How do you express as a single logarithm & simplify $(\frac{1}{2}) {log}_{a} \cdot x + 4 {log}_{a} \cdot y - 3 {log}_{a} \cdot x$ $(1/2)log_a x + 4log_a y - 3log_a *x$ ?

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How do you express as a single logarithm & simplify $(\frac{1}{2}) {log}_{a} \cdot x + 4 {log}_{a} \cdot y - 3 {log}_{a} \cdot x$ $(1/2)log_a x + 4log_a y - 3log_a *x$ ?

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Answer 1 · 2015-07-31T23:04:04

$(\frac{1}{2}) {log}_{a} (x) + 4 {log}_{a} (y) - 3 {log}_{a} (x) = {log}_{a} (x^{- \frac{5}{2}} y^{4})$ $(1/2)log_a(x)+4log_a(y)-3log_a(x)=log_a(x^(-5/2)y^4)$

Explanation:

To simplify this expression, you need to use the following logarithm properties:

$log (a \cdot b) = log (a) + log (b)$ $log(a*b)=log(a)+log(b)$ (1)
$log (\frac{a}{b}) = log (a) - log (b)$ $log(a/b)=log(a)-log(b)$ (2)
$log (a^{b}) = b log (a)$ $log(a^b)=blog(a)$ (3)

Using the property (3), you have:

$(\frac{1}{2}) {log}_{a} (x) + 4 {log}_{a} (y) - 3 {log}_{a} (x) = {log}_{a} (x^{\frac{1}{2}}) + {log}_{a} (y^{4}) - {log}_{a} (x^{3})$ $(1/2)log_a(x)+4log_a(y)-3log_a(x)=log_a(x^(1/2))+log_a(y^4)-log_a(x^3)$

Then, using the properties (1) and (2), you have:

${log}_{a} (x^{\frac{1}{2}}) + {log}_{a} (y^{4}) - {log}_{a} (x^{3}) = {log}_{a} (\frac{x^{\frac{1}{2}} y^{4}}{x^{3}})$ $log_a(x^(1/2))+log_a(y^4)-log_a(x^3)=log_a((x^(1/2)y^4)/x^3)$

Then, you only need to put all the powers of $x$ $x$
together:

${log}_{a} (\frac{x^{\frac{1}{2}} y^{4}}{x^{3}}) = {log}_{a} (x^{- \frac{5}{2}} y^{4})$ $log_a((x^(1/2)y^4)/x^3)=log_a(x^(-5/2)y^4)$

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How do you express as a single logarithm & simplify $(\frac{1}{2}) {log}_{a} \cdot x + 4 {log}_{a} \cdot y - 3 {log}_{a} \cdot x$ $(1/2)log_a x + 4log_a y - 3log_a *x$ ?

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How do you express as a single logarithm & simplify (12)loga⋅x+4loga⋅y−3loga⋅x(1/2)log_a *x + 4log_a *y - 3log_a *x?

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Explanation:

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How do you express as a single logarithm & simplify $(\frac{1}{2}) {log}_{a} \cdot x + 4 {log}_{a} \cdot y - 3 {log}_{a} \cdot x$ $(1/2)log_a x + 4log_a y - 3log_a *x$ ?