How to write a logarithmic equation in exponential form?
Understand the Problem
The question is asking how to convert a logarithmic equation into its equivalent exponential form. This involves understanding the relationship between logarithms and exponents, specifically that if log_b(a) = c, then it can be expressed in exponential form as b^c = a.
Answer
log_a(N) = x is written as a^x = N.
The final answer is log_a(N) = x is written as a^x = N in exponential form.
Answer for screen readers
The final answer is log_a(N) = x is written as a^x = N in exponential form.
More Information
In exponential form, the base (a) raised to the power of the result (x) gives the number (N). This conversion is useful in solving various algebraic problems, including exponential growth and decay.
Tips
A common mistake is to misidentify the base, the number, or the result. Carefully match each part of the logarithmic equation to its corresponding part in the exponential form.
Sources
- The web page with info on - Example Source - cuemath.com
- Logarithmic to Exponential Form - Varsity Tutors - varsitytutors.com
- Converting Between Logarithmic And Exponential Form - courses.lumenlearning.com
