(Figure 1) is a history graph at 0 m of a wave traveling in the positive...
At time t = 0 and at position x = 0 m along a string, a traveling sinusoidal wave with an angular frequency of 450 rad/s has displacement y = +4.4 mm and transverse velocity u = -0.71m/s. If the wave has the general form y(x, t) = ym sin(kx - ωt + φ), what is phase constant φ?
If y(x, t) = (5.4 mm)sin(kx
+ (575 rad/s)t + ϕ) describes a wave traveling
along a string, how much time does any given point on the string
take to move between displacements y = +2.0 mm and
y = −2.0 mm?
If y(x, t) = (5.4 mm)sin(kx + (575 rad/s)t + φ) describes a wave traveling along a string, how much time does any given point on the string take to move between displacements y = +2.0 mm and...
what is the displacement equation?
ConstantsIPeriodic Table Part A Figure(Figure 1)is a snapshot graph at t = 0 s of a 5.0 Hz wave traveling to the left. What is the wave speed? Express your answer using two significant figures. 10 m/s Figure 1 of 1 Previous Answers VCorrect D (mm) Part B x (m) What is the phase constant of the wave? Express your answer using two significant figures. Snapshot graph at -0 s фо: 0.52 rad Previous Answers...
If y(x, t) = (5.9 mm) sin(kx + (720 rad/s)t + ϕ) describes a wave traveling along a string, how much time does any given point on the string take to move between displacements y = -2.0 mm and y = +2.0 mm?
If y(x, t) = (6.4 mm) sin(kx + (665 rad/s)t + 6) describes a wave traveling along a string, how much time does any given point on the string take to move between displacements y = -2.0 mm and y = +2.0 mm? IS
If y(x, t) = (6.1 mm)sin(kx + (500 rad/s)t + ϕ) describes a wave traveling along a string, how much time does any given point on the string take to move between displacements y = +2.0 mm and y = −2.0 mm?
What are the parts of this traveling wave? y(x,t) = (9.00 m) sin( (67 m-')x + (41 rad/s)t – 7/8) 1. Is this wave transverse or longitudinal? 2. Which direction is the wave moving? 3. Amplitude 4. Angular wave number 5. Wavelength 6. Angular frequency 7. Phase angle 8. Linear frequency 9. Period 10. Velocity of wave 11. Maximum vibration speed
The displacement of a transverse traveling wave on a string under tension is described by: D(x, t) = (2.0 cm) .sin((12.57 rad/m)x + (638 rad/s)t + /2] The linear density of the string is 5.00 g/m. 1. What is the tension in the string? 2. What is the maximal speed of a point on the string? String 2 3. The original string (String 1) is tied to a second string with String 1 a linear density of 12 g/m, as...
The displacement of a transverse traveling wave on a string under tension is described by: D(x, t) = (2.0 cm) sin((12.57 rad/m)x+ (638 rad/s)t + T/2] The linear density of the string is 5.00 g/m. 1. What is the tension in the string? 2. What is the maximal speed of a point on the string? String 2 3. The original string (String 1) is tied to a second string with String 1 a linear density of 12 g/m, as shown...
The equation of a transverse wave traveling along a string is y = (0.11 m)sin[(0.78 rad/m)x - (14 rad/s)t] (a) What is the displacement y at x = 2.6 m, t = 0.27 s? A second wave is to be added to the first wave to produce standing waves on the string. If the wave equation for the second wave is of the form y(x,t) = ymsin(kx + ωt), what are (b) ym, (c) k, and (d) ω (e) the...