To simplify the expression 5 log2 k + 8 log2 m + 10 log2 n, we can make use of the properties of logarithms. The first step is to factor out the common logarithmic base, which is base 2 in this case.
We can rewrite each term using the power rule of logarithms, which states that:
n logb a = logb an
Applying this rule:
- 5 log2 k = log2 k5
- 8 log2 m = log2 m8
- 10 log2 n = log2 n10
Now we can rewrite the entire expression as:
log2 k5 + log2 m8 + log2 n10
Next, we can combine these logarithmic terms using the property that says:
logb a + logb c = logb (a * c)
This gives us:
log2 (k5 * m8 * n10)
So, the simplified form of the expression 5 log2 k + 8 log2 m + 10 log2 n is:
log2 (k5 * m8 * n10)