How do you find the length of the curve $x = e^{t} + e^{- t}$ $x=e^t+e^-t$ , $y = 5 - 2 t$ $y=5-2t$ , where $0 \leq t \leq 3$ $0<=t<=3$ ?

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How do you find the length of the curve $x = e^{t} + e^{- t}$ $x=e^t+e^-t$ , $y = 5 - 2 t$ $y=5-2t$ , where $0 \leq t \leq 3$ $0<=t<=3$ ?

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Answer 1 · 2014-08-20T02:15:01

The answer is $e^{3} - e^{- 3}$ $e^3-e^(-3)$ .

Recall that the arclength for parametric curves is:

$L = \int_{a}^{b} \sqrt{{(\frac{d x}{d t})}^{2} + {(\frac{d y}{d t})}^{2}} d t$ $L=int_a^b sqrt(((dx)/(dt))^2+((dy)/(dt))^2)dt$

So,

$\frac{d x}{d t} = e^{t} - e^{- t}$ $(dx)/(dt)=e^t-e^(-t)$
$\frac{d y}{d t} = - 2$ $(dy)/(dt)=-2$

Now substituting:

$L = \int_{0}^{3} \sqrt{{(e^{t} - e^{- t})}^{2} + {(- 2)}^{2}} d t$ $L=int_0^3 sqrt((e^t-e^(-t))^2+(-2)^2)dt$
$= \int_{0}^{3} \sqrt{e^{2 t} - 2 + e^{- 2 t} + 4} d t$ $=int_0^3 sqrt(e^(2t)-2+e^(-2t)+4)dt$ expand
$= \int_{0}^{3} \sqrt{e^{2 t} + 2 + e^{- 2 t}} d t$ $=int_0^3 sqrt(e^(2t)+2+e^(-2t))dt$ simplify
$= \int_{0}^{3} \sqrt{{(e^{t} + e^{- t})}^{2}} d t$ $=int_0^3 sqrt((e^t+e^(-t))^2)dt$ factor
$= \int_{0}^{3} (e^{t} + e^{- t}) d t$ $=int_0^3 (e^t+e^(-t))dt$ simplify
$= e^{t} - e^{- t} {∣ ∣}_{0}^{3}$ $=e^t-e^(-t)|_0^3$ integrate
$= e^{3} - e^{- 3} - (e^{0} - e^{0})$ $=e^3-e^(-3)-(e^0-e^0)$ evaluate
$= e^{3} - e^{- 3}$ $=e^3-e^(-3)$

Note that there aren't many questions that can be solved algebraically. Please note the pattern of this problem because most algebraic solutions have this form.

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How do you find the length of the curve $x = e^{t} + e^{- t}$ $x=e^t+e^-t$ , $y = 5 - 2 t$ $y=5-2t$ , where $0 \leq t \leq 3$ $0<=t<=3$ ?

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How do you find the length of the curve $x = e^{t} + e^{- t}$ $x=e^t+e^-t$ , $y = 5 - 2 t$ $y=5-2t$ , where $0 \leq t \leq 3$ $0<=t<=3$ ?