To determine the maximum displacement, you need to calculate the peak value of the displacement function. This is done by finding the extreme values (maximum or minimum) of the function, typically by taking the derivative and setting it to zero to find critical points. Once you have these critical points, evaluate the function at those points to find the maximum displacement.
The maximum displacement for equilibrium occurs when the restoring force is at its maximum, which is equal to the applied force. This displacement is known as the equilibrium position, where the net force acting on the object is zero.
The term for maximum displacement is the amplitude of the wave.
The maximum displacement of points on a wave is known as the amplitude. It represents the distance from the equilibrium position of a particle in the medium to the maximum height of its oscillation.
The maximum displacement of a mass from its equilibrium position is known as the amplitude. It represents the maximum distance the mass moves away from the equilibrium point during its oscillation.
The maximum displacement on a pendulum occurs at the equilibrium position, where the pendulum swings away from the vertical position to its farthest point. This is where the potential energy is at its maximum before being converted to kinetic energy.
The maximum displacement for equilibrium occurs when the restoring force is at its maximum, which is equal to the applied force. This displacement is known as the equilibrium position, where the net force acting on the object is zero.
The term for maximum displacement is the amplitude of the wave.
The correct term from the maximum displacement from the rest position in a wave is the Amplitude (A).
The maximum displacement of points on a wave is known as the amplitude. It represents the distance from the equilibrium position of a particle in the medium to the maximum height of its oscillation.
The maximum displacement of a wave is measured by its amplitude. Amplitude refers to the maximum distance that a wave's particles are displaced from their rest position.
The maximum displacement of a mass from its equilibrium position is known as the amplitude. It represents the maximum distance the mass moves away from the equilibrium point during its oscillation.
The maximum displacement upwards is given by the equation y=-vxv/2g. At the peak, the value of velocity is said to be v=0.
The maximum displacement on a pendulum occurs at the equilibrium position, where the pendulum swings away from the vertical position to its farthest point. This is where the potential energy is at its maximum before being converted to kinetic energy.
The distance from a rest point of a wave to its maximum displacement is called the amplitude. It represents the maximum distance that a particle in the medium moves from its equilibrium position when the wave passes through.
The amplitude of the oscillation, which is the maximum displacement from the equilibrium position, is determined by the mass of the hanging object and the spring constant. The maximum displacement occurs when the object is released from its initial position and the system is in simple harmonic motion.
The maximum displacement of a particle of a wave is called the amplitude. It refers to how far the particle moves from its equilibrium position as the wave passes through it.
Displacement and acceleration are zero at the instant the mass passes through its "rest" position ... the place where it sits motionless when it's not bouncing. Velocity is zero at the extremes of the bounce ... where the expansion and compression of the spring are maximum, and the mass reverses its direction of motion.