Question

In a plasma globe, a hollow glass sphere is filled with low-pressure gas and a small spherical metal electrode is located at its center. Assume an ac voltage source of peak voltage V_o and frequency f is applied between the metal sphere and the ground, and that a person is touching the outer surface of the globe with a fingertip, whose approximate area is 1.0 cm². The equivalent circuit for this situation is shown in Fig. 30–36, where R_G and R_P are the resistances of the gas and the person, respectively, and C is the capacitance formed by the gas, glass, and finger. (a) Determine C assuming it is a parallel-plate capacitor. The conductive gas and the person’s fingertip form the opposing plates of area A = 1.0 cm². The plates are separated by glass (dielectric constant K = 5.0) of thickness d = 2.0 mm. (b) In a typical plasma globe, f = 12 kHz. Determine the reactance X_C of C at this frequency in MΩ. (c) The voltage may be V_o = 2500 V. With this high voltage, the dielectric strength of the gas is exceeded and the gas becomes ionized. In this “plasma” state, the gas emits light (“sparks”) and is highly conductive so that R_G << X_C. Assuming also that R_P << X_C, estimate the peak current that flows in the given circuit. Is this level of current dangerous? (d) If the plasma globe operated at f = 1.0 MHz, estimate the peak current that would flow in the given circuit. Is this level of current dangerous?

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Accepted Answer

Step 1: To determine the capacitance (C) in part (a), use the formula for a parallel-plate capacitor: C=K&#x1D53B;Ad, where K is the dielectric constant (5.0), &#x1D53B; is the permittivity of free space (8.85&#xD7;$$10^{-12} F/m$$), A is the area of the fingertip (1.0 cm² = 1.0&#xD7;$$10^{-4} m$$²), and d is the thickness of the glass (2.0 mm = 2.0&#xD7;$$10^{-3} m). $$Substitute these values into the formula to calculate C. Step 2: For part (b), calculate the capacitive reactance (X_{C}) using the formula: X_{C}=1(2&#x3C0;fC), where f is the frequency (12 kHz = 12&#xD7;$$10^{3} Hz) $$and C is the capacitance calculated in step 1. Substitute the values to find X_{C} in ohms, then convert to MΩ. Step 3: For part (c), estimate the peak current (I_{peak}) using Ohm's law: I_{peak}=$$V_{o}X$$_{C}, where V_{o} is the peak voltage (2500 V) and X_{C} is the capacitive reactance calculated in step 2. Substitute the values to find I_{peak}. Then, compare the current to the threshold for danger (typically 10 mA for humans) to determine if it is dangerous. Step 4: For part (d), repeat the calculation of I_{peak} using the same formula as in step 3, but with a new frequency f = 1.0 MHz = 1.0&#xD7;$$10^{6} Hz. $$Substitute the new frequency into the formula for X_{C} (step 2) and then calculate I_{peak}. Again, compare the current to the danger threshold to assess safety. Step 5: Summarize the results for parts (c) and (d), discussing whether the current levels at the two frequencies (12 kHz and 1.0 MHz) are dangerous. Highlight the role of capacitive reactance in limiting current flow and how it changes with frequency.

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Key Concepts

Capacitance

Reactance

Current and Safety