Calculus for the Clueless - II - Bob Millers -.pdf

Chapter 1— Logarithms Most of you, at this point in your mathematical journey, have not seen logs for at least a year, maybe longer. The normal high school course emphasizes the wrong areas. You spend most of the time doing endless calculations, none of which you need here. By the year 2000, students will do almost no log calculations due to calculators. In case you feel tortured, just remember you only spent weeks on log calculations. I spent months!!! The Basic Laws of Logs 1. Defined, logb x = y (log of x to the base b is y) if by = x; log5 25 = 2 because 52 = 25. 2. What can the base b be? It can't be negative, such as -2, since (-2)1/2 is imaginary. It can't be 0, since 0n is either equal to 0 if n is positive or undefined if n is 0 or negative. b also can't be 1 since 1n always = 1. Therefore b can be any positive number except 1. Note The base can be 21/2, but it won't do you any good because there are no 21/2 tables. The two most common bases are 10, because we have 10 fingers, and e, a number that occurs a lot in mathematics starting now. A. e equals approximately 2.7. B. What is e more exactly? On a calculator press 1, inv, ln. C. log = log10 D. ln = loge (In is the natural logarithm). 3. A log y is an exponent, and exponents can be positive, negative, and zero. The range is all real numbers. 4. Since the base is positive, whether the exponent is positive, zero, or negative, the answer is positive. The domain, therefore, is positive numbers. Note In order to avoid getting too technical, most books write log |x|, thereby excluding only x=0. 5. logb x + logb y = logb xy; log 2 + log 3 = log 6. 6. logb x - logb y = logb (x/y); log 7 - log 3 = log (7/3). 7. logb xp = p logb x; ln 67 = 7 ln 6 is OK. Note Laws 5, 6, and 7 are most important. If you can simplify using these laws, about half the battle (the easy half) is done. Example 1— Write the following as simpler logs with no exponents: 4 ln a+ 5 ln b- 6 ln c- ½ ln d 8. logb b = 1 since b1 = b. log7 7 = 1. In e = 1. log 10 = 1. 9. logb 1 = 0 since b0 = 1.