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A working time derivative refers to the rate of change of a quantity with respect to time in the context of a dynamic system. It is often used in engineering and physics to analyze the evolution of a system over time. Mathematically, it is denoted as dQ/dt, where Q is the quantity being analyzed and t is time.
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What is the relationship between the time derivative of force and the acceleration of an object?
The time derivative of force is equal to the mass of an object multiplied by its acceleration.
What is the relationship between velocity and the derivative of position?
The relationship between velocity and the derivative of position is that velocity is the derivative of position with respect to time. In other words, velocity is the rate of change of position over time.
What is the derivative of speed and how is it calculated?
The derivative of speed is acceleration, which measures how quickly an object's velocity is changing. It is calculated by finding the rate of change of velocity with respect to time. Mathematically, acceleration is the second derivative of position with respect to time.
What is the derivative of distance with respect to time in the context of motion?
The derivative of distance with respect to time in the context of motion is the velocity of an object. It represents how fast the object is moving at a specific moment in time.
What is the derivative of angular velocity and how is it calculated?
The derivative of angular velocity is angular acceleration. It is calculated by taking the derivative of the angular velocity function with respect to time. Mathematically, angular acceleration () is calculated as the rate of change of angular velocity () over time.
What does WTD pay mean on a payslip?
WTD on a pay slip/stub means working time derivative.
What is another name for the third order deritative of displacement?
First derivative of displacement with respect to time = velocity. Second derivative of displacement with respect to time = acceleration. Third derivative of displacement with respect to time = jerk.
What is the relationship between the time derivative of force and the acceleration of an object?
The time derivative of force is equal to the mass of an object multiplied by its acceleration.
What is the relationship between velocity and the derivative of position?
The relationship between velocity and the derivative of position is that velocity is the derivative of position with respect to time. In other words, velocity is the rate of change of position over time.
About derivatives market you mean the exacltly definition of derivative market?
the derivative market means the the price of particular product in the market is fluctuating time by time.
What is the derivative of speed and how is it calculated?
The derivative of speed is acceleration, which measures how quickly an object's velocity is changing. It is calculated by finding the rate of change of velocity with respect to time. Mathematically, acceleration is the second derivative of position with respect to time.
What is the physical name for fourth order derivatives?
We call "jerk" the third order derivative of position with respect to time, that is, the variation of acceleration. Some say that the derivative of jerk with respect to time (the fourth derivative of position with repsect to time) is called "jounce" or "snap".
What is the derivative of distance with respect to time in the context of motion?
The derivative of distance with respect to time in the context of motion is the velocity of an object. It represents how fast the object is moving at a specific moment in time.
What is the physical application of third- and fourth-order derivatives with respect to distance e g first derivative is slope?
in case of derivative w.r.t time first derivative with a variable x gives velocity second derivative gives acceleration thid derivative gives jerk
What is the derivative of angular velocity and how is it calculated?
The derivative of angular velocity is angular acceleration. It is calculated by taking the derivative of the angular velocity function with respect to time. Mathematically, angular acceleration () is calculated as the rate of change of angular velocity () over time.
What is the relationship between acceleration and the derivative of velocity?
The relationship between acceleration and the derivative of velocity is that acceleration is the rate of change of velocity. In other words, acceleration is the derivative of velocity with respect to time.
Is it derivative of or derivative from?
"Derivative of"
