In Exercises 27–30, let v = i - 5j and w = -2i + 7j. Find each specified vector or scalar. w - v

Vector subtraction involves finding the difference between two vectors by subtracting their corresponding components. For vectors v = ai + bj and w = ci + dj, the result of w - v is given by (c - a)i + (d - b)j. This operation is essential for determining the relative position or direction between two points in a vector space.

Vectors can be expressed in component form, which breaks them down into their horizontal (i) and vertical (j) components. For example, the vector v = i - 5j has a horizontal component of 1 and a vertical component of -5. Understanding this form is crucial for performing operations like addition and subtraction, as it allows for straightforward manipulation of the components.

The resultant vector is the vector that results from the addition or subtraction of two or more vectors. In the context of vector subtraction, the resultant vector represents the difference in direction and magnitude between the two original vectors. It is important for visualizing how one vector relates to another in a coordinate system.