With the center of the circle 16 feet (40-24) below ground, I made a rough estimate of the answer.
I obtained a volume of 260400 cubic feet.  This may be off by a percent or two because of the crude method I used.

It looks like the Wiki's designation of the quonset as a smeicircle is incorrect--it's not limited to being a half-circle only. Otherwise, the dimensions of the original quonsets that they published would be incorrect. So, it must be a segment of a circle, and we need to find the radius of that circle.

Let's center our circle at the origin and draw two vertical lines at x=40  and x=-40 (so the distance between them is 80). We know that our circle intersects both lines, and that the "top" of the circle (where it intersects the y axis) is 24' higher than that point of intersection. Connect the points of intersection, and you have your secant line.

Now:
r = (c² + 4h²) / (8h)

Source: The Math Forum

c = 80
h = 24

r = (80² + 4*24²) / (8 * 24) = 45 1/3

Now, you need to find the area (K) of the segment, but first, you need to find the central angle (theta). The formulas from MathForum:

theta = 2 arcsin( c / [2r] )
K = r²[ theta - sin(theta) ] / 2

You can then "extrude" your segment area by multiplying by the length of your quonset.

A quonset hut would be half of a right solid cylinder. Length is given as 205  feet. Width is given as 80 feet, and height 24 feet. But if the width is 80 feet, the height would have to be 25.46479 feet. That is obtained by dividing 80 by pi.
The volume would be pi*r²*h/2 = (3.141592 x 648.4556 x 205)/2
= 208,811.285 cubic feet