A vector A has a magnitude of 42.0m and points in a direction of 24.0 degrees above the positive x-axis. A second vector, B, has a magnitude of 72.0m and points in a direction 45.0 degrees below the positive x-axis. Using the components method, find the magnitude of the vector D=A-B.
A vector A has a magnitude of 42.0m and points in a direction of 24.0 degrees...
vector A has a magnitude of 40.0 m and points in a direction 24.0° above the negative x-axis. A second vector, vector B , has a magnitude of 84.0 m and points in a direction 60.0° below the positive x-axis. Using the component method, find the magnitude of the vector D resulting from vector A - vector B
3. A vector A has a magnitude of 58.0 m and points in a direction 24.0 below the negative x-axis. A second vector, B, has a magnitude of 82.0 m and points in a direction 55.0° below the positive x-axis. Using the component method, find the magnitude of the vector D-A B in
2. A vector A has a magnitude of 58.0 m and points in a direction 24.0° below the negative x axis. A second vector, B, has a magnitude of 82.0 m and points in a direction 55.0 below the positive x-axis. Using the component method find the magnitude of the vector A +
2. A vector A has a magnitude of 400 m and points in a direction 22.0° above the negative x-axis. A second vector, B.has a magnitude of 700 m and points in a direction 48.0° below the positive x-axis Using the component method, find the magnitude of the vector R-A+B. 3. A vector A has a magnitude of 40.0 m and points in a direction 22.0 above the negative x-axis. A second vector, B, has a magnitude of 700 m...
A vector → A has a magnitude of 44.0 m and points in a direction 26.0° above the positive x-axis. A second vector, → B , has a magnitude of 84.0 m and points in a direction 40.0° below the negative x-axis. Using the component method, find the magnitude of the vector → D = → A − → B .
A vector A→ has a magnitude of 44.0 m and points in a direction 26.0° above the positive x-axis. A second vector, B→, has a magnitude of 84.0 m and points in a direction 40.0° below the negative x-axis. Using the component method, find the magnitude of the vector →R=→A+→B
A vector →A has a magnitude of 44.0 m and points in a direction 26.0° above the positive x-axis. A second vector, B→, has a magnitude of 84.0 m and points in a direction 40.0° below the negative x-axis. Using the component method, find the magnitude of the vector →R=→A + →B
3. A vector A has a magnitude of 58.0 m and points in a direction 22.0° below the negative x-axis. A second vector, B, has a magnitude of 90.0 m and points in a direction 54.0° below the negative x-axis. Using the component method, find the magnitude of the vector D - A - B x 75.7m 4. Consider the three displacement vectors shown in the figure: Vector A has a magnitude of 8.10 km and a direction that makes...
2. A vector A has a magnitude of 50.0 m and points in a direction 28.0° above the negative x-axis. A second vector, B. has a magnitude of 80.0 m and points in a direction 60.0 above the negative x-axis. Using the component method, find the magnitude of the vector R- Ä + B. x Blank m 3. A vector A has a magnitude of 50.0 m and points in a direction 28.0° above the negative x-axis. A second vector,...
has a 3. A vector A has a magnitude of 40.0m and points in a direction 20.0° below the +x axis. A second vector B magnitude of 75.0 m and points in a direction 50.0° above the +x axis. (a) Sketch the vectors A, B, C = A+B and D = A - B (b) Using the component method, find the magnitudes and directions of the vectors and D.