About: Unified shield yield equations   Sponge Permalink

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The unified shield yield equations were a complex set of multivariable calculus equations that described the variation and maximum and minimum shield area coverage and shielding power on any shielded vehicle or object. These gargantuan, interrelated equations had a series of variables to determine shield area and protection, which included a set of surface coefficients, an extremely complicated matrix of variables corresponding to the shield generator, including method of projection, the projector, and the energy provided to the generator to generate the deflector shield. There were also several minor variables regarding less important points such as the medium by which the shield would be projected through, atmospheric conditions, and so on and so forth.

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  • Unified shield yield equations
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  • The unified shield yield equations were a complex set of multivariable calculus equations that described the variation and maximum and minimum shield area coverage and shielding power on any shielded vehicle or object. These gargantuan, interrelated equations had a series of variables to determine shield area and protection, which included a set of surface coefficients, an extremely complicated matrix of variables corresponding to the shield generator, including method of projection, the projector, and the energy provided to the generator to generate the deflector shield. There were also several minor variables regarding less important points such as the medium by which the shield would be projected through, atmospheric conditions, and so on and so forth.
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  • The unified shield yield equations were a complex set of multivariable calculus equations that described the variation and maximum and minimum shield area coverage and shielding power on any shielded vehicle or object. These gargantuan, interrelated equations had a series of variables to determine shield area and protection, which included a set of surface coefficients, an extremely complicated matrix of variables corresponding to the shield generator, including method of projection, the projector, and the energy provided to the generator to generate the deflector shield. There were also several minor variables regarding less important points such as the medium by which the shield would be projected through, atmospheric conditions, and so on and so forth. By taking the complex first derivative and finding its zeroes in a multidimensional solutions matrix with an incredibly titanic number of possible solutions enclosed within the square brackets, one could find the optimal conditions required to project a shield of either maximum strength or maximum enclosing area, or a mixture of both, over any object. However, this task was extremely complicated, often requiring several days to several months for objects on even supercomputers with linked nanotechnology processors, depending on the complexity of the starting variable set and other eccentric factors. Not even considering the solution of the unified equations, the original equations were extremely complex to construct in the first place, requiring intensive testing to derive the starting variables. The Unified Shield Yield Equations were proved by the Shield Theory, proposed by the ancient Yevethan mathematician and prodigy Araa Spaar circa 180 BBY.
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