How do you solve $5 {(1.034)}^{x} - 1998 = 13$ $5(1.034)^x-1998=13$ ?

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How do you solve $5 {(1.034)}^{x} - 1998 = 13$ $5(1.034)^x-1998=13$ ?

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Answer 1 · 2015-07-23T21:26:22

$x = \frac{ln (402.2)}{ln (1.034)} \approx 179.363$ $x=(ln(402.2))/(ln(1.034))\approx 179.363$

Explanation:

First, rearrange to write it as $5 {(1.034)}^{x} = 13 + 1998 = 2011$ $5(1.034)^{x}=13+1998=2011$ .

Next, divide both sides by $5$ $5$ to get ${1.034}^{x} = \frac{2011}{5} = 402.2$ $1.034^{x}=2011/5=402.2$ .

After that, take a logarithm of both sides (it doesn't matter what base you use). I'll use base $e$ $e$ : $ln ({1.034}^{x}) = ln (402.2)$ $ln(1.034^{x})=ln(402.2)$ or, by a property of logarithms, $x \cdot ln (1.034) = ln (402.2)$ $x*ln(1.034)=ln(402.2)$ .

Hence, $x = \frac{ln (402.2)}{ln (1.034)} \approx 179.363$ $x=(ln(402.2))/(ln(1.034))\approx 179.363$ .

You should check that this works by substitution back into the original equation.

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How do you solve $5 {(1.034)}^{x} - 1998 = 13$ $5(1.034)^x-1998=13$ ?

1 Answer

Explanation:

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Science

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How do you solve 5(1.034)x−1998=135(1.034)^x-1998=13?

1 Answer

Explanation:

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Impact of this question

How do you solve $5 {(1.034)}^{x} - 1998 = 13$ $5(1.034)^x-1998=13$ ?