Find the number of solutions of this equation?

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Find the number of solutions of this equation?

$|x|e^|x|=1$

1 Answer

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Answer 1 · 2018-04-11T09:25:25

$2$ real solutions

Explanation:

Given:

$abs(x)e^abs(x) = 1$

Note that if $x != 0$ is a solution, then so is $-x$ .

Considering positive values of $x$ , note that both $x$ and $e^x$ are strictly monotonically increasing functions, so $xe^x$ is also strictly monotonically increasing.

Also note that:

$(color(blue)(1/2))e^(color(blue)(1/2)) < 1/2sqrt(4) = 1$

$(color(blue)(1))e^(color(blue)(1)) = e > 1$

So by the intermediate value theorem, there is some $x$ in $(1/2, 1)$ such that $xe^x = 1$

Then $-x$ is also a solution of the given equation.

graph{(y-abs(x)e^abs(x))(y-1) = 0 [-2.802, 2.198, -0.57, 1.93]}

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Find the number of solutions of this equation?

$|x|e^|x|=1$

1 Answer

Explanation:

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Find the number of solutions of this equation?

|x|e^|x|=1|x|e^|x|=1

1 Answer

Explanation:

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$|x|e^|x|=1$