Solve for x if $5^{x^2} = 625$. Solve for x if $5^{x^2} = 625$. A. ±4 C. ±2 B. ±3 D. ±1 Log in or register to post comments Solution Click here to… Jhun Vert Fri, 06/07/2024 - 19:16 Solution Click here to expand or collapse this section $5^{x^2} = 625$ $5^{x^2} = 5^4$ Hence, $x^2 = 4$ $x = \pm 2$ Another Solution $5^{x^2} = 625$ $\ln 5^{x^2} = \ln 625$ $x^2 \ln 5 = \ln 625$ $x^2 = \dfrac{\ln 625}{\ln 5}$ $x^2 = 4$ $x = \pm 2$ Another Solution Input the equation to your calculator Hit CALC. Assign to x the number in the choices. The number that results to 625 is the answer. Log in or register to post comments
Solution Click here to… Jhun Vert Fri, 06/07/2024 - 19:16 Solution Click here to expand or collapse this section $5^{x^2} = 625$ $5^{x^2} = 5^4$ Hence, $x^2 = 4$ $x = \pm 2$ Another Solution $5^{x^2} = 625$ $\ln 5^{x^2} = \ln 625$ $x^2 \ln 5 = \ln 625$ $x^2 = \dfrac{\ln 625}{\ln 5}$ $x^2 = 4$ $x = \pm 2$ Another Solution Input the equation to your calculator Hit CALC. Assign to x the number in the choices. The number that results to 625 is the answer. Log in or register to post comments
Solution Click here to…