Write the following into sum or difference. Log (axb)
just as x^a * x^b = x^(a+b)
log(a*b) = log(a) + log(b)
The expression Log(axb) can be written as the sum of two logarithms. Using the logarithmic property, we can rewrite it as:
Log(axb) = Log(a) + Log(b)
To determine whether the expression Log (axb) can be written as a sum or difference, we need to recall the properties of logarithms.
One of the key properties of logarithms is the product rule, which states that Log (a * b) is equal to Log a + Log b. Using this property, we can rewrite Log (axb) as Log a + Log b.
Therefore, Log (axb) can be written as the sum of two logarithms: Log a + Log b.