Condense the logarithm
log d + xl og g
log(d) + x log(g)
To condense the logarithm expression log(d) + xl og(g), we can use the logarithm rule which states that log(a) + log(b) = log(a * b). Applying this rule, we can rewrite the expression as:
log(d) + xl og(g) = log(d) + log(g^xl) = log(d * g^xl)
To condense the given logarithm "log d + xl og g", we can use the logarithmic identity:
log a + log b = log (a * b)
Applying this identity to the given logarithm, we can rewrite it as:
log d + xl og g = log (d * (g^x))
Therefore, the condensed form of the given logarithm is "log (d * (g^x))".