Physics for Scientists and Engineers: Foundations and Connections
Physics for Scientists and Engineers: Foundations and Connections
1st Edition
ISBN: 9781133939146
Author: Katz, Debora M.
Publisher: Cengage Learning
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Chapter 33, Problem 63PQ

A series RLC circuit driven by a source with an amplitude of 120.0 V and a frequency of 50.0 Hz has an inductance of 787 mH, a resistance of 267 Ω, and a capacitance of 45.7 µF. a. What are the maximum current and the phase angle between the current and the source emf in this circuit? b. What are the maximum potential difference across the inductor and the phase angle between this potential difference and the current in the circuit? c. What are the maximum potential difference across the resistor and the phase angle between this potential difference and the current in this circuit? d. What are the maximum potential difference across the capacitor and the phase angle between this potential difference and the current in this circuit?

(a)

Expert Solution
Check Mark
To determine

The maximum current and the phase angle.

Answer to Problem 63PQ

The maximum current in the circuit is 0.374A and the phase angle is 33.6°.

Explanation of Solution

Write the expression to calculate the inductive reactance.

    XL=2πfL                                                                                               (I)

Here, L is the inductance of the inductor and f is the frequency.

Write the expression to calculate the capacitive reactance.

    XC=12πfC                                                                                           (II)

Here, the capacitance of the capacitor is C.

Write the expression for the impedance.

    Z=R2+(XLXC)2                                                                       (III)

Here, Z is the impedance, XL is the inductive reactance and XC is the capacitive reactance.

Write the expression to calculate the maximum current

    Imax=εmaxZ                                                                                        (IV)

Here, εmax is the maximum voltage and Imax is the maximum current.

Write the expression to calculate the phase angle.

    tanϕ=(XLXC)R                                                                           (V)

Here, ϕ is the phase angle.

Conclusion:

Convert form mH to H.

    787mH=787mH(103H1mH)=787×103H

Substitute 787×103H for L and 50.0Hz for f in equation (I) to calculate the value of XL.

    XL=2π(50.0Hz)(787×103H)=247.24Ω

Convert into Farad.

    45.7μF=45.7μF(106F1μF)=45.7×106F

Substitute 45.7×106F for C and 50.0Hz for f in equation (II) to calculate the value of XC.

    XC=12π(50.0Hz)(45.7×106F)=69.65Ω

Substitute 247.24Ω for XL, 267Ω for R and 69.65Ω for XC in the equation (III) to calculate the value of Z.

    Z=(267Ω)2+(247.24Ω69.65Ω)2=71289+31538Ω=321Ω

Substitute, 120.0V for εmax and 321Ω for Z in the equation (IV) to calculate the value of Imax.

    Imax=120V321Ω=0374A

Substitute 247.24Ω for XL, 267Ω for R and 69.65Ω for XC in equation (V)  to calculate the value of ϕ.

    tanϕ=(247.24Ω69.65Ω)267Ωϕ=tan1(0.665)=33.6°

Therefore, the maximum current in the circuit is 0.374A. The phase angle is 33.6°.

(b)

Expert Solution
Check Mark
To determine

The maximum potential difference and the phase angle between the potential difference across the inductor and the current.

Answer to Problem 63PQ

The maximum potential difference across inductor is 92.5V and the phase angle between the potential difference across the inductor and the current in the circuit is 90°.

Explanation of Solution

Write the expression for potential difference across L.

    Vmax=ImaxXL                                                                                                 (VI)

Conclusion:

Substitute 0.374A for Imax and 247.24Ω for XL in the equation (VI) to calculate the value of Vmax.

    Vmax=(0.374A)(247.24Ω)=92.47V92.5V

Since, the potential difference across the inductor and the current in the circuit is perpendicular to each other. Hence the phase angle between the potential difference across the inductor and the current in the circuit is 90°

Thus, the maximum potential difference across inductor is 92.5V.

The phase angle between the potential difference across the inductor and the current in the circuit is 90°.

(c)

Expert Solution
Check Mark
To determine

The maximum potential difference and the phase angle between the potential difference across the resistor and the current.

Answer to Problem 63PQ

The maximum potential difference across resistor is 99.9V. The phase angle between the potential difference across the resistor and the current in the circuit is 0°.

Explanation of Solution

Write the expression for potential difference across R.

    Vmax=ImaxR                                                                                                   (VII)

Conclusion:

Substitute 0.374A for Imax and 267Ω for R in equation (VII) to calculate the value of Vmax.

    Vmax=(0.374A)(267Ω)=99.9V

Since, the potential difference across the resistor and the current in the circuit is in the same phase. Hence the phase angle between the potential difference across the resistor and the current in the circuit is 0°.

Therefore, the maximum potential difference across resistor is 99.9V. The phase angle between the potential difference across the resistor and the current in the circuit is 0°.

(d)

Expert Solution
Check Mark
To determine

The maximum potential difference and the phase angle between the potential difference across the capacitor and the current.

Answer to Problem 63PQ

The maximum potential difference across capacitor is 26.1V. The phase angle between the potential difference across the resistor and the current in the circuit is 90.0°.

Explanation of Solution

Write the expression for potential difference across C.

    Vmax=Imax×XC                                                                                         (VII)

Conclusion:

Substitute 0.374A for Imax and 69.65Ω for XC in equation (VII) to calculate the value of Vmax.

    Vmax=0.374A(69.65Ω)=26.05V

The phase angle between the potential difference across the resistor and the current in the circuit is 90.0°.

Therefore, the maximum potential difference across capacitor is 26.1V. The phase angle between the potential difference across the resistor and the current in the circuit is 90.0°.

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Chapter 33 Solutions

Physics for Scientists and Engineers: Foundations and Connections

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