Question

Electrical wires suspended between two towers form a catenary (see figure) modeled by the equation shown below, where x and y are measured in meters. (see attachment)

Answer 1

This is the full question.

Answer 2

the length has to be greater than 40 but less than 60
i will try finding an exact value

Answer 3

its somewhere around 45
i dont know how to solve cosh so im using approximation

Answer 4

I think cosh is just an expression, because I used microsoft math and it said that the derivative was sinh

Answer 5

I found it to be 44.956, but the online system says that is wrong. But I think I am close

Answer 6

I found this for cosh: http://www.ucl.ac.uk/Mathematics/geomath/level2/hyper/diff11.gif

Answer 7

ive heard of it but i cant operate using it
i can work with sin and cos

Answer 8

\[\int\limits_{-20}^{20}\sqrt(1 + (\sinh(x/20))^2) dx\]

Answer 9

hello!

Answer 10

as long as you are using the dervivative of the cosh that should work, plug it into wolframalpha.com to get an exact anwer to that :)

int(sqrt(......))dx from a to b

Answer 11

is this the right equation?

Answer 12

if the question is find the length of the wire; than yes; but try it finding only the right side, and then double it

Answer 13

okay. I tried putting it in wolfram alpha, and it gives me 47.008, and it works. Thanks

Answer 14

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