Corrections to Equations 14, 15, and 16 for My 1997 paper "Foundations Of Parallel Universe Math"
This is from my paper: "Foundations Of Parallel Universe Math"
If the event is an observer, then the observer is faced with a time illusion about the universe. The observer will observe an event in the past from her curvature, and will falsely assume that the event in the past is at her same curvature. The observer will then falsely give an age after the Big Bang when the event occured, when in fact, the event in the past has it's own different curvature, which will determine a different age after the Big Bang. The Hubble Space Telescope seems to be reaching the distances where this effect is most noticable. It is the, "matter in the universe seems to be older then the universe it resides in" problem ("Hubble Space Telescope measures precise distance to the most remote Galaxy yet". Press release No. STScI-PR94-49. (10/26/94). http://oposite.stsci.edu/pubinfo/press-release/94-49.txt).
Here are three equations to determine the actual age of the event, versus the preceived age of the event. A is the age of the universe for the observer. B is the preceived age of the universe, relative to the Big Bang, of the observed event. F is the actual age of the event, relative to the Big Bang. D = 2*A/Pi. This is the equation when B is older then A/2, but younger then A,
F = Pi((90(2B-1)sin*D+D)^2+(90(2B-1)cos*D)^2)^-1/2
_ _ _ _ _ _
2 A 2 2 A 2. (14)
This is the equation, when B is exactly A/2
F = Pi/2*((D/2)^2+(D/2)^2)^-1/2. (15)
This is the equation, when B is younger then A/2
F = Pi/2((D-90(2B)cos(D))^2+(90(2B)sin(D))^2)^-1/2
_ _ _ _ _
2 A 2 A 2. (16)
This time illusion is a feature of curved spacetime. The difference between observed time of the event, and actual time of the event is a measure of the curvature of spacetime. The time illusion discrepencey is governed by the value of Z from Eq. (2). When Z = 1, there will be no time illusion. The three equations (14), (15), and (16) are for Z = Pi/2 only.
Well, equations 14, 15, and 16 are a mess. In 2002 I found a better set of equations that replace 14, 15, and 16.
Now all you need to know is the age of the universe for you (A), and the distance to the event (X). Both of these numbers need to be recorded in the same units.
A/π = C (Eq. 14.1)
90-90(X/A) = Θ (Eq. 14.2)
CsinΘ = B (Eq. 14.3)
B*π = Age of universe for event X (Eq. 14.4).
If the event is an observer, then the observer is faced with a time illusion about the universe. The observer will observe an event in the past from her curvature, and will falsely assume that the event in the past is at her same curvature. The observer will then falsely give an age after the Big Bang when the event occured, when in fact, the event in the past has it's own different curvature, which will determine a different age after the Big Bang. The Hubble Space Telescope seems to be reaching the distances where this effect is most noticable. It is the, "matter in the universe seems to be older then the universe it resides in" problem ("Hubble Space Telescope measures precise distance to the most remote Galaxy yet". Press release No. STScI-PR94-49. (10/26/94). http://oposite.stsci.edu/pubinfo/press-release/94-49.txt).
Here are three equations to determine the actual age of the event, versus the preceived age of the event. A is the age of the universe for the observer. B is the preceived age of the universe, relative to the Big Bang, of the observed event. F is the actual age of the event, relative to the Big Bang. D = 2*A/Pi. This is the equation when B is older then A/2, but younger then A,
F = Pi((90(2B-1)sin*D+D)^2+(90(2B-1)cos*D)^2)^-1/2
_ _ _ _ _ _
2 A 2 2 A 2. (14)
This is the equation, when B is exactly A/2
F = Pi/2*((D/2)^2+(D/2)^2)^-1/2. (15)
This is the equation, when B is younger then A/2
F = Pi/2((D-90(2B)cos(D))^2+(90(2B)sin(D))^2)^-1/2
_ _ _ _ _
2 A 2 A 2. (16)
This time illusion is a feature of curved spacetime. The difference between observed time of the event, and actual time of the event is a measure of the curvature of spacetime. The time illusion discrepencey is governed by the value of Z from Eq. (2). When Z = 1, there will be no time illusion. The three equations (14), (15), and (16) are for Z = Pi/2 only.
Well, equations 14, 15, and 16 are a mess. In 2002 I found a better set of equations that replace 14, 15, and 16.
Now all you need to know is the age of the universe for you (A), and the distance to the event (X). Both of these numbers need to be recorded in the same units.
A/π = C (Eq. 14.1)
90-90(X/A) = Θ (Eq. 14.2)
CsinΘ = B (Eq. 14.3)
B*π = Age of universe for event X (Eq. 14.4).
posted by picrosser at 10:58 PM
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