What is the arc length of f(x)=secx*tanx f(x)=secxtanx in the interval [0,pi/4][0,π4]?

1 Answer
Truong-Son N.
Aug 4, 2016

The arc length formula is basically the distance formula adapted to a function. Whereas the distance formula would be D = sqrt((Deltax)^2 + (Deltay)^2), the arc length formula is:

\mathbf(s = int_a^b sqrt(1 + ((dy)/(dx))^2)dx)

So, we need to take the derivative and then square it.

d/(dx)[secxtanx]

= secx*sec^2x + secxtan^2x

= secx(sec^2x + tan^2x)

= secx(1 + 2tan^2x)

And squaring it...

((dy)/(dx))^2

= color(green)(sec^2x(2tan^2x + 1)^2)

And now putting it in the integral.

s = color(blue)(int_0^(pi"/"4) sqrt(1 + sec^2x(2tan^2x + 1)^2) dx)

At that point, you should evaluate the integral numerically on your calculator. A TI-89 should be able to do it, but working it out would be far too complicated.

I get ~~ color(blue)(1.6458) using Wolfram Alpha, and this integral returns the same answer.

As you can see, the setup is usually pretty easy. What's usually hard (and generally nearly impossible on medium-complexity functions) is the actual simplification work.

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