The transformation from exponential to logarithmic form is a method used to rephrase an exponential equation in terms of logarithms. This technique aids in breaking down and simplifying intricate equations. Typically, an exponential equation is written as b^y = x, and its equivalent logarithmic form is log_b(x) = y. This conversion relies heavily on the basic definition and principles of logarithms.
| Topic | Problem | Solution |
|---|---|---|
| None | Express the equation in logarithmic form: (a) $4^… | Express the equation in logarithmic form: $4^{3}=64$ is equivalent to $\log A=B$. |
| None | Rewrite in Logarithmic Form. \[ 12^{2}=144 \] | \(12^2 = 144\) |