College algebra students learn How to find the unit vector of a vector, and manipulate different types of functions.

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Finding the Unit Vector given a vector (divide the vector by its magnitude). Show Step-by-step Solutions Finding the vector u given the initial point and the terminal point, then finding the length of the vector and finally finding the unit vector.

The above is a unit vector formula. How to find the unit vector? To find a unit vector with the same direction as a given vector, we divide the vector by its

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For the vector v = (-2, 3), find its unit vector. Solution. The formula for finding the unit vector is stated as: u = v / |v| So, by inserting the magnitude of the vector v: u = (-2, 3) / √((-2)^2 + (3)^2) u = (-2, 3) / √13. u = (-2/√13 , 3/√13) Where u is the

The process is straightforward— divide the vector by its magnitude. For arbitrary vector F. ˆF = F | F |. To emphasize that unit vectors are pure direction, track what happens

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