A has the magnitude 10.9 m and is angled 56.3° counterclockwise from the positive direction of the x axis of an xy coordinate system. Also, B→=(10.6 m)î+(7.05 m)ĵ on that same coordinate system. We now rotate the system counterclockwise about the origin by 21.8° to form an x'y' system. On this new system, what are (a)A→ and (b)B→, both in unit-vector notation?
A has the magnitude 10.9 m and is angled 56.3° counterclockwise from the positive direction of...
A has the magnitude 12.2 m and is angled 57.9° counterclockwise from the positive direction of the x axis of an xy coordinate system. Also, B- 10.9 m 5.69 m j on that same coordinate system. We now rotate the system counterclockwise about the origin by 19.8° to form an x'y system. On this new system, what are (a) A and (b) B, both in unit-vector notation? Units (a) Number Units (b) Number
A has the magnitude 13.4 m and is angled 55.0 from the positive direction of the x axis of an xy coordinate system. Also, 8-13.9 m 8.65 m on that same coordinate system. We now rotate the system counterclockwise about the origin by 18.7 to form an x'y system. On this new system, what are (a) A and (b) 8, both in unit-vector notation? 1.2 (b) Nu
In the sum A→+B→=C→, vector A→ has a magnitude of 12.0 m and is angled 38.2° counterclockwise from the +x direction, and vector C→ has a magnitude of 13.9 m and is angled 21.2° counterclockwise from the -x direction. What are (a) the magnitude and (b) the angle (relative to +x) of B→? State your angle as a positive number.
8. Vector ? has a magnitude of 35.0 units and points in the direction 325° counterclockwise from the positive x axis. Calculate the x and y components of this vector. 9. A vector has an x component of -25.0 units and a y component of 40.0 units. Find the magnitude and direction of this vector. 10. A force ? 1 of magnitude 6.00 newtons acts on an object at the origin in a direction θ = 30.0° above the positive...
A vector with magnitude 7 points in a direction 70 degrees counterclockwise from the positive x axis. Write the vector in component form.
A vector with magnitude 5 points in a direction 340 degrees counterclockwise from the positive x axis. Write the vector in component form. Vector = Give each value accurate to at least 1 decimal place
3. Vector A has a magnitude of 23 units and points in the positive y-direction. Vector B is added to A, giving a resultant vector A + B that points in the negative y-direction with a magnitude of 13 units. What is the magnitude and direction of B?4. As you will see in a later chapter, forces are vector quantities, and the total force on an object is the vector sum of all forces acting on it. In the figure below, a force F1...
Find the magnitude (in N/m) and direction (in degrees counterclockwise from the +x-axis) of the force that each wire experiences in the figure by using vector addition. (Assume that the +x-axis is to the right and the +y-axis is up along the page.) 5.50 A 1 20.0 cm 20.0 cm-- 22.0 20.0 cm 38.5 A Top wire magnitude direction N/m º counterclockwise from the +x-axis Bottom left wire magnitude direction N/m • counterclockwise from the +x-axis Bottom right wire magnitude...
Find the magnitude (in N/m) and direction (in degrees counterclockwise from the +x-axis) of the force that each wire experiences in the figure by using vector addition. (Assume that the +x-axis is to the right and the +y-axis is up along the page.) 6.50 A -20.0 cm 20.0 cm 13.0 A 20.0 cm 26.0 A Top wire magnitude X N/m direction 1 x counterclockwise from the +x-axis Bottom left wire magnitude N/m counterclockwise from the +x-axis direction Bottom right wire...
Find the magnitude (in N/m) and direction (in degrees counterclockwise from the +x-axis) of the force that each wire experiences in the figure by using vector addition. (Assume that the +x-axis is to the right and the +y-axis is up along the page.) 6.50 A -18.0 cm 18.0 cm х х 13.0 A 18.0 cm 39.0 A Top wire magnitude direction N/m º counterclockwise from the +x-axis Bottom left wire magnitude N/m direction º counterclockwise from the +x-axis Bottom right...