Rewrite the following expressions as a single logarithm. a. 6 log() 4 log(y) + log(2) log_10((x^6z)/y^4) Preview 1 b. 6 log(x) log(y) 4 log(z) 4 -- - log_10((x^6)/(^4sqrt(y)x^ * Preview c. log(x) 2[log(y) + 3 log(z)] - log_10(x)-2log_10(y)-6log * Preview Hint: type log_3(9) to enter log, 9, and in general type log_x(y) for log, (y). Use the preview button to ensure you correctly enter your answer. Suppose log256 (157) = y and log, (a) = 4y. Determine the value of a. Enter a numerical value, not an %3D expression. (Hint: begin be rewriting each as an exponential function.) a = Preview Determine the value(s) of x such that log, (x 5) + log(x) = 1. Separate multiple answers with a comma. (Hint: Consider the domain of a logarithmic function.) X = Preview Rewrite the following expressions as a single logarithm. a. 6 log() 4 log(y) + log(2) log_10((x^6z)/y^4) Preview 1 b. 6 log(x) log(y) 4 log(z) 4 -- - log_10((x^6)/(^4sqrt(y)x^ * Preview c. log(x) 2[log(y) + 3 log(z)] - log_10(x)-2log_10(y)-6log * Preview Hint: type log_3(9) to enter log, 9, and in general type log_x(y) for log, (y). Use the preview button to ensure you correctly enter your answer. Suppose log256 (157) = y and log, (a) = 4y. Determine the value of a. Enter a numerical value, not an %3D expression. (Hint: begin be rewriting each as an exponential function.) a = Preview Determine the value(s) of x such that log, (x 5) + log(x) = 1. Separate multiple answers with a comma. (Hint: Consider the domain of a logarithmic function.) X = Preview