How do you find a unit vector parallel to another vector? To find the unit vector in the same direction of another vector, we have to divide the vector by its magnitude. For example, vector A = [3,6,1] Magnitude of vector A = √ (3 2 +6 2 +1 2) = √46Then, a unit vector parallel to → x is denoted by ˆx and is defined by, ˆx = → x ∣∣∣∣→ x ∣∣∣∣ → A = 2ˆi − 6ˆj − 3ˆk = (2, −6, − 3),&,→ B = (4,3, − 1).To find a unit vector parallel to another vector you must find the magnitude of the vector and divide its components by the magnitude.Vector a = 3i + 6j + 2zClick here👆to get an answer to your question ️ Find a unit vector parallel to the vector - 3 i + 4 j .Find a unit vector parallel to the resultant of the vectors Aˉ=2i^+3J^+4k^and Bˉ=3i^−5J^. **Find unit vector parallel to vector**.

18 Sep 2021, 10:20

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- www.onlinemath4all › how-to-find-unit-vector How to Find Unit Vector Parallel to Given Vector
- www.youtube › watch How to find a parallel unit vector example - YouTube