Difference between revisions of "Function Conjunction"
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'''[[Functions composed of Physical Expressions]]''' | '''[[Functions composed of Physical Expressions]]''' | ||
− | : A function composed of physical expressions is simply the result of the summations, differences, exponentiations, logarithms, or distributed multiplications or divisions of these physical expressions, or in the simplest case, a function simply equal to an expression, such as <math>E(m) = mc^2</math>, where <math>E</math> is a function of <math>m</math>. | + | : A function composed of physical expressions is simply the result of the summations, differences, exponentiations, logarithms, or distributed multiplications or divisions of these physical expressions, or in the simplest case, a function is simply equal to an expression, such as <math>E(m) = mc^2</math>, where <math>E</math> is a function of <math>m</math>. |
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Revision as of 01:18, 24 April 2016
The Anatomy of a Physical Expression
- A physical expression is a product of factors, each with their own distinct role in defining a property of a physical system. Types include constants, coefficients, quantities, proximities, dislocations, and directions.
Functions composed of Physical Expressions
- A function composed of physical expressions is simply the result of the summations, differences, exponentiations, logarithms, or distributed multiplications or divisions of these physical expressions, or in the simplest case, a function is simply equal to an expression, such as , where is a function of .
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HQ ● Glossary ● April 2016 Presentation
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