Which of the following is a correct proof of log, (x) = - log4 (x) . Let logb (x) = m and log4 (x) = n for some positive base b # 1 and real numbers n and m. To verify logb (x) = - log1 (x) , we show logb (x) = m and log4 (x) = n 5m = x and ( )" = x It follows that bm = (; ) -" = (()")" = b". Therefore, m = n. Let logb (x) = m and - log4 (x) = n for some positive base b # 1 and real numbers n and m. Since log, (x) = m and - log1 (x) = n bm = x and (7) "= x It follows that bm = (; ) " = ((5) "' )" = b". Therefore, m = n. Let log (x) = m and - log4 (x) = n for some positive base b # 1 and real numbers n and m. Since log, (x) = m and - log_ (x) = n bm = x and () = x It follows that bi = () -" = (() "')" = b". Therefore, m = n. Let log, (x) = m and - log4 (x) = n for some positive base b # 1 and real numbers n and m. Since log, (x) = m and - log_ (x) = n bm = x and (}) " = x It follows that bi = (b)-" = (( ) - )"= b". Therefore, m = n. X Submit You have used 2 of 3 attempts Save Reset