Independent Researcher, BSc E, DULE, 1641 Sandy Point Rd, Saint John, NB, Canada E2K 5E8, Canada
Received date: December 01, 2016; Accepted date: February 09, 2017; Published date: February 17, 2017
Citation: Cusack PTE (2017) Cusack’s Universal Bridge. Fluid Mech Open Acc 4:151.
Copyright: © 2017 Cusack PTE. This is an open-access article distributed under the terms of the Creative Commons Attribution License, which permits unrestricted use, distribution, and reproduction in any medium, provided the original author and source are credited.
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Here is the Structural Analysis of a bridge design that models the physical universe parameters found in Astrotheology.
Cusack’s bridge; Cantilever; Spring; 3 Hinged arch
Every Civil Engineer should have a chance to design a bridge. So, here I design what I term the Cusack Universal Bridge. It models the physical universe and all its parameters. We begin with the spring (Figure 1).
We continued with static equilibrium and the sum of the forces and moments equalling zero.
The Dampened cosine function for a spring,
Y=e-t cos θ=
Let θ=sin 45°=cos 45°
Y=1=s=x in our spring.
Finally, the basic cantilever:
When we solve this system of equations we get:
Va=15.39=1/sin 1 1/Force
Fb=390 1/Period T=1/E
Fd=6.56 Gravitational Constant=G less Nuclear
Ve=14.95 Mass Gap
So all of the Universal parameters are contained here.
s.G,k,.F,t=x=s,Y=G.M., a=v=sin 45deg., dM/dt, δ, freq, c² (Figures 2 and 3).
Thus we see that a 3 point arch bridge can be used to model the physical universe and its 12 parameters .