Use a calculator to find the value to four decimal places. \( \log x=0.272 \) Question Help: Check Answer

Calculate or simplify the expression \( \log(x)=0.272 \). Solve the equation \( \log(x)=0.272 \). Solve the equation by following steps: - step0: Solve for \(x\): \(\log_{10}{\left(x\right)}=0.272\) - step1: Find the domain: \(\log_{10}{\left(x\right)}=0.272,x>0\) - step2: Convert the logarithm into exponential form: \(x=10^{0.272}\) - step3: Evaluate the power: \(x=10^{\frac{34}{125}}\) - step4: Transform the expression: \(x=\sqrt[125]{10^{34}}\) - step5: Check if the solution is in the defined range: \(x=\sqrt[125]{10^{34}},x>0\) - step6: Find the intersection: \(x=\sqrt[125]{10^{34}}\) The value of \( x \) when \( \log x = 0.272 \) is approximately 1.870682 to four decimal places.