The work function of a surface is given by 3.3X10-19 J. Find the threshold frequency of the surface.
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Q: The work function of a surface is given by 3.3X10-19 J. Find the threshold frequency of the surface.…
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- A student is studying simple harmonic motion of a spring. She conducts an experiment where she measures the amplitude and period of an undamped system to be 24 ± 2 mm and 0.40 ± 0.020 seconds, respectively. Using the equation for displacement as a function of time y(t) = Acos(ωt), what is the uncertainty of her displacement calculation in mm for t = 0.050 ± 0.0010 seconds?A metal has an atomic weight of 56.3, density of 8.9 x 10 3 Kg/m3, frequency of longitudinal and transverse modes are 5.76 x 10 3 m/s and 3.22 x 103 m/s. Estimate the specific heat of the metal at 30 K and 50 K.Consider a periodic signal x(t) with period T defined as follows: T x(t) = (5t, -< t <0 (10, 0if the particle moving in a ____ potential then the solution of the wave equation are descibed as a stationary states time independant time dependent velocity independant velocity dependant6The work function of a surface is given by 3.3X10-19 J. Find the threshold frequency of the surface. 7.5X1014 Hz 5X1014 Hz 5.5X10¹2 Hz 2.5X10¹14 HzA tube of length 1.2 m, closed at one end and open at the other, vibrated in its second mode of vibration at room temperature of 20°C. What is the frequency of this second mode of vibration in Hz?A small block of mass M = 850 g is placed on top of a larger block of mass 3M which is placed on a level frictionless surface and is attached to a horizontal spring of spring constant k = 3.5 N/m. The coefficient of static friction between the blocks is μ = 0.2. The lower block is pulled until the attached spring is stretched a distance D = 1.5 cm and released.Randomized Variables M = 850 gD = 1.5 cmk = 3.5 N/m a) Calculate a value for the magnitude of the maximum acceleration amax of the blocks in m/s2. b) Write an equation for the largest spring constant kmax for which the upper block does not slip. c) Calculate a value for the largest spring constant kmax for which the upper block does not slip, in N/m.The chemical bond between the two atoms in a diatomic oxygen molecule acts very much like a spring, such that each oxygen atom behaves like a simple harmonic oscillator. If we observe the oxygen atoms vibrating at a frequency of 3.0 x 10^13 Hz, what is the spring constant of the O—O bond? The mass of an oxygen atom is 2.66 x^-26 kg.View of a one-dimensional harmonic oscillator system on the x axis of a charged particle q with an energy spectrum of En = (n + ½)ħw. The system is then disturbed by an oscillating electric field as a wo• function of time t such that the disturbance potential energy can be expressed as untuk t o 0 v (t) = {_q {-9€x sin wt e-t With & electric field amplitude. (notes : untuk means for) a. Calculate the transition probability from state n to state m. b. State which transitions n → m are allowed and which are not allowed to occur. c. Explain what happens if w → wo and/or → 0. [Hint: Use the create and annihilate operators to enumerate Matrix elements.]Suppose that you have a potential V (x) x2 + 6x – 8. Using a Taylor Series around Xo = 3, approximate the potential as a harmonic oscillator. O + (= – 3)? 7-2 (포-3)2 | (x – 3)? ||Problem 11: A small block of mass M= 350 g is placed on top of a larger block of mass 3M which is placed on a level frictionless surface and is attached to a horizontal spring of spring constant k = 1.9 N/m. The coefficient of static friction between the blocks is μ =0.2. The lower block is pulled until the attached spring is stretched a distance D = 2.5 cm and released. Randomized Variables M = 350 g D = 2.5 cm k = 1.9 N/m Part (a) Assuming the blocks are stuck together, what is the maximum magnitude of acceleration amax of the blocks in terms of the variables in the problem statement? amax = k D/(3 M+M ) ✓ Correct! Part (b) Calculate a value for the magnitude of the maximum acceleration amax of the blocks in m/s². ✓ Correct! | @mar= 0.03390 Part (c) Write an equation for the largest spring constant kmax for which the upper block does not slip. Kmax = μ (M +M) g/klSEE MORE QUESTIONS