In Exercises 61–64, find the magnitude ||v||, to the nearest hundredth, and the direction angle θ, to the nearest tenth of a degree, for each given vector v. v = (4i - 2j) - (4i - 8j)

Vector subtraction involves finding the difference between two vectors by subtracting their corresponding components. In this case, the vector v is derived from subtracting the second vector from the first, which requires performing component-wise subtraction. Understanding this operation is crucial for determining the resultant vector that will be analyzed for magnitude and direction.

The magnitude of a vector represents its length and is calculated using the formula ||v|| = √(x² + y²), where x and y are the components of the vector. This concept is essential for quantifying the size of the vector in a two-dimensional space. In the given problem, once the resultant vector is determined, its magnitude can be computed to provide a numerical value.

The direction angle θ of a vector is the angle formed between the vector and the positive x-axis, typically measured in degrees. It can be calculated using the tangent function: θ = arctan(y/x), where y and x are the vector's components. This concept is important for understanding the orientation of the vector in the coordinate plane, which is required to express the vector's direction accurately.