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log_5[log_4(log_3(x))] = 1 log_5 =

  1. log_5[log_4(log_3(x))] = 1log_5 = log with the base of 5 log_4 = log with the base of 4 log_3 = log with the base of 3 Answer:
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    2. Anonymous asked by Anonymous
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  2. 1/log_2(X) + 1/log_3(x) + 1/log_4(x) +1/log_5(x) =log_5(625)
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    2. PD asked by PD
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  3. solve logarithmic equation in exact form only. show work.log_5(x-3)+ log_5(x-6)-log_5(x+1)=2
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    2. Sara asked by Sara
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  4. If log_5(9) = 1.365 and log_5(2)=0.431, then what is log_5(24)?How to find the solution for this one?
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    2. Clint asked by Clint
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  5. find derivative off(x)= log_5((x-4)^3) + e^((x-1)(x+1)) Log_5 means log base 5
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    2. Steve asked by Steve
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  6. Solve the following logarithmic equation for x.log_4(2x-8)=log_5(4x-10)
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  7. Is log_3 (5) equal to log_5 (3)? Explain your answer. Do not evaluate the logarithms.
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    2. Hasane asked by Hasane
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  8. Hello,Is log_3 (5) equal to log_5 (3)? Explain your answer. Do not evaluate the logarithms. is my question. What is a surefire
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    2. Adam asked by Adam
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  9. Given the function f(x) = log_5(x) which of the following functions is the transformation of f(x) right 6 units, up 3 units,
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  10. Rewrite the expression log_3(z) + log_3(2) + log_3(4) as a single logarithm. (1 point)1)log_3 (8z) 2)log_3 (24z) 3) log_3 (z+6)
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