The total mass flow rate required is determined by the equation: Total mass flow rate = Total thrust / exhaust velocity.
To calculate the total mass flow rate required through the engines to maintain a velocity of 500 mph, we need to consider the thrust generated by the engines and the drag experienced by the bomber.
First, let's calculate the thrust produced by each engine. The thrust generated by a turbojet engine can be determined using the following equation:
Thrust = (mass flow rate) × (exit velocity) + (exit pressure - ambient pressure) × (exit area)
We are given the following information:
Outlet port diameter = 70% of the widest engine diameter = 0.7 × 990 mm = 693 mm = 0.693 m
Pressure ratio = 2
Exhaust velocity = 750 m/s
The exit area of each engine can be calculated using the formula for the area of a circle:
Exit area = π × (exit diameter/2)^2
Exit area = π × (0.693/2)^2 = π × 0.17325^2
Now we can calculate the thrust generated by each engine:
Thrust = (mass flow rate) × (exit velocity) + (exit pressure - ambient pressure) × (exit area)
Since we have eight turbojet engines, the total thrust generated by all engines will be eight times the thrust of a single engine.
Next, let's calculate the drag force experienced by the bomber. The drag force can be determined using the drag equation:
Drag = (0.5) × (density of air) × (velocity^2) × (drag coefficient) × (reference area)
We are given the following information:
Velocity = 500 mph
L/D ratio = 11
Weight = 125,000 kg
The reference area is the frontal area of the bomber, which we do not have. However, we can approximate it using the weight and the L/D ratio:
Reference area = (weight) / (L/D ratio)
Now we can calculate the drag force.
Finally, for the bomber to maintain a constant velocity, the thrust generated by the engines must be equal to the drag force experienced by the bomber. Therefore, the total thrust produced by the engines should be equal to the total drag force:
Total thrust = Total drag
By equating these two values, we can solve for the total mass flow rate required through the engines.
Total mass flow rate = Total thrust / (exit velocity)
This will give us the total mass flow rate required to maintain a velocity of 500 mph.
In summary, to find the total mass flow rate required through the engines to maintain a velocity of 500 mph, we need to calculate the thrust generated by each engine using the thrust equation and sum them up for all eight engines. We also need to calculate the drag force experienced by the bomber using the drag equation. Finally, we equate the total thrust to the total drag and solve for the total mass flow rate.
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Which of the followings is true? Given an RC circuit: resistor-capacitor C in series. The output voltage is measured across C, an input voltage supplies power to this circuit. For the transfer function of the RC circuit with respect to input voltage: O A. Its phase response is -90 degrees. O B. Its phase response is negative. O C. Its phase response is 90 degrees. O D. Its phase response is positive.
In an RC circuit with a resistor-capacitor in series and the output voltage measured across C while an input voltage supplies power to this circuit, the phase response of the transfer function of the RC circuit with respect to input voltage is -90 degrees.
Hence, the correct answer is option A. A transfer function is a mathematical representation of a system that maps input signals to output signals.The transfer function of an RC circuit refers to the voltage across the capacitor with respect to the input voltage. The transfer function represents the system's response to the input signals.
The transfer function H(s) of the RC circuit with respect to input voltage V(s) is given by the equation where R is the resistance, C is the capacitance, and s is the Laplace operator. In the frequency domain, the transfer function H(jω) is obtained by substituting s = jω where j is the imaginary number and ω is the angular frequency.A phase response refers to the behavior of a system with respect to the input signal's phase angle. The phase response of the transfer function H(jω) for an RC circuit is given by the expression.
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5 5. An aircraft is moving steadily in the air at a velocity of 330 m/s. Determine the speed of sound and Mach number at (a) 300 K (4 marks) (b) 800 K. (4 marks)
The speed of sound can be calculated using the equation v = √(γRT), where v is the speed of sound, γ is the adiabatic index (1.4 for air), R is the gas constant (approximately 287 J/kg*K), and T is the temperature in Kelvin.
(a) At 300 K, the speed of sound can be calculated as v = √(1.4 * 287 * 300) = 346.6 m/s. To find the Mach number, we divide the velocity of the aircraft (330 m/s) by the speed of sound: Mach number = 330/346.6 ≈ 0.951.
