Question: 18^2 = 324 - \(\log_{18} 2 = 324\) - \(\log_{2} 324 = 18\) - \(\log_{324} 18 = 2\) -…

18^2 = 324

• \(\log_{18} 2 = 324\)
• \(\log_{2} 324 = 18\)
• \(\log_{324} 18 = 2\)
• \(\log_{18} 324 = 2\)

Solution

The problem involves checking which logarithmic equation is correct based on the equation \(18^2 = 324\). To solve the logarithmic equations, remember that if \(b^x = y\), then \(\log_b y = x\). Given \(18^2 = 324\), we can write: \[ \log_{18} 324 = 2 \] So, the correct option is: \[ \log_{18} 324 = 2 \]