SafekipediaProper length, also called rest length, is the length of an object when it is not moving. This idea is important in physics, especially when we study how things change when they move very fast.
In classical mechanics, measuring length is simple because we assume everything happens at the same time. But in the theory of relativity, things are more complicated because what happens at the same time depends on who is looking.
To help solve this, scientists use a term called proper distance. This is a special way to measure distance that gives the same answer for everyone, no matter how they are moving. Proper distance is like proper time, which measures time in a similar way, but proper distance is used for space instead of time.
Proper length or rest length
The proper length or rest length of an object is the length of the object when measured by someone who is not moving relative to it. This measurement can be done using standard measuring tools placed directly on the object.
In situations where an observer is moving relative to the object, the measurement becomes more complex. The moving observer must measure the object's endpoints at the exact same moment, and the result will appear shorter than the proper length. This effect is known as length contraction.
Proper distance between two events in flat space
In special relativity, the proper distance between two events that happen at the same time in a certain view is just the straight-line distance between them. We can find this distance using a simple formula: Δσ = √ (Δx² + Δy² + Δz²), where Δx, Δy, and Δz are the changes in the x, y, and z directions between the two events.
There is also a way to calculate this distance even if the events do not happen at the same time. This formula is Δσ = √ (Δx² + Δy² + Δz² - c²Δt²), where Δt is the time difference between the events and c is the speed of light. Both ways to calculate the distance give the same result because of a special property in space and time.
Proper distance along a path
The distance between two places can change depending on the shape of the space around them. In flat space, the distance is just a straight line. But in curved space, like near a big object, there can be many different straight paths between two points.
To find the distance along any path, we use a special math formula. This formula looks at the tensor, which tells us about the shape of space, and the small steps along the path. It helps us work out the distance even when space is curved.
This article is a child-friendly adaptation of the Wikipedia article on Proper length, available under CC BY-SA 4.0.