Final Answers:
The applied force required to move the bar to the left at a constant speed of 6 m/s is 126 N
Step-by-step explanation:
Calculating the applied force: The formula to find the force in this scenario involves the relationship between magnetic force and the current passing through the conductor. As the bar moves at a constant speed without acceleration, the magnetic force is balanced by the applied force. Using the formula F = BIL, where F is the magnetic force, B is the magnetic field, I is the current, and L is the length of the conductor, rearranging the equation for I gives I = F / (BL). The resistance R = 7 Ω, and according to Ohm's law, V = IR. Hence, the voltage V = IR = 7 Ω * I. Also, V = B * L * v, where v is the speed of the bar. Equating these voltage equations gives 7 Ω * I = B * L * v, and solving for I yields I = (B * L * v) / 7 Ω. Given B = 9 T, L = 6 m, and v = 6 m/s, substituting these values into the equation gives I = (9 T * 6 m * 6 m/s) / 7 Ω, resulting in I = 54 A. Then, using the rearranged formula I = F / (BL), the applied force F = I * B * L = 54 A * 9 T * 6 m = 126 N.
Final answer:
The rate at which energy is dissipated in the resistor is 756 W.
Step-by-step explanation:
Determining the energy dissipation rate:** The power dissipated in a resistor is given by the formula P = I^2 * R, where P is power, I is current, and R is resistance. As calculated previously, the current passing through the resistor is 54 A, and the resistance is 7 Ω. Substituting these values into the formula gives P = (54 A)^2 * 7 Ω = 756 W. Therefore, the rate at which energy is dissipated in the resistor is 756 watts. This power represents the rate of energy conversion from electrical energy to heat energy within the resistor due to the passage of current through it.