HallsofIvy said:Yes, [itex]ln(x)^3[/itex] means [itex](ln(x))^2[/itex] as opposed to [itex]ln(x^3)[/itex]. (The second form, with parentheses, is preferable as it is clearer.) It is the latter to which we can apply the "law of logarithms": [itex]ln(x^3)= 3ln(x)[/itex].
Look at a numerical example: ln(2)= 0.6931, approximately, so [itex](ln(2))^3= 0.3330[/itex] while [itex]ln(2^3)= ln(8)= 2.0794= 3ln(2)[/itex].
uart said:Be aware that you'll also see abbreviated notations without the brackets. Like,
[tex]\log x^2 = \log(x^2)[/tex]
and
[tex]\log^2 x = ( \log(x) )^2[/tex]
This type of notation is frequently used with trig functions too.
Logarithm notation is a mathematical representation of the inverse of exponential functions. It is used to solve equations involving exponential functions.
Logarithm notation is read as "log" followed by the base of the logarithm and then the value inside the parentheses. For example, log2(8) is read as "log base 2 of 8."
The base in logarithm notation is the number that is raised to a power to get the input value. For example, in log2(8), 2 is the base.
The properties of logarithm notation include the product property, quotient property, and power property. These properties allow for the simplification and manipulation of logarithmic expressions.
Logarithm notation is used in various fields such as science, engineering, and finance to represent quantities that grow or decay exponentially. It is also used in data analysis and modeling to describe exponential growth or decay patterns.