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provide the underlying theory of the logarithm function. This has applications in many fields, for example, the decibel scale in acoustics. In order to master the techniques explained here it is vital that you do plenty of practice exercises so that they become second nature.
number not involving a logarithm. a) log 24 log 32 2− b) log 96 3log 2 log 43 3 3− − c) 5 5 5 1 2 log 500 log log 10 5 + − d) 2log 54 log 0.25 4log 23 3 3− − e) 8log 2 log 4 3log 96 6 6− −( ) 3 , 1 , 3 , 6 , 6
Worksheet 2:7 Logarithms and Exponentials Section 1 Logarithms The mathematics of logarithms and exponentials occurs naturally in many branches of science. It is very important in solving problems related to growth and decay. The growth and decay may be that of a plant or a population, a crystalline structure or money in the bank. Therefore
Find the value of y. 2. Evaluate. 3. Write the following expressions in terms of logs of x, y and z. 4. Write the following equalities in exponential form. 5. Write the following equalities in logarithmic form. 6. True or False? 7. Solve the following logarithmic equations. 8. Prove the following statements. 9.
Practice using logarithms to solve exponential equations with Khan Academy's free online exercises. The basic equation is as follows: us to approximate the pH of buffer solutions using initial concentrations.
This topic introduces logarithms and exponential equations. Logarithms are used to solve exponential equations, and so are used along with exponential functions when modelling
There are three laws of logarithms which you must know. log a x + log a y = log a ( xy ) where a , x , y > 0 . If two logarithmic terms with the same base number (a above) are being added together, then the terms can be combined by multiplying the arguments (x and y above). log 5 4 ) 2 × 4 = log 5 8. where a , x , y > 0 .
