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The Road to Reality Study Notes: Difference between revisions

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This fact is fundamental in the use of logarithms.  To show this, we start with the expression $$b^{m+n} = b^m \times b^n$$. The represents the idea of [https://en.wikipedia.org/wiki/Exponentiation exponentiation], which is easy to grasp for $$m$$ and $$n$$ being positive integers, as each side just represents $$m+n$$ instances of the number $$b$$, all multiplied together.  If $$b$$ is positive, this law is then showed to hold for exponents that are positive integers, values of 0, and fractions.  If $$b$$ is negative, we require further expansion into the complex plane.  
This fact is fundamental in the use of logarithms.  To show this, we start with the expression $$b^{m+n} = b^m \times b^n$$. The represents the idea of [https://en.wikipedia.org/wiki/Exponentiation exponentiation], which is easy to grasp for $$m$$ and $$n$$ being positive integers, as each side just represents $$m+n$$ instances of the number $$b$$, all multiplied together.  If $$b$$ is positive, this law is then showed to hold for exponents that are positive integers, values of 0, and fractions.  If $$b$$ is negative, we require further expansion into the complex plane.  


If we then define the [https://en.wikipedia.org/wiki/Logarithm logarithm to the base b] as the inverse of the function $$f(z) = b^z$$ such that <math>z=log_bw</math> for $$w=b^z$$ then we should expect $$z=logb(p \times q) = logbp + logbq$$.  This would then convert multiplication into addition and allow for exponentiation in the complex plane.
If we then define the [https://en.wikipedia.org/wiki/Logarithm logarithm to the base b] as the inverse of the function $$f(z) = b^z$$ such that <math>z=log_bw</math> for $$w=b^z$$ then we should expect <math>z=log_b(p \times q) = log_bp + log_bq</math>.  This would then convert multiplication into addition and allow for exponentiation in the complex plane.


=== 5.3 Multiple valuedness, natural logarithms ===
=== 5.3 Multiple valuedness, natural logarithms ===
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