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Fizyka - program rozszerzony I

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Lekcja 4: Energia oscylatora harmonicznego

Energy of simple harmonic oscillator review

Overview of equations and skills for the energy of simple harmonic oscillators, including how to find the elastic potential energy and kinetic energy over time. Understand how total energy, kinetic energy, and potential energy are all related.

Równania

Equation	Symbol breakdown	Meaning in words
$U_{s} = \frac{1}{2} k x^{2}$ ‍	$U_{s}$ ‍ is the elastic potential energy, $k$ ‍ is spring constant, and $x$ ‍ is length of extension or compression relative to the un-stretched length.	The elastic potential energy is directly proportional to the square of the change in length and the spring constant.
$Δ U_{g} = m g Δ y$ ‍	$Δ U_{g}$ ‍ is change in gravitational potential energy, $m$ ‍ is mass, $g$ ‍ is the gravitational field strength, and $Δ y$ ‍ is change in height.	The change in gravitational potential energy is directly proportional to mass, gravitational field strength, and change in height.
$K = \frac{1}{2} m v^{2}$ ‍	$K$ ‍ is translational kinetic energy, $m$ ‍ is mass, and $v$ ‍ is the speed.	Translational kinetic energy is directly proportional to mass and the square of the speed.

How to find energy over time for a simple harmonic oscillator

Elastic potential energy

Elastic potential energy depends upon the position of our system, so a position vs. time graph can be used to find the elastic potential energy

U_{s}

over time for a simple harmonic oscillator. There are a few important points to note when comparing the position and energy graphs:

$U_{s, max}$ ‍ occurs when the system is at the maximum displacement of $A$ ‍ and $- A$ ‍.
$U_{s} = 0$ ‍ occurs when the system is at $x = 0$ ‍.

Kinetic energy

K

depends upon the speed of a system, so a velocity vs. time graph can be used to find the kinetic energy over time for simple harmonic oscillator. There are a few important points to notice when comparing the velocity and energy graphs:

$K_{max}$ ‍ occurs when the system is at its maximum speeds $| v_{max} |$ ‍ and $| - v_{max} |$ ‍.
$K = 0$ ‍ occurs when $v = 0$ ‍.

Total energy

The total energy is the sum of the kinetic and elastic potential energy of a simple harmonic oscillator:

E = K + U_{s}

The total energy of the oscillator is constant in the absence of friction. When one type of energy decreases, the other increases to maintain the same total energy.

There are a few important points to keep in mind about energy:

$U_{s, max}$ ‍ occurs when $K = 0$ ‍. This happens at the endpoints of the oscillation where the system momentarily stops ( $v = 0$ ‍) at the maximum displacement.
$K_{max}$ ‍ occurs at $U_{s} = 0$ ‍. This is when the system is moving through the equilibrium position ( $x = 0$ ‍) and has its maximum speed.
$E_{tot}$ ‍ is constant, so $E_{tot} = K_{max} = U_{s, max}$ ‍.

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