1. [1pt]
The angle that the string of a long pendulum makes with the
vertical is shown as a function of time. What is the angular
frequency of the pendulum?
Answer:
2. [1pt]
What is the amplitude of the pendulum's motion, in meters?
Homework Answers
Add Answer to:
1. [1pt]
The angle that the string of a long pendulum makes with the
vertical is...
1. The angle that the string of a long pendulum makes with the vertical is shown...
1.
The angle that the string of a long pendulum makes with the
vertical is shown as a function of time. What is the angular
frequency of the pendulum?
2.
What is the amplitude of the pendulum's motion, in meters?
The angle that the string of a long pendulum makes with the vertical is shown as a function of time. What is the angular frequency of the pendulum? What is the amplitude of the pendulum's motion, in meters?
The angle that the string of a long pendulum makes with the vertical is shown as...
The angle that the string of a
long pendulum makes with the vertical is shown as a function of
time.
a) What is the angular frequency of the pendulum?
b)What is the amplitude of the pendulum's motion, in meters?
physic
The angle that the string of a long pendulum makes with the vertical is shown as a function of time. What is the angular frequency of the pendulum? B) What is the amplitude of the pendulum's motion, in meters?
(1 point) Suppose a pendulum of length L meters makes an angle of θ radians with the vertical, as n the figure t can be...
(1 point) Suppose a pendulum of length L meters makes an angle of θ radians with the vertical, as n the figure t can be shown that as a function of time, θ satisfies the differential equation d20 + sin θ-0, 9.8 m/s2 is the acceleration due to gravity For θ near zero we can use the linear approximation sine where g to get a linear di erential equa on d20 9 0 dt2 L Use the linear differential equation...
previous 5 of 7 next Problem 11.46-Copy Part A In the laboratory, a student studles a...
previous 5 of 7 next Problem 11.46-Copy Part A In the laboratory, a student studles a pendulum by graphing the angle that the string makes with the vertical as a function of time t obtaining the graph shown in the figure (Eigure 1) What is the period of the pendulum's motion? Express your answer in seconds to one decimal place. Submit My Answers Give Up Part B What is the frequency of the pendulum's motion? Figure 1 of 1 Express...
(1 point) Suppose a pendulum with length L (meters) has angle 0 (radians) from the vertical. It can be shown that 0 as...
(1 point) Suppose a pendulum with length L (meters) has angle 0 (radians) from the vertical. It can be shown that 0 as a function of time satisfies the differential equation: d20 + -sin 0 = 0 dt2 L where g = 9.8 m/sec/sec is the acceleration due to gravity. For small values of 0 we can use the approximation sin(0) ~ 0, and with that substitution, the differential equation becomes linear A. Determine the equation of motion of a...
A 2.00 kg pendulum bob on a string 1.50 m long, is released with a velocity...
A 2.00 kg pendulum bob on a string 1.50 m long, is released with a velocity of 3.00 m/s when the support string makes an angle of 45.0 degrees with the vertical. What is the angle with the vertical the bob makes at the highest point of its motion?
(10 points) Suppose a pendulum with length L (meters) has angle (radians) from the vertical. It...
(10 points) Suppose a pendulum with length L (meters) has angle (radians) from the vertical. It can be shown that e as a function of time satisfies the differential equation: de 8 + -sin 0 = 0 dt2 L where g = 9.8 m/sec/sec is the acceleration due to gravity. For small values of we can use the approximation sin(0) - 0, and with that substitution, the differential equation becomes linear. A. Determine the equation of motion of a pendulum...
show all steps please (1 point) Suppose a pendulum with length L (meters) has angle 0...
show all steps please
(1 point) Suppose a pendulum with length L (meters) has angle 0 (radians) from the vertical. It can be shown that 0 as a function of time satisfies the differential equation: d20 +sin0 0 dt2 where g 9.8 m/sec/sec is the acceleration due to gravity. For small values of 0 we can use the approximation sin(0)~0, and with that substitution, the differential equation becomes linear. A. Determine the equation of motion of a pendulum with length...
Part 1: (Theory) Simple Pendulum 1. Consider a mass m hanging from a string of length...
Part 1: (Theory) Simple Pendulum 1. Consider a mass m hanging from a string of length L that makes an angle with the vertical (shown below). Assume the string is massless and that the hanging object is a point mass. Use Newton's Second Law directly to show that the equation of motion for this simple pendulum can be written: (LO) = -mgsin(o), (1) dia where is the angular displacement of the pendulum from its vertical equilibrium position (and is a...
1.
The angle that the string of a long pendulum makes with the
vertical is shown as a function of time. What is the angular
frequency of the pendulum?
2.
What is the amplitude of the pendulum's motion, in meters?
The angle that the string of a long pendulum makes with the vertical is shown as a function of time. What is the angular frequency of the pendulum? What is the amplitude of the pendulum's motion, in meters?
The angle that the string of a
long pendulum makes with the vertical is shown as a function of
time.
a) What is the angular frequency of the pendulum?
b)What is the amplitude of the pendulum's motion, in meters?
(1 point) Suppose a pendulum of length L meters makes an angle of θ radians with the vertical, as n the figure t can be shown that as a function of time, θ satisfies the differential equation d20 + sin θ-0, 9.8 m/s2 is the acceleration due to gravity For θ near zero we can use the linear approximation sine where g to get a linear di erential equa on d20 9 0 dt2 L Use the linear differential equation...
previous 5 of 7 next Problem 11.46-Copy Part A In the laboratory, a student studles a pendulum by graphing the angle that the string makes with the vertical as a function of time t obtaining the graph shown in the figure (Eigure 1) What is the period of the pendulum's motion? Express your answer in seconds to one decimal place. Submit My Answers Give Up Part B What is the frequency of the pendulum's motion? Figure 1 of 1 Express...
(1 point) Suppose a pendulum with length L (meters) has angle 0 (radians) from the vertical. It can be shown that 0 as a function of time satisfies the differential equation: d20 + -sin 0 = 0 dt2 L where g = 9.8 m/sec/sec is the acceleration due to gravity. For small values of 0 we can use the approximation sin(0) ~ 0, and with that substitution, the differential equation becomes linear A. Determine the equation of motion of a...
(10 points) Suppose a pendulum with length L (meters) has angle (radians) from the vertical. It can be shown that e as a function of time satisfies the differential equation: de 8 + -sin 0 = 0 dt2 L where g = 9.8 m/sec/sec is the acceleration due to gravity. For small values of we can use the approximation sin(0) - 0, and with that substitution, the differential equation becomes linear. A. Determine the equation of motion of a pendulum...
show all steps please
(1 point) Suppose a pendulum with length L (meters) has angle 0 (radians) from the vertical. It can be shown that 0 as a function of time satisfies the differential equation: d20 +sin0 0 dt2 where g 9.8 m/sec/sec is the acceleration due to gravity. For small values of 0 we can use the approximation sin(0)~0, and with that substitution, the differential equation becomes linear. A. Determine the equation of motion of a pendulum with length...
Part 1: (Theory) Simple Pendulum 1. Consider a mass m hanging from a string of length L that makes an angle with the vertical (shown below). Assume the string is massless and that the hanging object is a point mass. Use Newton's Second Law directly to show that the equation of motion for this simple pendulum can be written: (LO) = -mgsin(o), (1) dia where is the angular displacement of the pendulum from its vertical equilibrium position (and is a...
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