ln(xy)
To simplify the expression ln(xy), we can apply the properties of logarithms
To simplify the expression ln(xy), we can apply the properties of logarithms.
The property we will use is the product rule of logarithms, which states that ln(xy) is equal to ln(x) + ln(y).
Therefore, ln(xy) = ln(x) + ln(y).
This property holds true for any positive real numbers x and y.
For example, if x = 2 and y = 3, then ln(xy) = ln(2*3) = ln(6).
Using the product rule of logarithms, ln(xy) = ln(2) + ln(3).
So, ln(6) = ln(2) + ln(3).
This is the simplified expression for ln(xy) using the properties of logarithms.
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