Ask a New Question

Asked by Hasane

Prove.

3/(log_2 (a)) - 2/(log_4 (a)) = 1/(log_(1/2)(a))
12 years ago

Answers

There are no human answers yet.
There are no AI answers yet. The ability to request AI answers is coming soon!

Submit Your Answer


We prioritize human answers over AI answers.

If you are human, and you can answer this question, please submit your answer.

Related Questions

Simplify exactly log_2 1/16 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. Graph of f(x)=log_2(x) has been transformed to g(x)=alog_2(x)+k. The transformed image passes throug... log_(1/4)⁡〖1/64〗+log_2⁡〖1/32〗-log_9⁡〖(75+x)〗-log_27⁡9=(-14)/3 solve the logarithm log_2 (x -1)- log_2(5x +1) = -3 I got -3, is this correct??????? If A + B + C = 180° prove that Sin2A + sin2B – sin2C = 4cosAcosBsinC Prove that the sum of the vectors from the vertices to the centre of a regular octogon is a zero... Prove that sin(A+B+C+)cos(B+C)-cos(A+B+C)sin(B+C)=sinA How to prove this (e^(2^-1 i3pi) - e^-(2^-1 i3pi))/(2i) = -1 if you could show me this that wo...
Submit Your Answer

Question

Prove.

3/(log_2 (a)) - 2/(log_4 (a)) = 1/(log_(1/2)(a))

Ask a New Question
Archives Contact Us Privacy Policy Terms of Use