express log2+log3 as a single logarithm
recall that loga + logb = log a*b
Express as single tongarithm log 2+log3
To express log2 + log3 as a single logarithm, you can use the logarithmic property which states that log(a) + log(b) equals log(a * b).
Therefore, we can rewrite log2 + log3 as log(2 * 3). Simplifying further, we have log(6).
Hence, log2 + log3 can be expressed as a single logarithm, log6.
To express log2 + log3 as a single logarithm, you can use the product rule of logarithms. According to the product rule, the sum of logarithms is equal to the logarithm of the product of the numbers being logged.
The product rule of logarithms states:
log(a) + log(b) = log(a * b)
Using this rule, we can rewrite log2 + log3 as a single logarithm:
log2 + log3 = log(2 * 3)
Simplifying further:
log2 + log3 = log6
Therefore, log2 + log3 is equal to log6.