MHD093B-058-PP0-BN In Stock, Fast Shipping! | MHD Synchronous Motors

Product Description:

The MHD093B-058-PP0-BN synchronous motor from Bosch Rexroth is one of the various such motors in the MHD product group. This synchronous motor has a size code of 093 and a length code of B. The product offers cost-effective automation solutions when it is used with digital drive controllers from the same manufacturer. It is best known for its high operational reliability and high-performance data. It can be used under adverse environmental conditions because of its fully closed motor design. The unit features permanent magnets made of special materials so that the motor has a low inertia mass.

The motor must be used only as specified by the manufacturer to prevent it from getting damaged and it must be operated only by people who are qualified and trained to do so. The device has a winding code of 058. The housing of this product is suitable for liquid cooling or natural convection. It must be used only with the accessories approved by Bosch Rexroth. The drive controller connected to the motor has to be programmed before it is started, for the motor to perform the application-specific functions. The synchronous motor is likely to experience dangerous movements if it is handled incorrectly. We can ship the motor through our delivery partners such as DHL or UPS.

The product is intended for installation in commercial machinery. It must be operated only if the application meets the national EMC regulations. The motor is equipped with four pole pairs and it features a characteristic speed of 4,000 min^-1. The unit has a RAL 9005 prime black coat. The product must be set up within a maximum height of 1,000m above sea level. The unit should not be installed or operated if found to be defective or damaged. The motor is available with a warranty period of one year.

Specs
Revisions
Acceleration Torque Calculator
Pid Control Calculator
Power Converter

Feedback
Digital servo feedback with integrated encoder

Holding brake
No Brake

Housing design
Natural convection and liquid cooling

Max temperature
40 °C

Motor type
Synchronous

Power connector
Side B

Product type
Motor

Protection rating
IP65

Shaft
With key

Shaft seal
Yes

MHD093B058PP0BN
MHD093B 058 PP0 BN
mhd093b-058-pp0-bn
MHD93B-058-PP0-BN

Instructions

Use this calculator to compute the acceleration torque required to accelerate a load in a servomotor system. Enter the total inertia and angular acceleration, then click "Calculate Acceleration Torque" to see the result.

The acceleration torque is calculated using the formula: T_acc = J_total * α, where:

T_acc is the acceleration torque (Nm)
J_total is the total inertia of the system (kg·m²)
α (alpha) is the angular acceleration (rad/s²)

The total inertia (J_total) should include both the motor inertia and the load inertia reflected to the motor shaft.

Understanding Acceleration Torque

Acceleration torque is essential in defining the capability of a servomotor to initiate rotational motion. It's the torque required to overcome inertia and achieve a desired angular acceleration. In servomotor systems, proper torque calculation ensures optimal performance, preventing motor strain and energy inefficiency.

Importance for Industrial Automation

In industrial automation, precise motion control is vital. Calculating acceleration torque enables designers to choose suitable motors that meet dynamic motion demands, essential for the smooth operation of automated systems. This consideration enhances efficiency and prolongs motor lifespan in applications such as robotic arms and precision manufacturing equipment.

Total Inertia (J_total) in kg·m²

Angular Acceleration (α) in rad/s²

Result

Instructions

Use this calculator to compute the acceleration torque required to accelerate a load in a servomotor system. Enter the total inertia and angular acceleration, then click "Calculate Acceleration Torque" to see the result.

The acceleration torque is calculated using the formula: T_acc = J_total * α, where:

T_acc is the acceleration torque (Nm)
J_total is the total inertia of the system (kg·m²)
α (alpha) is the angular acceleration (rad/s²)

The total inertia (J_total) should include both the motor inertia and the load inertia reflected to the motor shaft.

Understanding Acceleration Torque

Acceleration torque is essential in defining the capability of a servomotor to initiate rotational motion. It's the torque required to overcome inertia and achieve a desired angular acceleration. In servomotor systems, proper torque calculation ensures optimal performance, preventing motor strain and energy inefficiency.

Importance for Industrial Automation

In industrial automation, precise motion control is vital. Calculating acceleration torque enables designers to choose suitable motors that meet dynamic motion demands, essential for the smooth operation of automated systems. This consideration enhances efficiency and prolongs motor lifespan in applications such as robotic arms and precision manufacturing equipment.

Instructions

Use this calculator to compute the control output for a PID controller in a servomotor system. Enter the PID gains (Kp, Ki, Kd), the current error, and the time step, then click "Calculate Control Output" to see the result.

The calculation uses the PID control law: u(t) = Kp * e(t) + Ki * ∫e(t)dt + Kd * de(t)/dt, where:

u(t) is the control output (e.g., motor voltage)
e(t) is the error (desired position - actual position)
Kp is the proportional gain
Ki is the integral gain
Kd is the derivative gain

Note: This calculator provides a simplified single-step calculation. In a real system, the PID controller would run continuously, updating the control output at each time step.

