Vectors A And B Lie In The Xy Plane Vector A Has A Magnitude Of 13 1 And Is At An Angle Of 120 5 Counterclockwise From 1 (40.17 KiB) Viewed 61 times
Vectors A And B Lie In The Xy Plane Vector A Has A Magnitude Of 13 1 And Is At An Angle Of 120 5 Counterclockwise From 2 (36.85 KiB) Viewed 61 times
Vectors A and B lie in the xy-plane. Vector A has a magnitude of 13.1 and is at an angle of 120.5" counterclockwise from the +-x-axis. Vector B has a magnitude of 21.9 and is 240.3" from the +x-axis. Resolve A and B into components, and express using ijk unit vectors, A=A₂i+ A,J + Ak B=B1+ Bj+ B₂k where A., Ay. A, and B., B,, and B, are the calculated values of the x-, y, and z-components of vectors A and B, respectively. À= B = Find the magnitude and unit vector for the cross product between A and B. |AX B = Identify the unit vector for A x B. Oi k
Vectors A and B lie in the xy-plane. Vector A has a magnitude of 13.1 and is at an angle of 120.5 counterclockwise from the +x-axis. Vector B has a magnitude of 21.9 and is 240.3" from the +x-axis. Resolve A and B into components, and express using ijk unit vectors, A=A,I + A,J + A₂k B=B₂i+ B₂j+ B₂k where A., Ay, A, and B,, B,, and B. are the calculated values of the x-, y, and z-components of vectors A and B, respectively. A = B = Find the magnitude and unit vector for the cross product between A and B. AXB = Identify the unit vector for AX B. ööö Oi
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