find the equation for moment and equation for rotation.
find the equation for moment and equation for rotation. sk.ft 8k ft x 2011
8K 6k/ft For the beam shown: A) Find the reactions B) Construct the Shear & Moment Diagrams 5 10' C) LABEL Diagrams
Draw the shear and moment diagrams for the beam,and determine the shear and moment throughout the beamas functions of x for 0 ≤ x ≤ 6 ft and 6 ft ≤ x ≤ 9 ft.In the textbook solution above for 6<=x<=9, equation 3 has 1/2 * (x-6). Where does this come from?Also is there a way you could draw the shear/moment diagrams for 6<=x<=9 and derive the shear/moment equations using just calculus
Calculate the moment about a point C( – 5,5,6) ft caused by the forces F1 = 3i + 4j – 8k lb and F2 = 0i – 4j + 7k lb acting at the points A6, – 8,1) ft and B(6, 0, 4) ft, respectively. Mc = -81 xi + 4 x 3 + -39 x k) lb · ft
Draw the shear and moment diagrams for the beam, and determine the shear and moment in the beam as functions of x for 0 < x <6 ft, and 6 ft < x < 9 ft.
Find the equation of the elastic curve, y(x) (deflection) by integration of the Moment equation, M(x)/EL. Find the location of maximum deflection. In a small dam, a typical vertical beam is subjected to the hydrostatic loading shown in the figure. Determine the stress at point D of section a-a due to the bending moment. Ans: 7.29MPa.
F1 = 7i-4j+7k at r1= 11i+2j+1k F2= -2i-1j-8k at r2= 2i+1j+4k a) Find moment produced by forces about P(-2,-3,4) b) Replace forces with equivalent force and couple moment acting at origin.
For the beam below, use Virtual Work to find the rotation (in degrees) at the point B (measured clockwise from the positive horizontal axis) aft b-5ft P=6,609 lb E-29,000ksi Moment of Inertia1 -11 -4,627 in? Moment of Inertia 2-12-1,046 in? ww1.152 lb/ft P w A B ws 1,152 lbTt w P. A B а b Moment of Inertia 1=11 Moment of Inertia 2=12 А B X өв
2- Find the rotation at E and the vertical displacement at D. EI -constant 2 k/ft 20 K /A 12' 16' 24 ft-k 18' E 9'
8k 3 k/ft -- c) Slope and vertical displacement at point D (use kN and m) a) Conjugate beam method (El is constant)
C. Find the moment at Point A. -4 F1-6.6 lb, 1,-1.35 ft, l,-0.95 ft, l,-0.4 ft, 04-165°, α,-120°