Final answer:
To add vectors, we calculate the horizontal and vertical components, and then compute the magnitude and direction of the resultant vector, which is approximately 1187.7 N at 141.3 degrees.
Step-by-step explanation:
To add the following vectors, we must break each vector into its horizontal (x-axis) and vertical (y-axis) components using trigonometric functions.
- Vector 1: 440 N at 100 degrees
Horizontal: 440 N × cos(100°) = -76.396 N
Vertical: 440 N × sin(100°) = 435.199 N - Vector 2: 905 N at 160 degrees
Horizontal: 905 N × cos(160°) = -848.528 N
Vertical: 905 N × sin(160°) = 311.357 N
Now, add the horizontal and vertical components separately to get the resultant vector:
- Resultant Horizontal: -76.396 N + (-848.528 N) = -924.924 N
- Resultant Vertical: 435.199 N + 311.357 N = 746.556 N
To find the magnitude of the resultant vector (R), use the Pythagorean theorem:
R = √((-924.924 N)2 + (746.556 N)2) = 1187.66 N
Finally, calculate the angle (θ) of the resultant vector with respect to the positive x-axis (east) using the inverse tangent function:
θ = arctan(746.556 N / -924.924 N) = 141.3°
Thus, the resultant vector is approximately 1187.7 N at 141.3 degrees.