How do you solve $5^{x + 2} = 4^{1 - x}$ $5^(x+2) = 4^(1-x)$ ?

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How do you solve $5^{x + 2} = 4^{1 - x}$ $5^(x+2) = 4^(1-x)$ ?

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Answer 1 · 2015-05-22T21:54:57

One easy way is using logarithms because there is one law of logarithms which states that ${log a}^{n} = n \cdot log a$ $loga^n=n*loga$

So, let's put logarithms on both sides (to keep the equality):

${log 5}^{x + 2} = {log 4}^{1 - x}$ $log5^(x+2)=log4^(1-x)$
$(x + 2) log 5 = (1 - x) log 4$ $(x+2)log5=(1-x)log4$

Approximating $log 5 ≅ 0.7$ $log5~=0.7$ and $log 4 ≅ 0.6$ $log4~=0.6$ , we get

$(x + 2) 0.7 = (1 - x) 0.6$ $(x+2)0.7=(1-x)0.6$
$0.7 x + 1.4 = 0.6 - 0.6 x$ $0.7x+1.4=0.6-0.6x$
$1.3 x = - 0.8$ $1.3x=-0.8$
$x = - \frac{0.8}{1.3} ≅ - 0.61$ $x=-0.8/1.3~=-0.61$

Answer 2 · 2015-05-22T23:07:17

Another way to do that would be
$5^{x + 2} = 4^{1 - x}$ $5^(x+2)=4^(1-x)$
$5^{x} \cdot 5^{2} = 4^{1} \cdot 4^{- 1}$ $5^x cdot 5^2=4^1 cdot 4^(-1)$
$25 \cdot 5^{x} = 4 \cdot \frac{1}{4^{x}}$ $25 cdot 5^x = 4 cdot 1/4^x$
$5^{x} \cdot 4^{x} = \frac{4}{25}$ $5^x cdot 4^x=4/25$
$20^{x} = 0.16$ $20^x=0.16$
using the natural log
${log 20}^{x} = log 0.16$ $log 20^x=log0.16$
$x log 20 = log 0.16$ $x log 20=log 0.16$
$x = \frac{log 0.16}{log 20} \approx - 0.612$ $x=(log 0.16)/(log 20) approx -0.612$
or using the log base 20
${log}_{20} 20^{x} = {log}_{20} 0.16$ $log_(20) 20^x=log_(20) 0.16$
$x = {log}_{20} 0.16 \approx - 0.612$ $x=log_(20) 0.16 approx -0.612$

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How do you solve $5^{x + 2} = 4^{1 - x}$ $5^(x+2) = 4^(1-x)$ ?

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