answersLogoWhite

0


Best Answer

t = 2*pi*sqrt(l/g)

Where t is the period,

l is the length

and g is the accelaration due to gravity.

User Avatar

Wiki User

14y ago
This answer is:
User Avatar

Add your answer:

Earn +20 pts
Q: What mathematical relationship applies between the pendulum length and the oscillation period?
Write your answer...
Submit
Still have questions?
magnify glass
imp
Related questions

What is the theory of oscillation?

The theory of oscillation is a mathematical theory that describes the behavior of a system that experiences periodic changes in a regular, repeating pattern. It is based on the concept of a simple harmonic oscillator, which is a system where an object (like a mass on a spring) moves back and forth in a predictable and repetitive motion. The theory of oscillation applies to physical systems, such as pendulums, electrical circuits, and many other types of systems. It can also be used to describe certain mathematical models, such as the wave equation and the equations of motion.The theory of oscillation is based on the idea that a system with certain properties can be described by a mathematical equation. This equation is known as a differential equation, and it describes the behavior of the system over time as it experiences different forces and influences. The properties of the system, such as its mass, spring constant, and other factors, determine how the system will behave. The motion of the system is described by the solution to the differential equation, which is known as the oscillation equation. The theory of oscillation helps to explain the behavior of a system in terms of certain variables, such as position, velocity, acceleration, and force. It can also be used to determine the frequency, amplitude, and phase of a system's oscillation. Additionally, it can be used to analyze the stability of a system, which is important to understand when designing a system that has to operate under certain conditions.


What is an oscilator?

An oscillation is a term we could use to refer to a single cycle of a cyclic or repeating motion. Let's just take one example (so we don't run it into the ground) and see how it applies. And we'll use that familiar pendulum clock. The pendulum on a clock will be driven by a spring. We swing the pendulum up, release it, and gravity and the spring do the rest. The spring, as you have guessed, adds just enough energy to offset the friction loss in the system. When we lift the pendulum and release it, it is pulled down (accelerated) by gravity. It passes through a point where it is at the "bottom" of the swing (having achieved maximum velocity), and then heads up on the other side. It's decelerating here under the influence of gravity - that same gravity that accelerated it. I continues to slow, it stops, and then accelerates back down and across the "middle" or "bottom" again. Up it goes to the top of its arc on the other side, and it returns to its starting point. It has completed one cycle of its oscillation. It has performed one oscillation. Simple, and easy.


If a person pulls a hanging pendulum to one side and holds it what happens?

it has potential energy while your hand applies and equal and opposite force


Does gender equality applies on relationship?

yes but everthing is give and take


What is 326 in distributive property?

The distributive property applies to two mathematical operations over some set - not a single number!


What enables a pendulum to swing back and forth in a grandfather clock?

Spring Tension or a hanging weight. They are geared up to a small special shaped cog that applies pressure to the pendulem intermittantly.


What is the distrulive property of 80 plus 16?

There is no such thing as a "distrulive" property. The nearest mathematical term is the distributive property and normally that applies to two mathematical operations being applied to three arguments (inputs) - not one operation and two inputs.


What is the mathematical difference between volume and capacity?

Volume is a pace which can be occupied by some thing, whereas capacity is applies to liquids as the quantity contained in a given space.


What is the distributive property for 410?

The distributive property refers to a property that applies to two mathematical operations over three elements of a set. It is not a property of a single element such as 410.


What parallels if any can you find in Shakespeare's relationship with Anne and Macbeth's relationship with lady Macbeth?

Shakespeare was a man and Anne was a woman. Coincidentally the same applies to Macbeth and Lady Macbeth.


What is probability of dissembling hard matter on a newtonian level by the neutralization of an electron's oscillation .Does a frequency or wave exist that could achieve this outcome.?

Did you mean "oscillation", or did you really want to stop electrons from kissing? (I'm aware of osculating elements in Keplerian orbital mechanics, but I don't see how the concept applies here... on the other hand, oscillation doesn't make a great deal of sense in this context either). Ignoring the first sentence entirely and concentrating on the second: You can kick electrons out of an atom by application of suitably high-energy photons. I don't think that's what you're talking about, though.


What mathematical symbols are used in Korea?

Mathematics is an international language - it doesn't change dependent upon country - so +, -, x, %, ( ), <, ±, and all that other fun stuff still applies...