In Exercises 1–8, use the given vectors to find v⋅w and v⋅v. v = -6i - 5j, w = -10i - 8j

The dot product is a mathematical operation that takes two vectors and returns a scalar. It is calculated by multiplying the corresponding components of the vectors and then summing those products. For vectors v = ai + bj and w = ci + dj, the dot product is given by v·w = ac + bd. This operation is essential for determining the angle between vectors and their relative direction.

Vectors are represented in terms of their components along the coordinate axes. In the case of v = -6i - 5j, the components are -6 (along the x-axis) and -5 (along the y-axis). Understanding vector components is crucial for performing operations like the dot product, as it allows for the manipulation of the vectors in a coordinate system.

The magnitude of a vector is a measure of its length and is calculated using the formula |v| = √(a² + b²) for a vector v = ai + bj. This concept is important when calculating the dot product of a vector with itself, as it provides insight into the vector's size and is used in various applications, including physics and engineering.