Can someone help me solve for x? (Exponential Equation)

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Can someone help me solve for x? (Exponential Equation)

$50/(1 +e^-x) = 4$

2 Answers

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Answer 1 · 2017-04-13T12:20:23

$x=-ln 46$

Explanation:

Given:

$50/(1+e^(-x)) = 4$

Multiply both sides by $1+e^(-x)$ to get:

$50 = 4+4e^(-x)$

Subtract $4$ from both sides to get:

$46 = e^(-x)$

Take natural logs of both sides to get:

$ln 46 = -x$

Multiply both sides by $-1$ to get:

$-ln 46 = x$

That is:

$x = -ln 46$

(which is the same as $ln (1/46)$ )

Answer 2 · 2017-04-13T12:40:20

$x=-2.44" to 2 dec. places"$

Explanation:

$color(blue)"cross-multiply"$ the equation.

$rArr4(1+e^-x)=50$

$"divide both sides by 4"$

$(cancel(4)(1+e^-x))/cancel(4)=50/4$

$rArr1+e^-x=12.5$

$"subtract 1 from both sides"$

$cancel(1)cancel(-1)+e^-x=12.5-1$

$rArre^-x=11.5$

$"using "color(blue)"law of logarithms"$

$color(red)(bar(ul(|color(white)(2/2)color(black)(logx^nhArrnlogx)color(white)(2/2)|)))$

$"take ln (natural log ) of both sides"$

$lne^-x=ln11.5$

$rArr-xcancel(lne)^1=ln11.5$

$rArrx=-ln11.5$

$rArrx~~-2.44" to 2 dec. places"$

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Can someone help me solve for x? (Exponential Equation)

$50/(1 +e^-x) = 4$

2 Answers

Explanation:

Explanation:

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$50/(1 +e^-x) = 4$