How do you graph $g (x) = {log}_{6} x$ $g(x)= log_6 x$ ?

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How do you graph $g (x) = {log}_{6} x$ $g(x)= log_6 x$ ?

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Answer 1 · 2016-04-13T00:17:18

Using that ${log}_{6} (x)$ $log_6(x)$ is defined to be the value such that $6^{{log}_{6} (x)} = x$ $6^(log_6(x)) = x$ , we can find points to plot by using that

$g (6^{k}) = {log}_{6} (6^{k}) = k$ $g(6^k)=log_6(6^k) = k$ for any choice of $k$ $k$ . For example, we would have points such as $(1, 0), (6, 1), (36, 2)$ $(1,0), (6, 1), (36, 2)$ as well as $(\frac{1}{6}, - 1), (\frac{1}{36}, - 2)$ $(1/6, -1), (1/36, -2)$ .

In general, logarithmic functions tend to $- \infty$ $-oo$ as $x$ $x$ approaches $0$ $0$ , so we have a vertical asymptote at $x = 0$ $x=0$ . After that, you can use some easily plotted points such as the ones above to see approximately how the curve grows. In this case, the graph will be as follows:

graph{log(x)/log(6) [-2, 9, -3.5, 2]}

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How do you graph $g (x) = {log}_{6} x$ $g(x)= log_6 x$ ?

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