Questions LLC
Login
or
Sign Up
Ask a New Question
Questions
Math
Apply algebraic reasoning to show that a=b^(loga/logb) for any a,b>0
1 answer
duplicate. Please don't post duplicates.
You can
ask a new question
or
answer this question
.
Related Questions
Which of the following defines valid reasoning?
reasoning that reflects strong emotion reasoning that someone has used before
of a^2+b^2=2ab, prove log[(a+b)/2]=1/2(loga+logb)
Write the expression as a single logarithm.
2 logbq + 8 logbt (1 point) Responses logb (q2 + t8) logb(q2t8) logb(qt2 + 8) (2 + 8)
Solving the equation C = Ba ^ (t/D) - K for t using logarithms with base a gives you:
A. D loga (C/B +K) B. loga (D(C+K)/B) C.
For questions 1 and 2, write the expression as a single logarithm.2 logbq + 8 logbt(1 point)Responseslogb (q2 + t8)log b ( q 2 +
Write the expression as a single logarithm.
4logby + 3logbx (1 point) Responses logb(y4x3) log b ( y 4 x 3 ) logb(y4 + x3) log b
A. Which of the following defines valid reasoning?
1. reasoning that reflects strong emotion 2. reasoning that persuades the
Which of the following defines valid reasoning?
A. Reasoning that persuades the audience B. Reasoning that someone has used
Which of the following defines valid reasoning?(1 point)
Responses reasoning that is well-founded reasoning that is well-founded
If X=loga(n), y=logc(n) where nis not equal to one . Prove that x-y/x+y=logb(c)-logb(a)/logb(c)+logb(a)
