Find the magnitude and direction angle for each vector. Round angle measures to the nearest tenth, as necessary.
〈15, -8〉

The magnitude of a vector represents its length and is calculated using the formula √(x² + y²), where x and y are the vector's components. For the vector 〈15, -8〉, the magnitude would be √(15² + (-8)²) = √(225 + 64) = √289 = 17. This value indicates how far the vector extends from the origin in a two-dimensional space.

The direction angle of a vector is the angle formed between the vector and the positive x-axis, measured counterclockwise. It can be found using the tangent function: θ = arctan(y/x). For the vector 〈15, -8〉, the angle would be θ = arctan(-8/15), which gives the angle in the fourth quadrant, indicating the vector's orientation in relation to the axes.

The coordinate plane is divided into four quadrants based on the signs of the x and y coordinates. Quadrant I has both coordinates positive, Quadrant II has a negative y and positive x, Quadrant III has both negative, and Quadrant IV has a positive x and negative y. Understanding which quadrant a vector lies in helps determine the correct angle measurement and ensures accurate interpretation of direction.