Asked by Britt

log_3 (3)^(2x) What is the value of log_3 (9^x) If log_3⁡〖5=a〗 and log⁡5=b. Express log_4⁡3 in terms of a and b. log_3(2x - 1) = 2, Find x. Here's what I've done: log_3(2x) * log_3(1) = 2 log2x/log3 * log... 1/log_2(X) + 1/log_3(x) + 1/log_4(x) +1/log_5(x) =log_5(625) Hello, Is log_3 (5) equal to log_5 (3)? Explain your answer. Do not evaluate the logarithms.... Given that x=log_3 5 and y=log_3 2, rewrite log_3 60 in terms of x and y. the inverse of f(x) = log_3(x') ? log_5[log_4(log_3(x))] = 1 log_5 = log with the base of 5 log_4 = log with the base of 4 log_3... Solve: 2log_3(x) - log_3(x-2) = 2 My Work: log_3(x^2) - log_3(x-2) = log_3(3^2) log_3 [(x^2) /...