Designing A Uniformly Loaded Arch Or Cable ? V
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V ? Designing A Uniformly Loaded Arch Or Cable To proceed with this lesson, click on the Next button here or at the top of any page. When you are done with this lesson, click on the Contents button here or at the top of any page to return to the list of lessons. This is the Max Eyth Bridge in Stuttgart, Germany, designed by Schlaich & Bergermann, Engineers. In this lesson, you will learn how to shape an arch or cable to carry a uniform load while undergoing only axial forces. V ? Designing A Uniformly Loaded Arch Or Cable W = 10,800 lb 36 ft 180 ft Funicular Polygon 40 ft The Problem: We are designing a concrete vault for the roof of a warehouse. The span is 180 feet, and we would like the rise of the vault to be 36 feet. The total uniform load on a one-foot-wide strip of the vault is estimated to be 10,800 lb. We must find the form of the vault, and the forces in a onefoot-wide strip. V ? Designing A Uniformly Loaded Arch Or Cable 10 loads @ 1080 lb each P P P P P P P P P P Loading Diagram 36 ft 180 ft Funicular Polygon 40 ft Step 1: Construct a Loading Diagram and apply interval notation. We divide the uniform load into a convenient number of increments. We decide to use ten increments in this case, although nine or twelve or eighteen would serve as well. The load P allotted to each increment is found by dividing the total load by the number of increments: P= 10,800 lb = 1080 lb 10 We diagram these loads on a Loading Diagram. V ? Designing A Uniformly Loaded Arch Or Cable The load on each increment is represented on the Loading Diagram by a concentrated force, P, of 1080 lb., that acts at the center of the increment. We extend vertical construction lines down to a base line from each force P, and from the ends of the span. The base line is located below the diagram of the vault to allow adequate space for the construction of the Funicular Polygon at a later stage. 10 loads @ 1080 lb each Loading Diagram Base Line Funicular Polygon 40 ft V ? Designing A Uniformly Loaded Arch Or Cable We add interval notation, completing the Loading Diagram. Notice that we have not yet determined the reactions for this structure. They will be determined at a later stage, in the course of constructing the Force Polygon. 10 loads @ 1080 lb each A B C D E F G H J K L Loading Diagram Base Line Funicular Polygon 40 ft V ? Designing A Uniformly Loaded Arch Or Cable Step 2: Construct a Load Line to a convenient scale. Working from left to right, the forces on the Loading Diagram are plotted tip-to-tail onto the Load Line at the selected scale. First we plot force ab. 10 loads @ 1080 lb each A B C D E F G H J K L Loading Diagram a b Base Line 1080 lb Funicular Polygon 40 ft Load Line 4000 lb V ? Designing A Uniformly Loaded Arch Or Cable The Load Line is complete when all of the forces have been plotted. Because the load increments are all vertical, the Load Line is vertical as well. 10 loads @ 1080 lb each A B C D E F G H J K L Loading Diagram Base Line 10,800 lb Funicular Polygon 40 ft Load Line 4000 lb a b c d e f g h j k l V ? Designing A Uniformly Loaded Arch Or Cable Step 3: Construct the Force Polygon and Funicular Polygon. In order to find the form and forces in the vault, we will next construct a Force Polygon from the Load Line. 10 loads @ 1080 lb each A B C D E F G H J K L Loading Diagram Base Line Funicular Polygon 40 ft Force Polygon 4000 lb a b c d e f g h j k l V ? Designing A Uniformly Loaded Arch Or Cable 10 loads @ 1080 lb each A B C D E F G H J K L Loading Diagram Base Line Funicular Polygon 40 ft Tangent to end of the parabola 2s Parabola s To locate the pole of the Force Polygon, we use a shortcut that is based on two facts: 1. The funicular line for a load that is distributed uniformly over a horizontal projection of the span is a parabola. 