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Learn structural analysis principles using trigonometry and vectors for equilibrium calculations, reactions, and stability assessment in complex structures. Apply Pythagorean Theorem, sine, and cosine methods.
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Structural Analysis I • Structural Analysis • Trigonometry Concepts • Vectors • Equilibrium • Reactions • Static Determinancy and Stability • Free Body Diagrams • Calculating Bridge Member Forces
Learning Objectives • Define structural analysis • Calculate using the Pythagoreon Theorem, sin, and cos • Calculate the components of a force vector • Add two force vectors together • Understand the concept of equilibrium • Calculate reactions • Determine if a truss is stable
Structural Analysis • Structural analysis is a mathematical examination of a complex structure • Analysis breaks a complex system down to individual component parts • Uses geometry, trigonometry, algebra, and basic physics
c a b Pythagorean Theorem • In a right triangle, the length of the sides are related by the equation: a2 + b2 = c2
θ2 c a θ1 Opposite a Hypotenuse c b Sine (sin) of an Angle • In a right triangle, the angles are related to the lengths of the sides by the equations: sinθ1 = = Opposite b Hypotenuse c sinθ2 = =
θ2 c a θ1 Adjacent b Hypotenuse c b Cosine (cos) of an Angle • In a right triangle, the angles are related to the lengths of the sides by the equations: cosθ1 = = Adjacent a Hypotenuse c cosθ2 = =
θ2 c a θ1 b This Truss Bridge is Built from Right Triangles
Trigonometry Tips for Structural Analysis • A truss bridge is constructed from members arranged in right triangles • Sin and cos relate both lengths AND magnitude of internal forces • Sin and cos are ratios
Vectors • Mathematical quantity that has both magnitude and direction • Represented by an arrow at an angle θ • Establish Cartesian Coordinate axis system with horizontal x-axis and vertical y-axis.
y F = 5N Θ = 40o x Vector Example • Suppose you hit a billiard ball with a force of 5 newtons at a 40o angle • This is represented by a force vector
Vector Components • Every vector can be broken into two parts, one vector with magnitude in the x-direction and one with magnitude in the y-direction. • Determine these two components for structural analysis.
y F = 5N x y F = 5N Fy θ x Fx Vector Component Example • The billiard ball hit of 5N/40o can be represented by two vector components, Fx and Fy
Opposite Hypotenuse Fy 5N F = 5N Fy Θ=40o Fx Fy Component Example To calculate Fy, sinθ = sin40o = 5N * 0.64 = Fy 3.20N = Fy
Adjacent Hypotenuse Fx 5N F = 5N Fy Θ=40o Fx Fx Component Example To calculate Fx, cosθ = cos40o = 5N * 0.77 = Fx 3.85N = Fx
y y x F = 5N Fx = 3.85N Θ=40o Fy=3.20N x What does this Mean? Your 5N/40o hit is represented by this vector The exact same force and direction could be achieved if two simultaneous forces are applied directly along the x and y axis
y F = 5N Θ=40o x Vector Component Summary
How do I use these? She pulls with 100 pound force • Calculate net forces on an object • Example: Two people each pull a rope connected to a boat. What is the net force on the boat? He pulls with 150 pound force
Boat Pull Solution y • Represent the boat as a point at the (0,0) location • Represent the pulling forces with vectors Fm = 150 lb Ff = 100 lb Θm = 50o Θf = 70o x
y Ff = 100 lb Θf = 70o -x x Boat Pull Solution (cont) Separate force Ff into x and y components First analyse the force Ff • x-component = -100 lb * cos70° • x-component = -34.2 lb • y-component = 100 lb * sin70° • y-component = 93.9 lb
y Fm = 150 lb Θm = 50o x Boat Pull Solution (cont) Separate force Fm into x and y components Next analyse the force Fm • x-component = 150 lb * cos50° • x-component = 96.4 lb • y-component = 150 lb * sin50° • y-component = 114.9 lb
y 100 lb 70o x y 150 lb 50o x Boat Pull Solution (cont)
Boat Pull Solution (end) y • White represents forces applied directly to the boat • Gray represents the sum of the x and y components of Ff and Fm • Yellow represents the resultant vector FTotalY Fm Ff -x x FTotalX
Equilibrium • Total forces acting on an object is ‘0’ • Important concept for bridges – they shouldn’t move! • Σ Fx = 0 means ‘The sum of the forces in the x direction is 0’ • Σ Fy = 0 means ‘The sum of the forces in the y direction is 0’ :
Reactions • Forces developed at structure supports to maintain equilibrium. • Ex: If a 3kg jug of water rests on the ground, there is a 3kg reaction (Ra) keeping the bottle from going to the center of the earth. 3kg Ra = 3kg
Reactions • A bridge across a river has a 200 lb man in the center. What are the reactions at each end, assuming the bridge has no weight?
Determinancy and Stability • Statically determinant trusses can be analyzed by the Method of Joints • Statically indeterminant bridges require more complex analysis techniques • Unstable truss does not have enough members to form a rigid structure
Determinancy and Stability • Statically determinate truss: 2j = m + 3 • Statically indeterminate truss: 2j < m + 3 • Unstable truss: 2j > m + 3
Acknowledgements • This presentation is based on Learning Activity #3, Analyze and Evaluate a Truss from the book by Colonel Stephen J. Ressler, P.E., Ph.D., Designing and Building File-Folder Bridges
