If a^(x) = b , b^(y) = c, c^(z) = a, ...

If ` a^(x) = b , b^(y) = c, c^(z) = a, x = log_(b) a^(k_(1)) , y = log_(c)b^(k_(2)), z = log _(a) c^(k_(3)), ` , then find ` K_(1) K_(2) K_(3)` .

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To solve the problem, we need to find the value of \( K_1 K_2 K_3 \) given the relationships between \( a, b, c \) and the logarithmic expressions for \( x, y, z \). ### Step 1: Understand the relationships We have the following relationships: 1. \( a^x = b \) 2. \( b^y = c \) 3. \( c^z = a \) ...

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