2. The tangents to the ends of any parabola intersect on the vertical centerline at a distance from the base line that is twice the height of the parabola. See the diagram below left. a b c d e f g h j k Force Polygon l 4000 lb V ? Designing A Uniformly Loaded Arch Or Cable 10 loads @ 1080 lb each A B C D E F G H J K Loading Diagram L On the centerline of our Funicular Polygon, we make two marks, one 36 feet above the base line, the intended rise of the vault, and one at twice this height, which is 72 feet. The axis of the vault will pass through the 36 foot mark. The tangents to the ends of the vault will pass through the 72 ft 72 foot mark. 36 ft Base Line Funicular Polygon 40 ft 2s s Force Polygon 4000 lb a b c d e f g h j k l V ? Designing A Uniformly Loaded Arch Or Cable On the Funicular Polygon we draw the tangents to the ends of the parabola, oa and ol . Parallel to them, we draw rays oa and ol on the Force Polygon. These rays intersect at the final pole, o . 10 loads @ 1080 lb each A B C D E F G H J K L Loading Diagram 72 ft ol 36 ft oa Base Line Funicular Polygon 40 ft oa Pole o ol 2s s Force Polygon 4000 lb a b c d e f g h j k l Designing A Uniformly Loaded Arch Or Cable V ? As we construct each ray, we scale its length on the Force Polygon to determine the magnitude of the force in the corresponding segment of the Funicular Polygon. 10 loads @ 1080 lb each A B C D E F G H J K L Loading Diagram ol oa 84 4 lb 4 44 84 lb Funicular Polygon 40 ft 00 80 00 60 Base Line 00 40 oa 00 20 0l b o ol 2s s Force Polygon 4000 lb 00 0 , 10 ,00 12 a b c d e f g h j k l V ? Designing A Uniformly Loaded Arch Or Cable Knowing the forces in the outermost segments of the vault also allows us to find the reaction forces at the ends of the vault. Although finding these forces is not necessary to completing the solution to our problem, they are easily determined as being equal and opposite to the forces in these segments. 10 loads @ 1080 lb each A B C D E F G H J K L Loading Diagram ol oa b l 44 84 84 4 lb 4 44 84 lb Funicular Polygon 40 ft Base Line 84 44 oa lb o ol 2s s Force Polygon 4000 lb a b c d e f g h j k l Designing A Uniformly Loaded Arch Or Cable V ? We now construct the remaining rays, beginning with ob. Parallel to ob on the Force Polygon, we draw the corresponding segment of the Funicular Polygon, also named ob. ob lies below interval B of the Loading Diagram. 10 loads @ 1080 lb each A B C D E F G H J K L Loading Diagram oa 44 84 lb ob ol 84 4 lb 4 Base Line oa b o Funicular Polygon 40 ft o ol Force Polygon 4000 lb a b c d e f g h j k l Designing A Uniformly Loaded Arch Or Cable V ? We scale the length of ray ob and record the magnitude of the force on the Funicular Polygon. 10 loads @ 1080 lb each A B C D E F G H J K L Loading Diagram oa 44 84 lb ob 8 777lb Funicular Polygon 40 ft ol 84 4 lb 4 00 80 Base Line 00 40 0 lb 00 20 00 60 a o b o o ol Force Polygon 4000 lb 0 ,00 0 1 a b c d e f g h j k l 1 Designing A Uniformly Loaded Arch Or Cable V ? We next construct and scale ray oc . 10 loads @ 1080 lb each A B C D E F G H J K L Loading Diagram oa 44 84 lb ob oc 9 756b l 8 777lb ol 84 4 lb 4 Base Line oa b oc o Funicular Polygon 40 ft o ol Force Polygon 4000 lb a b c d e f g h j k l Designing A Uniformly Loaded Arch Or Cable V ? We continue working from left to right in this manner across the Funicular Polygon. 10 loads @ 1080 lb each A B C D E F G H J K L Loading Diagram oa 44 84 lb oc od 9 688b 9 l 6 75 b l 8 777lb ob ol 84 4 lb 4 Base Line oa b oc o od Funicular Polygon 40 ft o ol Force Polygon 4000 lb a b c d e f g h j k l Designing A Uniformly Loaded Arch Or Cable V ? Notice how the forces in the arch lessen in magnitude toward the apex. 10 loads @ 1080 lb each A B C D E od oe F G H J K L Loading Diagram oc oa 44 84 lb 9 688b b o 7569 l lb 8 7 7 7 lb 6667 lb ol 84 4 lb 4 Base Line oa b oc o od oe Funicular Polygon 40 ft o ol Force Polygon 4000 lb a b c d e f g h j k l Designing A Uniformly Loaded Arch Or Cable V ? The segment at the apex passes through the 36 foot high mark established earlier, verifying the accuracy of our construction. 