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But, many a student is left scratching their head. The first, and perhaps the most important step, in understanding logarithms is to realize that they always relate back to exponential equations....
1 Introduction To Logarithms 2 Logarithms were originally developed to simplify complex arithmetic calculations. They were designed to transform multiplicative processes into additive ones. 3...
Let them learn about three of the five properties of logarithms (product, power and quotient) in only one class! With this fun and informative lesson plan, your students will be sure to get the most out of their math lessons.
28 Μαρ 2015 · Product, quotient, power and root: • The logarithm of a product is the sum of the logarithms of the numbers being multiplied, the logarithm of the ratio of two numbers is the difference of the logarithms.
6 Μαρ 2012 · The document discusses logarithmic functions and how they relate to exponential forms. It explains that logarithmic functions take the form logb(y)=x, where b is the base, y is the output, and x is the exponent. This is equivalent to the exponential form bx=y.
13 Ιαν 2012 · Logarithms. S. siking26. John Napier, a Scottish mathematician and astronomer, discovered logarithms in the late 16th century as a way to simplify calculations. He introduced the concept of logarithms to ease complex mathematical computations.
10 Σεπ 2014 · Logarithms. Properties and Uses. Some background. A logarithm (generally called the “log” of a number) is the “power to which a given base must be raised to equal that number.” Common bases: Base 10 and Base e. Examples. Base 10 logarithms: 10 * 10 = 100. So 10 squared equals 100. 215 views • 19 slides
