Use the One-to-One Property to solve the equation for x. (Enter your answers as a comma-separated list.) -8=e7x X = Submit Answer Use the One-to-One Property to solve the equation for x. (Enter your answers as a comma-separated list.) log5 (x + 1) = log5 (3) X = Use the properties of logarithms to expand the expression as a sum, difference, and/or constant multiple of logarithms. (Assume all variables are positive.) log6

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### Solving Equations Using Properties of Exponents and Logarithms #### Task 1: Solve for \( x \) using the One-to-One Property **Problem:** \[ e^{x^2 - 8} = e^{7x} \] **Implementation:** Enter your answer in the provided text box and submit. **Input Field:** \[ x = \] \[ \text{Submit Answer} \] **Explanation:** By using the One-to-One Property of exponential functions, since \( a^b = a^c \) implies \( b = c \) when \( a > 0 \), solve for \( x \) given the exponential variables equate to each other. #### Task 2: Solve for \( x \) using the One-to-One Property **Problem:** \[ \log_5(x + 1) = \log_5(3) \] **Implementation:** Enter your answer in the provided text box as a comma-separated list if there are multiple values. **Input Field:** \[ x = \] **Explanation:** By using the One-to-One Property of logarithmic functions, since \( \log_b(x) = \log_b(y) \) implies \( x = y \), solve for \( x \). #### Task 3: Expand the Logarithmic Expression **Problem:** \[ \log_6 \left( \frac{x y^2}{z^4} \right) \] **Implementation:** Rewrite the logarithmic expression using logarithmic properties and enter the expanded form in the provided text box. **Input Field:** Format appropriately to display sums, differences, and/or constant multiples. **Explanation:** Use the properties of logarithms to expand the expression as a sum, difference, and/or constant multiple of logarithms. The properties utilized include: - \(\log_b (xy) = \log_b (x) + \log_b (y)\) - \(\log_b \left( \frac{x}{y} \right) = \log_b (x) - \log_b (y)\) - \(\log_b (x^c) = c \log_b (x)\) **Note:** Assume all variables are positive to apply these properties correctly.