Chapter 3 - The rotating universe modified 20110924

Introduction

As the light and energy orbit the expanding Cosmos, it takes longer to reach a reference point against the background universe. Newton would call this reference
point absolute space. Mach would call it the fixed stars. The Cosmos, galaxy and solar system all rotate, with respect to that which is outside our cosmic dynamic unit. If the background universe
has features which are close enough, and these features are not black holes, then they may be visible through the intense orbiting energy and light around the Cosmos. Seeing through this orbital
energy seems possible since stars are visible near the sun during an eclipse as starlight perpendicular to the huge energy flow from the sun. We might be seeing such features in the Hubble
telescope deep field photographs. It would not be remarkable if the background universe looks the same as it does within our dynamic unit Cosmos.Go back to - Chapter 2 - Black holes

Goto Chapter 4 - Dark matter The

The **rate of change **of the **angle of rotation **is the **angular velocity.**

The **rate of change **of the **angle of rotation** is **1/age.**

The **rate of change **of the **ln(age)** is **1/age.**

The **angle of rotation = ln(age)** = the natural logarithm of the age = **ln(4.73E17) = 40.7 radians**.

The base of the natural logarithms is **e**.

**e ^{(angle of rotation)} = e^{40.7} = 4.73E17 = age**

The previous revolution took

The next revolution will end in,

The next revolution will take

The rate of change of the angular velocity **(1/age)** is the angular acceleration.

**angular acceleration = -(1/age ^{2}) = -4.46E-36_1/s^{2}.** This is the second derivative of the angle of rotation. This very small rate that the Cosmos is decelerating in its
rotation is necessary for the equilibrium between rotation and expansion. We are rotating with the Cosmos. Everything has the same universal angular velocity

m*r

a = r *angular acceleration = tangent acceleration

a = c*age *(1/age

The direction of deceleration is opposite of rotation. The tangent acceleration can also be calculated from velocity dependent inertial induction with the same result. Inertia will cause an outward directed mass, on a rotating platform, to lag behind in a direction opposite to the rotation. This is the reaction. The action which is the coriolis acceleration is in the direction of the rotation. A person in an accelerating car is pushed back against the seat. This is a reaction to the acceleration. The acceleration is in the direction of the velocity. The reaction is in the direction opposite the velocity.

vr is the radial velocity which at the perimeter is c.

M *r

M *vr

M

If the mass of the black hole is, M = Mc, the mass of the Cosmos, then

We see that the age

References

- Machian view @ http://www.bun.kyoto-u.ac.jp/~suchii/mach.pr.html
- Inertial inductance @ http://blackholeformulas.com/files/InertialInductance.html
- Spiral png @ http://blackholeformulas.com/files/unfigspiral2.png