10 loads @ 1080 lb each A B C D E F od oe of G H J K L Loading Diagram oc oa 44 84 lb 9 688b b o 7569 l lb 8 7 7 7 lb 6667 6444 lb lb ol 84 4 lb 4 Base Line oa b oc o od oe of Funicular Polygon 40 ft o ol Force Polygon 4000 lb a b c d e f g h j k l Designing A Uniformly Loaded Arch Or Cable V ? Segment og has the same magnitude of force as segment oe. Because the arch and the loads on it are symmetrical, the distribution of internal forces is symmetrical as well. 10 loads @ 1080 lb each A B C D E F G od oe of og H J K L Loading Diagram oc oa 44 84 lb 9 688b b o 7569 l lb 8 7 7 7 lb 6667 6444 6667 lb lb lb ol 84 4 lb 4 Base Line Funicular Polygon 40 ft o Force Polygon 4000 lb a b oa b oc c o od d oe e of f og g h ol j k l Designing A Uniformly Loaded Arch Or Cable V ? We complete the remaining rays oh through ok. 10 loads @ 1080 lb each A B C D E F G od oe of og H J K L Loading Diagram oc oa 44 84 lb 9 688b b o 7569 l lb 8 7 7 7 lb oh 6667 6444 6667 68 lb 89 lb lb lb ol 84 4 lb 4 Base Line Funicular Polygon 40 ft o Force Polygon 4000 lb a b oa b oc c o od d oe e of f og oh g h ol j k l Designing A Uniformly Loaded Arch Or Cable V ? 10 loads @ 1080 lb each A B C D E F G od oe of og H J K L Loading Diagram oj 6667 6444 6667 68 9 lb 89 lb lb 688 758 lb ob 7569 lb 9 l b b l 8 777lb oc oa 44 84 lb oh ol 84 4 lb 4 Base Line Funicular Polygon 40 ft o Force Polygon 4000 lb a b oa b oc c o od d oe e of f og oh g oj h ol j k l Designing A Uniformly Loaded Arch Or Cable V ? The last segment to be constructed is ok . This segment closes the Funicular Polygon, once again verifying the accuracy of our construction. The Force Polygon and Funicular Polygon are now complete. 10 loads @ 1080 lb each A B C D E F G od oe of og H J K L Loading Diagram oj 6667 6444 6667 68 9 lb 89 lb lb 688 ok 758 lb ob 7569 lb 9 lb lb 777 ol 8 7 77 lb lb 8 84 4 lb 4 oc oa 44 84 lb oh Base Line Funicular Polygon 40 ft o Force Polygon 4000 lb a b oa b oc c o od d oe e of f og oh g oj h ok ol j k l V ? Designing A Uniformly Loaded Arch Or Cable The actual, smooth parabolic curve of the vault will pass through the two end points that we have plotted, and will be tangent to the center of each straight-line segment of the Funicular Polygon. W = 10,800 lb oa ob oc od oe of og oh oj ok ol Funicular Polygon 40 ft o Force Polygon 4000 lb a b oa b oc c o od d oe e of f og oh g oj h ok ol j k l V ? Designing A Uniformly Loaded Arch Or Cable W Loading Diagram By inverting this construction, we can apply it to a hanging cable that supports a load that is uniformly distributed over its horizontal projection, like the cables of the Max Eyth Bridge shown at the beginning of this lesson. Funicular Polygon o Force Polygon V ? Designing A Uniformly Loaded Arch Or Cable The tangents to the end of the cable intersect at a distance from the base line that is twice the sag of the cable. Notice also that in this case, the pole of the Force Polygon lies to the right of the Load Line. W Loading Diagram s Funicular Polygon 2s o Force Polygon V ? Designing A Uniformly Loaded Arch Or Cable L/2 This construction may be applied also to an arch or cable whose ends do not lie on the same level, as long as the load is uniformly distributed over the horizontal projection. Notice how in this case, of course, the pole of the Force Polygon is no longer centered vertically on the Load Line. L/2 W Loading Diagram s 2s o Funicular Polygon Click on the Contents button to begin a new lesson. Click on the image of the Max Eyth Bridge to return to the beginning of this lesson. Force Polygon
