Photoelectric Effect Speed Calculation

Creato il: 6 gennaio 2025

Risposto usando O1 da Chat01

Domanda

Yellow light of wavelength 585 nm falls on a photocathode whose threshold frequency is
4.10 x 1014 Hz. What is the maximum speed of ejected electrons? What happens to the speed
of electrons when the intensity of the yellow light increases? Why?

Pensiero

Working through the photoelectric effect

I’m starting with the wavelength and threshold frequency of the photon to determine if the frequency of the incident light is above the threshold.

Calculating frequency

I’ve determined the frequency of the incident light to be 5.13 x 10^14 Hz, which is above the threshold frequency of 4.10 x 10^14 Hz.

Determining kinetic energy

I’ve calculated the maximum kinetic energy of the electron to be 6.8 x 10^-20 J by subtracting the work function from the photon's energy and then using the electron's mass to find the speed.

Calculating velocity

I’ve determined the electron's velocity to be approximately 1.22 x 10^5 m/s by carefully analyzing the kinetic energy with respect to the electron's mass.

Examining intensity effects

Increasing the intensity of the yellow light doesn't alter the ejected electrons' speed, as the speed is tied to the light's frequency, not its intensity.

Calculating velocity

I’ve rechecked the maximum kinetic energy and recalculated the electron's velocity, confirming it as approximately 1.20 x 10^5 m/s, regardless of light intensity changes.

Thought about photoelectric effect and electron speed，持续 27 秒

Risposta

First, let us outline the key steps to solve this problem:

Identify the given data
- Wavelength of incident light: $\lambda = 585\,\text{nm} = 585\times 10^{-9}\,\text{m}$
- Threshold frequency of the photocathode: $f_0 = 4.10\times 10^{14}\,\text{Hz}$
- Speed of light: $c = 3.00\times 10^{8}\,\text{m/s}$
- Planck’s constant: $h = 6.626\times 10^{-34}\,\text{J}\cdot\text{s}$
- Electron mass: $m_e = 9.11\times 10^{-31}\,\text{kg}$
Convert the incident light’s wavelength to frequency
$f \;=\; \frac{c}{\lambda} \;=\; \frac{3.00\times 10^8\,\text{m/s}}{585\times 10^{-9}\,\text{m}} \;\approx\; 5.13\times 10^{14}\,\text{Hz}.$
Compute the photon energy of the incident light
$E_{\text{photon}} \;=\; h f \;=\; (6.626\times 10^{-34}\,\text{J}\cdot\text{s}) \times (5.13\times 10^{14}\,\text{s}^{-1}) \;\approx\; 3.40\times 10^{-19}\,\text{J}.$
Compute the work function (threshold energy) from the threshold frequency
$W \;=\; h f_0 \;=\; (6.626\times 10^{-34}\,\text{J}\cdot\text{s}) \times (4.10\times 10^{14}\,\text{s}^{-1}) \;\approx\; 2.72\times 10^{-19}\,\text{J}.$
Find the maximum kinetic energy
The maximum kinetic energy $K_{\text{max}}$ of the ejected electrons is the photon energy minus the work function:
$K_{\text{max}} \;=\; E_{\text{photon}} \;-\; W \;=\; 3.40\times 10^{-19}\,\text{J} \;-\; 2.72\times 10^{-19}\,\text{J} \;=\; 0.68\times 10^{-19}\,\text{J}.$
Compute the maximum speed of the ejected electrons
Using the classical expression for kinetic energy,
$K_{\text{max}} \;=\; \tfrac{1}{2}\,m_e\,v_{\text{max}}^2,$
we solve for $v_{\text{max}}$ :
$v_{\text{max}} \;=\; \sqrt{\frac{2\,K_{\text{max}}}{m_e}} \;=\; \sqrt{\frac{2 \times 0.68\times 10^{-19}\,\text{J}}{9.11\times 10^{-31}\,\text{kg}}}.$
Numerically,
$v_{\text{max}} \;\approx\; \sqrt{1.36\times 10^{-19} \;/\; 9.11\times 10^{-31}} \;\approx\; \sqrt{1.49\times 10^{11}} \;\approx\; 1.22\times 10^5\,\text{m/s}.$

Thus,

\boxed{ v_{\text{max}} \;\approx\; 1.2\times 10^5\,\text{m/s}. }

What happens if the intensity of the yellow light is increased?

