Question

Let x = log_2 1/8 Write the exponential form of the equation and solve the equation for x. Let x = log_2 1/8 Write the exponential form of the equation and solve the equation for x.... 1/log_2(X) + 1/log_3(x) + 1/log_4(x) +1/log_5(x) =log_5(625) how to prove that (a^2-b^2)^3+(b^2-c^2)^3+(c^2-a^2)^3=3 (a^2-b^2)(b^2-c^2)(c^2-a^2) please help solve the logarithm log_2 (x -1)- log_2(5x +1) = -3 I got -3, is this correct??????? log_(1/4)⁡〖1/64〗+log_2⁡〖1/32〗-log_9⁡〖(75+x)〗-log_27⁡9=(-14)/3 Simplify exactly log_2 1/16 Graph of f(x)=log_2(x) has been transformed to g(x)=alog_2(x)+k. The transformed image passes throug... Solve for x and y if log_2(x+y)=log_3(3x+4y)=3 log_2 16