Step 1 :Given the equation \(8^{x-9} = 1470\)
Step 2 :Take the logarithm of both sides to get \((x-9)\log(8) = \log(1470)\)
Step 3 :Solve for x to get the exact expression \(x = \frac{\log(1470)}{\log(8)} + 9\)
Step 4 :Substitute the values of \(\log(8) = 0.9030899869919435\) and \(\log(1470) = 3.167317334748176\) into the equation
Step 5 :Solve for x to get the decimal approximation \(x = 12.507200146574576\)
Step 6 :Round the decimal approximation to two decimal places to get \(x = 12.51\)
Step 7 :Final Answer: The exact expression for the solution is \(x = \frac{\log(1470)}{\log(8)} + 9\). The decimal approximation, rounded to two decimal places, is \(\boxed{12.51}\)