log(b^7) + log(c^z) can be condensed using the product rule of logarithms. The product rule states that the log of a product is equal to the sum of the logs of its factors.

So, log(b^7) + log(c^z) = log(b^7 * c^z)

Question

log(b^7) + log(c^z) can be condensed using the product rule of logarithms. The product rule states that the log of a product is equal to the sum of the logs of its factors.

So, log(b^7) + log(c^z) = log(b^7 * c^z)

Knowee AI · Accepted Answer

log(b^7) + log(c^z) can be condensed using the product rule of logarithms. The product rule states that the log of a product is equal to the sum of the logs of its factors.

So, log(b^7) + log(c^z) = log(b^7 * c^z)

Condense the logarithm7, log, b, plus, z, log, c7logb+zlogc

Question

Solution

Similar Questions

Upgrade your grade with Knowee