solve : "log"(4) 2^(8x) = 2^("log"(2)^(8...

solve : `"log"_(4) 2^(8x) = 2^("log"_(2)^(8))`

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Compute "log"(9)^(27) - " log"(27)^(9)
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solve : "log"(8)x + "log"(4)x + "log"(2)x = 11.
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solve : "log"(4) 2^(8x) = 2^("log"(2)^(8))
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If a^(2) + b^(2) = 7ab, show that log((a + b)/(3)) = (1)/(2) (log a + ...
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Prove that "log" 2 + 16 "log" (16)/(15) + 12 "log " (25)/(24) + 7 "log...
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Prove that "log"(a^(2))a " log"(b^(2)) b" log(c^(2))c = (1)/(8).
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If ("log"x)/(y - z) = ("log" y)/(z - x) = ("log" z)/(x - y) , then pro...
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Solve: "log"(2) x - 3 " log((1)/(2)) x = 6
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Solve log(5-x)(x^(2)-6x+65)=2
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