What is most nearly the angle in degrees between vector A and vector B? A-13,4,5) B...
Find the angle (in degrees) that is between the vector a = -24.1i + 45.0j and the positive x-axis
Vector B has a magnitude of 8 and is directed at an angle of 234.1 degrees counter-clockwise from the +x axis. If vector B = -A (the negative of vector A), what is angle of vector B, in degrees, measured degrees counter-clockwise from the +x axis?
a.what is the magnitude of the vector A+B+C? b.what is the angle between the positive x-axis and the vector, measured clockwise in degrees? c.What is the magnitude of the vector -A+2B+C? d. What is the angle between the negative x-axis and this vector, measured counterclockwise in degrees? (2006) Problem 9: Consider the three vectors shown in the figure. They have magnitudes A|-30.5, B|-13, and IC|-332, and the labeled angles are A- 40°, ев 20°, and ec-15° Note that the figure...
Vector A makes an angle of 32.3 degrees abovethe postive x-axis, and vector B makes an angle of 45.0 degrees below the negative x-axis. A= 2.83 units, and B= 1.80 units. Find A+B and A-B. A+B a) magnitude units b) direction counterclockwise from the +x-axis A-B a) magnitude units b) direction counterclockwise from the +x-axis
briefly account for the following observations a. a bond angle in NCl3 is nearly 5 degrees larger than in NF3 b. the S-F axial distance in SOF3 is longer than the S-F equatorial distance
Vector A⃗ has magnitude 8.80 m and is in the xy-plane at an angle of 128 degrees counterclockwise from the +x–axis (38 degrees past the +y-axis). The sum A⃗ +B⃗ is in the −y-direction and has magnitude 12.0 m. a) What is the magnitude of vector B⃗ ? b)What is the direction angle of vector B⃗ measured counterclockwise from the +x-axis?
Vectors A and B are shown. What is the magnitude of a vector C if C = A + B? Image description: Vector A of Magnitude 40 and Vector B of Magnitude 50 angled between them is 60 degree angle 10 46 30 78
Q1/ what is the angle ô between F and the displacement vector PAB? B (6.4,8) (3.2.5) с 3 50°
26. The central angle of a circular curve is 60 degrees. The length of curve is 600 feet. The radius (feet) for the given curve is most nearly: a. 530 b. 573 C. 600 d. 800
What are the magnitude and the direction angle of the vector (V21,2)? (Find the direction angle in degrees rounded to the nearest tenth.) The answer is O A. The magnitude is 25 and the direction angle is 66.4°. O B. The magnitude is 5 and the direction angle is 66.4° O C. The magnitude is 25 and the direction angle is 23.69 OD. The magnitude is 5 and the direction angle is 23.6º.