Version 19 DHS 2.2
Content: 2.2v19.pdf (45.12 KB)
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DHS - 2.2
№1.19. Given the vector. It is necessary: a) to calculate the mixed product of the three vectors; b) find the module of the vector product; c) calculate the scalar product of two vectors; d) check whether the two vectors are collinear or orthogonal; e) check whether the three vectors are coplanar: a (-2; 4; -3); b (5; 1; -2); c (7; 4; -7).
№2.19. The vertices of the pyramid are at points A (–7; –6; –5); B (5; 1; –3); C (8; –4; 0); D (3; 4; –7) .....
№3.19. Three forces are given P (7; –5; 2); Q (3; 4; –8); R (–2; –4; 3); attached to point A (–3; 2; 0). Calculate a) the work produced by the resultant of these forces; when the point of its application, moving straight, moves to the point B (6; 4; –3); b) the value of the moment of the resultant of these forces relative to point B.
№1.19. Given the vector. It is necessary: a) to calculate the mixed product of the three vectors; b) find the module of the vector product; c) calculate the scalar product of two vectors; d) check whether the two vectors are collinear or orthogonal; e) check whether the three vectors are coplanar: a (-2; 4; -3); b (5; 1; -2); c (7; 4; -7).
№2.19. The vertices of the pyramid are at points A (–7; –6; –5); B (5; 1; –3); C (8; –4; 0); D (3; 4; –7) .....
№3.19. Three forces are given P (7; –5; 2); Q (3; 4; –8); R (–2; –4; 3); attached to point A (–3; 2; 0). Calculate a) the work produced by the resultant of these forces; when the point of its application, moving straight, moves to the point B (6; 4; –3); b) the value of the moment of the resultant of these forces relative to point B.
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