y−y (f) the maximum transverse speed of a particle in the string cm/s (g) the transverse displacement at...