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Question 1 Simplify each of the following logarithmic expressions, giving the final answer as a single logarithm. a) log 7 log 22 2+ b) log 20 log 42 2− c) 3log 2 log 85 5+ d) 2log 8 5log 26 6− e) log 8 log 5 log 0.510 10 10+ − log 142, log 52, log 645, log 26, log 8010
Logarithms. Study the statement. 100 = 102. In this statement we say that 10 is the base and 2 is the power or index. Logarithms provide an alternative way of writing a statement such as this. We rewrite it as. log10 100 = 2. This is read as ‘log to the base 10 of 100 is 2’. These alternative forms are shown in Figure 1.
After reading this text and / or viewing the video tutorial on this topic you should be able to: explain what is meant by a logarithm. state and use the laws of logarithms. solve simple equations requiring the use of logarithms.
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The laws of logarithms. The three main laws are stated here: . First Law. log A + log B = log AB. . This law tells us how to add two logarithms together. Adding log A and log B results in the logarithm of the product of A and B, that is log AB. For example, we can write. log10 5 + log10 4 = log10(5 × 4) = log10 20.
Logarithm Functions 6 2.1 The Natural Logarithm Function and its Graph The equation ey = x has a solution y = ln x for every positive value of x, so the natural domain of ln x is {x: x > 0}. The graph is show below. We won’t be using this graph, but it shows some of the properties of the logarithm function.
Powered by AI. The key takeaways are that the book is intended to teach English grammar to second language learners in a functional way to help them use English correctly and naturally. Grammatical terminology is used sparingly and exercises are designed for independent practice.