Speed of the ejected electrons remains the same.
The maximum kinetic energy (and thus the speed) of the photoelectrons depends only on the frequency (or wavelength) of the incident light, not on its intensity. Once the frequency is above the threshold, every photon carries the same energy. Hence, the speed of the ejected electrons is determined by the excess energy $\bigl[h(f - f_0)\bigr]$ , which does not change if you merely turn up the brightness/intensity.
Number of electrons ejected can increase.
A higher intensity means more photons per second striking the photocathode. Consequently, more electrons can be ejected (assuming each photon has enough energy to exceed the work function), but each individual electron still has the same maximum speed determined by the light’s frequency.

Therefore, increasing the intensity of yellow light increases the number of photoelectrons ejected but does not increase their maximum speed.

Domanda

check your last step, you might have done the square root wrong

Pensiero

Verifying calculations

I’m rechecking the calculation by carefully computing sqrt(1.49 * 10^11). The precise result is 1.22 x 10^5, addressing any potential discrepancies.

Reassessing assumptions

I’m comparing the results to ensure $\sqrt{1.49 \times 10^{11}}$ aligns with 1.22 x 10^5. If there’s a discrepancy, it might stem from simplifying $10^{11}$ to $10^{10}$ .

Verifying consistency

I’m ensuring the calculations are consistent and precise, leading to the correct final result of $3.86 \times 10^5$ . The key formula to use is $v_{\max} = \sqrt{2 K_{\max} / m}$ .

Adjusting calculations

I’m noting that the final speed should be about 3.9 x 10^5 m/s, correcting the previous error of 1.22 x 10^5 m/s.

Confirming calculations

I’m working through the arithmetic to ensure 3.9 x 10^5 m/s is accurate. Breaking down the multiplication and square root, the result is precise, validating previous findings with clarity.

Thought about electron speed calculation，持续 29 秒

Risposta

Let’s zero in on the step involving the square root, since that’s where the discrepancy arises. The kinetic energy part and the division by the electron mass are correct, so let’s carefully re-compute:

1) Kinetic energy and the quantity under the square root

Kinetic energy
$K_{\text{max}} = 0.68 \times 10^{-19}\,\text{J}.$
Double it (because $K = \tfrac12\,m\,v^2$ )
$2\,K_{\text{max}} = 1.36 \times 10^{-19}\,\text{J}.$
Divide by the electron mass
$\frac{2\,K_{\text{max}}}{m_e} = \frac{1.36 \times 10^{-19}\,\text{J}}{9.11 \times 10^{-31}\,\text{kg}} = \left(\frac{1.36}{9.11}\right) \times 10^{-19 - (-31)} = 0.149 \times 10^{12} = 1.49 \times 10^{11}.$

Hence, the quantity inside the square root is $1.49 \times 10^{11}$ .

2) Taking the square root correctly

v_{\text{max}} = \sqrt{1.49 \times 10^{11}} = \sqrt{1.49} \times \sqrt{10^{11}} = 1.22 \times 10^{\frac{11}{2}}.

But remember:

10^{\frac{11}{2}} \;=\; 10^{5.5} \;=\; 3.162 \times 10^{5}.

Therefore,

v_{\text{max}} = 1.22 \;\times\; 3.162 \times 10^{5} \;\approx\; 3.86 \times 10^{5}\,\text{m/s}.

So the corrected result is:

\boxed{ v_{\text{max}} \;\approx\; 3.9\times 10^{5}\,\text{m/s}. }

3) Why increasing intensity does not change this speed

The maximum speed of photoelectrons depends on the photon energy above the work function. Once the frequency is fixed (i.e., we are still using 585 nm light), each photon has the same energy, so each ejected electron (assuming a single-photon interaction) has the same maximum kinetic energy regardless of how bright the light is.
Increasing intensity simply means more photons per second; that can increase the number of electrons ejected per second, but the energy per electron (and hence its maximum speed) remains the same.

Domanda

Pensiero

Risposta

What happens if the intensity of the yellow light is increased?

Domanda

Pensiero

Risposta

1) Kinetic energy and the quantity under the square root

2) Taking the square root correctly

3) Why increasing intensity does not change this speed

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