(b) At 800 K, the speed of sound can be calculated as v = √(1.4 * 287 * 800) = 464.7 m/s. The Mach number is obtained by dividing the velocity of the aircraft (330 m/s) by the speed of sound: Mach number = 330/464.7 ≈ 0.709.
The speed of sound can be calculated using the equation v = √(γRT), where v is the speed of sound, γ is the adiabatic index (1.4 for air), R is the gas constant (approximately 287 J/kg*K), and T is the temperature in Kelvin. For part (a), at a temperature of 300 K, substituting the values into the equation gives v = √(1.4 * 287 * 300) = 346.6 m/s. To find the Mach number, which represents the ratio of the aircraft's velocity to the speed of sound, we divide the given velocity of the aircraft (330 m/s) by the speed of sound: Mach number = 330/346.6 ≈ 0.951. For part (b), at a temperature of 800 K, substituting the values into the equation gives v = √(1.4 * 287 * 800) = 464.7 m/s. The Mach number is obtained by dividing the given velocity of the aircraft (330 m/s) by the speed of sound: Mach number = 330/464.7 ≈ 0.709.
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Prove that a Schmitt oscillator trigger can work as a VCO.
Step 1:
A Schmitt oscillator trigger can work as a VCO (Voltage Controlled Oscillator).
Step 2:
A Schmitt oscillator trigger, also known as a Schmitt trigger, is a circuit that converts an input signal with varying voltage levels into a digital output with well-defined high and low voltage levels. It is commonly used for signal conditioning and noise filtering purposes. On the other hand, a Voltage Controlled Oscillator (VCO) is a circuit that generates an output signal with a frequency that is directly proportional to the input voltage applied to it.
By incorporating a voltage control mechanism into the Schmitt trigger circuit, it can be transformed into a VCO. This can be achieved by introducing a variable voltage input to the reference voltage level of the Schmitt trigger. As the input voltage changes, it will cause the switching thresholds of the Schmitt trigger to vary, resulting in a change in the output frequency.
The VCO functionality of the modified Schmitt trigger circuit allows it to generate a continuous output signal with a frequency that can be controlled by the applied voltage. This makes it suitable for various applications such as frequency modulation, clock generation, and signal synthesis.
Step 3:
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Describe frequency, relative frequency, and cumulative relative frequency.
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A 15-hp, 220-V, 2000-rpm separately excited dc motor controls a load requiring a torque of 147 , the armature 45 N·m at a speed of 1200 rpm. The field circuit resistance is Rf TL circuit resistance is Ra The field voltage is Vf 0.25 , and the voltage constant of the motor is K₂ 220 V. The viscous friction and no-load losses are negligible. The arma- ture current may be assumed continuous and ripple free. Determine (a) the back emf Eg, (b) the required armature voltage Va, and (c) the rated armature current of the motor. Solution = = = = = = 0.7032 V/A rad/s.
(a) The back emf (Eg) of the motor is 0.7032 V/A rad/s.
(b) The required armature voltage (Va) for the motor is to be determined.
(c) The rated armature current of the motor needs to be calculated.
To determine the back emf (Eg), we can use the formula Eg = K₂ * ω, where K₂ is the voltage constant of the motor and ω is the angular velocity. Given that K₂ is 220 V and ω is 2000 rpm (converted to rad/s), we can calculate Eg as 0.7032 V/A rad/s.
To find the required armature voltage (Va), we need to consider the torque and back emf. The torque equation is T = Kt * Ia, where T is the torque, Kt is the torque constant, and Ia is the armature current. Rearranging the equation, we get Ia = T / Kt. Since the load requires a torque of 147 N·m and Kt is related to the motor characteristics, we would need more information to calculate Va.
To determine the rated armature current, we can use the formula V = Ia * Ra + Eg, where V is the terminal voltage, Ra is the armature circuit resistance, and Eg is the back emf. Given that V is 220 V and Eg is 0.7032 V/A rad/s, and assuming a continuous and ripple-free armature current, we can calculate the rated armature current. However, the given values for Ra and other necessary parameters are missing, making it impossible to provide a specific answer for the rated armature current.
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