The purpose of this problem is to show the entire concept of dimensional consistency can be summarized but the old saying "You can't add apples and oranges." It you have studied power series expansions in a calculus course, you know the standard mathematical funstions such as trigonometric functions, logarithms, and exponential function can be expressed as infinite sums of the form where the an are dimensionless constants for all n = 0, 1, 2, ... and x is the argument of the function. (If you have not studied power series in calculus yet, just trust us.) Use this fact to explain why the requirement that all terms in an equation have the same dimensions is sufficient as a definition of dimensional consistency. That is, it actually implies the arguments of standard mathematical funstions must be dimensional consistency. That is, it actually implies the arguments of standard mathematical functions must be dimensionless, so it is not really necessary to make this latter condition a separate requirement of the definition of dimensional consistency as we have done in this section.
The purpose of this problem is to show the entire concept of dimensional consistency can be summarized but the old saying "You can't add apples and oranges." It you have studied power series expansions in a calculus course, you know the standard mathematical funstions such as trigonometric functions, logarithms, and exponential function can be expressed as infinite sums of the form where the an are dimensionless constants for all n = 0, 1, 2, ... and x is the argument of the function. (If you have not studied power series in calculus yet, just trust us.) Use this fact to explain why the requirement that all terms in an equation have the same dimensions is sufficient as a definition of dimensional consistency. That is, it actually implies the arguments of standard mathematical funstions must be dimensional consistency. That is, it actually implies the arguments of standard mathematical functions must be dimensionless, so it is not really necessary to make this latter condition a separate requirement of the definition of dimensional consistency as we have done in this section.
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Transcribed Image Text:The purpose of this problem is to show the entire concept of dimensional consistency can be
summarized but the old saying "You can't add apples and oranges." It you have studied power series
expansions in a calculus course, you know the standard mathematical funstions such as trigonometric
functions, logarithms, and exponential function can be expressed as infinite sums of the form where
the an are dimensionless constants for all n = 0, 1, 2, ... and x is the argument of the function. (If you
have not studied power series in calculus yet, just trust us.) Use this fact to explain why the
requirement that all terms in an equation have the same dimensions is sufficient as a definition of
dimensional consistency. That is, it actually implies the arguments of standard mathematical funstions
must be dimensional consistency. That is, it actually implies the arguments of standard mathematical
functions must be dimensionless, so it is not really necessary to make this latter condition a separate
requirement of the definition of dimensional consistency as we have done in this section.
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