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 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...