3. Gravity Dansk
   

 The Relation between Acceleration due to Gravity and Contracted Space.

   

Since Newton's findings, we have known that the acceleration of gravity can be neutralized when the direction of the forces act  in opposition to each other.

    

However, we forget that gravity is more than just attraction between two or more objects. We need to understand what is actually happening with space when two or more objects approach each other.

 

It is right that two objects approaching each other will neutralize each other’s attraction to an object between them. However, while this is happening, space between the two objects will be further contracted.  

 

So long as we do not understand the cause or connection between these two properties, it's easy to follow incorrect paths of reasoning.

   

The new theory is clear and simple:

  • When two objects approach each other the space between objects becomes further contracted.

  •  The cause of acceleration due to gravity is the relative change in contraction of space per unit distance.

When two objects approach each other they affect two gravitational properties in a known way. Between the bodies the acceleration due to gravity will decrease but the force of attraction will increase.

If a body is situated precisely at the blue X (above), the difference in level of contracted space will be equalized in exactly that spot.  

Therefore, this body will not move. However, this does not mean that contracted/deformed space has disappeared on this spot, it only means that the difference in level per distance has changed, meaning that there is no movement exactly at the point of the blue X

  

Two (inseparable) qualities of gravity have changed and will continue to do so as long two objects approach each other.   

   

Four bodies close to each other will involve an even more deformed/contracted space between them. 

       

The next chapter will show that a globular gravitational field will continue this process which will further strengthen the contracted (deformed) central space. It will only mean a temporary central weakening of the acceleration due to gravity when several gravitational fields will combine into one.

 

 Example

 

 The tide shows that space between two bodies has been further contracted.

 

 

 Gravity Domino effect

The space inside ring 'A' (illustration above) is affected to the same extent as each of the successive rings (B and C). That is; the total gravitational force for rings A, B, and C are the same (see calculation below).

 

 

Ring A

Square (outer)

2m x 2m

=

4 m2

Square (inner)

1m x 1m

=

1 m2

Square incensement

 4m2 - 1 m2  

3 m2

Average gravity (g)

100m/s2

 

 

Total Influence  / potential

100m/s2 * 3m2

=

300

 

Ring B

Square (outer)

4m x 4m

=

16 m2

Areal (inderste)

2m x 2m

=

4 m2

Areal tilvækst

 16m2 - 4 m2  

12 m2

Average gravity (g)

25 m/s2

 

 

Total Influence  / potential

25 m/s2 * 12m2

=

300

 

 This equivalency continues throughout the entire universe.

 Each ring’s radius is twice that of the preceding ring. Each time a rings radius doubles we know that gravitational force decreases by a factor of 4.

But, the total amount of gravity affecting space remains the same throughout all the rings.

 

Each time a rings radius doubles, the square increases with 75% and at the same time acceleration due to gravity decreases (in the the increased area) with 75%. The proportions between decreasing gravity and increasing area (space) is hence  1 : 1. - We are used to thing about gravity with proportions as (r/g) 2:1. But we get a better understanding to se in a 1 : 1 proportional perspective. Because this shows that when gravity contracts one place. This will make it easier to understand that matter contracts space.

 

The gravitational force is unchanging as one moves away, from the centre of the rings. This is what is intended to be understood as a ‘domino-like effect’. The gravitational force continues to ‘repeat itself’; again and again, forever.

 

Copyright © 2006 - 2009 Bjarne Lorenzen www.science27.com