![0 Course. [MAT 210 NI Sections] / Χ O MAT 210 All 5ections: Truss Syste Χ WeBWorK : math2 10 : Truss_Sys., ぐ → C ⓘGüvenli degil webwork.no.metu.edu.tr/webwork2/math210/Truss System-Rowsp-and-Nullsp/1/ Problemn 4 The answer above is NOT correct. (1 point) Consider the following truss system. All bars are either vertical, horizontal, or at 45 from horizontal. Enter the elongation matrix: in the form node 1 horiz, node 1 vert, node 2 horiz etc.) 2 (1220 21 (Remember that webwork uses radians for computations.) This truss system should be stable. The matrix is square, which is good. However, you should be able to verify that its LU decomposition. This means that it has no nullspace, has a pivot in each column of Preview My Answers Submit Answers Your scorc You have attempted this problem 12 times. was recorded. Ee PD 2.12.2018](http://img.homeworklib.com/questions/e7e5bdf0-721a-11ea-847e-210c0633096a.png?x-oss-process=image/resize,w_560)
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0 Course. [MAT 210 NI Sections] / Χ O MAT 210 All 5ections: Truss Syste Χ...
(1 point) Consider the following truss system. 2 0 303 All angles are as marked. 3...
(1 point) Consider the following truss system. 2 0 303 All angles are as marked. 3 30(.. 30 Enter the elongation matrix: (in the form "node 1 horiz", "node 1 vert", "node 2 horiz" etc.) (Remember that webwork uses radians for computations.) Compute a basis for the nullspace of A. Basis
(1 point) Consider the following truss system. 2 교 All bars are either vertical, horizontal, or ...
(1 point) Consider the following truss system. 2 교 All bars are either vertical, horizontal, or at 45° from horizontal. Enter the elongation matrix (A = B*): (in the form "node 1 horiz", "node 1 vert", "node 2 horiz" etc.)
(1 point) Consider the following truss system. 2 교 All bars are either vertical, horizontal, or at 45° from horizontal. Enter the elongation matrix (A = B*): (in the form "node 1 horiz", "node 1 vert", "node 2 horiz" etc.)
(1 point) Consider the following truss system. 030 All angles are as marked. Enter the elongation...
(1 point) Consider the following truss system. 030 All angles are as marked. Enter the elongation matrix (in the form node 1 horiz', "mode 1 vert, "node 2 horiz" etc.) (Remember that webwork uses radians for computations.) Compute a basis for the nullspace of A Basis Match the following vectors with the movements they would represent and state whether they are in the nullspace of A 0 Movement 1 Movement -1Movement 0 Movement 0 In nullspace? 1 In nullspace? No...
(1 point) Consider the following truss system. All bars are vertical or horizontal. Enter the elongation...
(1 point) Consider the following truss system. All bars are vertical or horizontal. Enter the elongation matrix (in the form node 1: horiz, "node 1 vert, "node 2 horiz etc.) Compute a basis for the nullspace of A. Basis Match the following vectors with the movements they would represent and state whether they are in the nullspace of A 0 Movement 0 Movement 0 Movement: 0 Movement: D Y 1 In nul lspace? Yes 0 In nullspace? 1Yes 0 2...
(1 point) Consider the following truss system. 2 0 303 All angles are as marked. 3 30(.. 30 Enter the elongation matrix: (in the form "node 1 horiz", "node 1 vert", "node 2 horiz" etc.) (Remember that webwork uses radians for computations.) Compute a basis for the nullspace of A. Basis
(1 point) Consider the following truss system. 2 교 All bars are either vertical, horizontal, or at 45° from horizontal. Enter the elongation matrix (A = B*): (in the form "node 1 horiz", "node 1 vert", "node 2 horiz" etc.)
(1 point) Consider the following truss system. 2 교 All bars are either vertical, horizontal, or at 45° from horizontal. Enter the elongation matrix (A = B*): (in the form "node 1 horiz", "node 1 vert", "node 2 horiz" etc.)
(1 point) Consider the following truss system. 030 All angles are as marked. Enter the elongation matrix (in the form node 1 horiz', "mode 1 vert, "node 2 horiz" etc.) (Remember that webwork uses radians for computations.) Compute a basis for the nullspace of A Basis Match the following vectors with the movements they would represent and state whether they are in the nullspace of A 0 Movement 1 Movement -1Movement 0 Movement 0 In nullspace? 1 In nullspace? No...
(1 point) Consider the following truss system. All bars are vertical or horizontal. Enter the elongation matrix (in the form node 1: horiz, "node 1 vert, "node 2 horiz etc.) Compute a basis for the nullspace of A. Basis Match the following vectors with the movements they would represent and state whether they are in the nullspace of A 0 Movement 0 Movement 0 Movement: 0 Movement: D Y 1 In nul lspace? Yes 0 In nullspace? 1Yes 0 2...
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