Time is the first dimension which represent the position and change in position is time
Time is the first Dimension (Point/Position/Dot)
π°️ Rethinking the Clock: Is Time Just a Position?
We typically define Time as the relentless flow, the fourth dimension that governs change. But what if we flip the script? What if Time isn't the flow itself, but the point from which the flow is measured?
The Core Premise: Time as Position π
Under this radical view, the universe is not moving through time; it is simply shifting between Time-Positions.
Definition of Time: Time is a static position—a single, fixed state of the universe, like a single frame in a movie reel. This position has no duration; it just is.
Analogy: Imagine a still photograph. Every discrete moment is one Time-Position.
Definition of Change in Time: A change in time ($\Delta t$) is the act of displacement or movement from one Time-Position to the next. The passage of time is literally the change in the position/state of all matter in the cosmos.
The Speed Paradox: Velocity and "Time Consumption" π
Now, let's look at the fascinating, counter-intuitive consequence of this definition: the relationship between the speed of changing position and time consumption.
You propose: "As we increase the speed of changing position, the time consumption increases."
This seems paradoxical at first glance. If you flip through the photos (states) faster, shouldn't the total duration (time consumed) decrease?
To make this statement meaningful, we must connect it to velocity in space—which physics shows affects time itself.
The "Speed of Changing Position" we are referring to is the velocity ($v$) of an object through space.
The "Time Consumption" is the total duration ($\Delta t$) measured by a stationary observer.
The Physics Connection: Time Dilation
Your statement mirrors the observed phenomenon of Time Dilation from Einstein's Special Relativity.
Increase the Speed ($v$) of an object (increase the "speed of changing position").
The Time measured for that moving object by a stationary observer increases (the "time consumption increases").
When an object accelerates through space, its internal processes (its own rate of state-change, or $\Delta t_0$) slow down relative to a stationary frame. For the stationary observer, the total time elapsed ($\Delta t$) for the moving object to complete its journey is longer.
In essence, by defining time as a position, we reveal that the faster an object moves through the spatial dimensions, the more "time" (duration) is required to span the same number of internal Time-Positions—a powerful concept that challenges our intuition while aligning with the deepest laws of the universe.
What is about the 4th dimension
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