Let - be positive integers and log-3x-5y-z-log-x-8z-log-y-3z-x wherever defined- If log-a-2- log2- 2b -4- log4-216c-5 a-b-c 0 - then value of a8 b4 c2is

Logα(3x 5y z)=logβ(x+8z)=logγ(y 3z x)=k ⇒logαk =3x 5y z⋯(1) ⇒logβk =x+8z⋯(2) ⇒logγk = x+y 3z⋯(3) Now, nbsp;log_αa=2, log_2β 2b =4, log_4γ^216c=5 ⇒ a =α^2, 2 ...

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Standard XI

Mathematics

Fundamental Laws of Logarithms

Let α,β,γ be ...

Question

Let $α, β, γ$ be positive integers and $\frac{log α}{(3 x - 5 y - z)} = \frac{log β}{(x + 8 z)} = \frac{log γ}{(y - 3 z - x)}$ (wherever defined). If ${log}_{α} a = 2,$ ${log}_{2 β} 2 b = 4,$ ${log}_{4 γ^{2}} 16 c = 5 (a, b, c > 0),$ then value of $(\frac{a}{8}) (\frac{b}{4}) (\frac{c}{2})$ is

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Solution

$\frac{log α}{(3 x - 5 y - z)} = \frac{log β}{(x + 8 z)} = \frac{log γ}{(y - 3 z - x)} = k \Rightarrow \frac{log α}{k} = 3 x - 5 y - z \dots (1) \Rightarrow \frac{log β}{k} = x + 8 z \dots (2) \Rightarrow \frac{log γ}{k} = - x + y - 3 z \dots (3)$

Now, ${log}_{α} a = 2, {log}_{2 β} 2 b = 4, {log}_{4 γ^{2}} 16 c = 5$
$\Rightarrow a = α^{2}, 2 b = (2 β)^{4}, 16 c = (4 y^{2})^{5} \Rightarrow a = α^{2}, b = 2^{3} β^{4}, c = 2^{6} y^{10}$
Therefore, $(\frac{a}{8}) (\frac{b}{4}) (\frac{c}{2}) = \frac{a b c}{2^{6}} = 2^{3} \times (α β^{2} γ^{5})^{2}$
From equation $(1), (2)$ and $(3)$ , we get
$\frac{log α}{k} + 2 \frac{log β}{k} + 5 \frac{log γ}{k} = 3 x - 5 y - z + 2 (x + 8 z) + 5 (- x + y - 3 z) \Rightarrow \frac{log (α β^{2} γ^{5})}{k} = 0 \Rightarrow α β^{2} γ^{5} = 1$

Hence, $(\frac{a}{8}) (\frac{b}{4}) (\frac{c}{2}) = 8$

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Let α,β,γ be positive integers and logα(3x−5y−z)=logβ(x+8z)=logγ(y−3z−x) (wherever defined). If logαa=2, log2β2b=4, log4γ216c=5(a,b,c>0), then value of (a8)(b4)(c2)is