Understanding PID Controllers

PID controllers are essential in control systems, offering a way to regulate processes through feedback loops. They adjust control inputs based on the error between desired and actual outputs. The proportional term addresses present errors, the integral term corrects accumulated past errors, and the derivative term predicts future errors, enabling precise control.

Importance in Servo Systems

In servomotor applications, PID controllers ensure precise movement and positioning, which is crucial for industrial automation. By continuously adjusting the control signal (e.g., motor voltage), they maintain the desired position despite external disturbances or changes in system dynamics.

Proportional Gain (Kp)

Integral Gain (Ki)

Derivative Gain (Kd)

Error (e)

Time Step (dt) in seconds

Result

Instructions

Use this calculator to compute the control output for a PID controller in a servomotor system. Enter the PID gains (Kp, Ki, Kd), the current error, and the time step, then click "Calculate Control Output" to see the result.

The calculation uses the PID control law: u(t) = Kp * e(t) + Ki * ∫e(t)dt + Kd * de(t)/dt, where:

u(t) is the control output (e.g., motor voltage)
e(t) is the error (desired position - actual position)
Kp is the proportional gain
Ki is the integral gain
Kd is the derivative gain

Note: This calculator provides a simplified single-step calculation. In a real system, the PID controller would run continuously, updating the control output at each time step.

Understanding PID Controllers

PID controllers are essential in control systems, offering a way to regulate processes through feedback loops. They adjust control inputs based on the error between desired and actual outputs. The proportional term addresses present errors, the integral term corrects accumulated past errors, and the derivative term predicts future errors, enabling precise control.

Importance in Servo Systems

In servomotor applications, PID controllers ensure precise movement and positioning, which is crucial for industrial automation. By continuously adjusting the control signal (e.g., motor voltage), they maintain the desired position despite external disturbances or changes in system dynamics.

Instructions

Use this calculator to convert between different units of power. Select the units you want to convert from and to, enter the value, and click "Convert" to see the result.

Understanding Power Units

Power is a foundational concept in both everyday life and industrial applications. The term "watts" is ubiquitous, named after James Watt, a pivotal figure in the industrial revolution known for his advancements in steam engine technology. A watt represents the rate at which energy is transferred or converted and forms the basis for other power units such as kilowatts (1,000 watts), megawatts (1,000,000 watts), and more.

Importance in Industrial Automation and Servomotors

In industrial automation, precise power control is critical for maximizing efficiency and accuracy. Servomotors, essential components in automation systems, rely heavily on accurate power measurement. These motors, often used in robotics and CNC machinery, require specific power inputs to function correctly, translating electrical energy into controlled movements. The ability to convert between different power units helps engineers and technicians optimize these systems for energy consumption and performance. Whether ensuring that a robotic arm operates with sufficient power or managing the electrical requirements of a complex assembly line, understanding and converting power units is a crucial skill.

As technology advances, the necessity for precision grows. Power conversion tools, therefore, play an indispensable role in maintaining system efficiency and reliability, making them a staple in the toolkit of modern engineers and industrial technicians.

From

To

Value

Result

Instructions

Use this calculator to convert between different units of power. Select the units you want to convert from and to, enter the value, and click "Convert" to see the result.

Understanding Power Units

Power is a foundational concept in both everyday life and industrial applications. The term "watts" is ubiquitous, named after James Watt, a pivotal figure in the industrial revolution known for his advancements in steam engine technology. A watt represents the rate at which energy is transferred or converted and forms the basis for other power units such as kilowatts (1,000 watts), megawatts (1,000,000 watts), and more.

Importance in Industrial Automation and Servomotors

In industrial automation, precise power control is critical for maximizing efficiency and accuracy. Servomotors, essential components in automation systems, rely heavily on accurate power measurement. These motors, often used in robotics and CNC machinery, require specific power inputs to function correctly, translating electrical energy into controlled movements. The ability to convert between different power units helps engineers and technicians optimize these systems for energy consumption and performance. Whether ensuring that a robotic arm operates with sufficient power or managing the electrical requirements of a complex assembly line, understanding and converting power units is a crucial skill.

As technology advances, the necessity for precision grows. Power conversion tools, therefore, play an indispensable role in maintaining system efficiency and reliability, making them a staple in the toolkit of modern engineers and industrial technicians.

Frequently Asked Questions about MHD093B-058-PP0-BN:

Q: What are typical MHD motor applications?

A: MHD motor applications include machine tools, printing and paper industries, handling and automation, and packaging machines and food.

Q: What are MHD motor advantages?

A: MHD motor advantages include high reliability, maintenance-free operation, IP65 or higher protection rating, overload protection, high dynamics, easy cabling, and quick startup.

Q: What are MHD motor components?

A: MHD motor components include shaft, stator with winding, bearings, encoder, shaft with sealing ring, rotor with magnets, and optinal holding brake.

Q: How can you identify the motor?

A: A type label attached to the motor housing enables easy identification.

Q: What happens if the maximum temperature threshold is exceeded?

A: Output of the motor will derate if the maximum temperature threshold is exceeded.