The route followed by a hiker consists of three displacement vectors A, B, and C. Vector A is along a measured trail and is 1550 m in a direction 25.0° north of east. Vector B is not along a measured trail, but the hiker uses a compass and knows that the direction is 41.0° east of south. Similarly, the direction of vector C is 35.0° north of west. The hiker ends up back where she started. Therefore, it follows that the resultant displacement is zero, or A+B+C= 0 . Find the magnitudes of vector B and vector C.
The route followed by a hiker consists of three displacement vectors A, B, and C. Vector...
The route followed by a hiker consists of three displacement vectors A with arrow, B with arrow, and C with arrow. Vector A with arrow is along a measured trail and is 1550 m in a direction 23.0° north of east. Vector B with arrow is not along a measured trail, but the hiker uses a compass and knows that the direction is 41.0° east of south. Similarly, the direction of vector vector C is 40.0° north of west. The...
Section 1.8 → The route f by a hiker consists of three di vectors A, B, and vector A is along a tral and is 1550 m in a Vector B is trail, but the hiker uses a compass and knows that the direction is 41.0 east of south Similary, the direction of wectors 250 north of west. The hiker ends up back where she started, so the resultant displacement is zero, or A+B+C-0. Find the magnitudes of vector B...
The route followed by a hiker consists of three displacement vectors , , and . Vector is along a measured trail and is 2730 m in a direction 40.0 ° north of east. Vector is not along a measured trail, but the hiker uses a compass and knows that the direction is 33.0 ° east of south. Similarly, the direction of vector is 22.0 ° north of west. The hiker ends up back where she started, so the resultant displacement is zero, or + + = 0. Find the...
The route followed by a hiker consists of three displacement vectors , , and . Vector is along a measured trail and is 2730 m in a direction 40.0 ° north of east. Vector is not along a measured trail, but the hiker uses a compass and knows that the direction is 33.0 ° east of south. Similarly, the direction of vector is 22.0 ° north of west. The hiker ends up back where she started, so the resultant displacement is zero, or + + = 0. Find the...
Displacement vectors A, B, and C add up to a total of zero. Vector A has a magnitude of 1550 m and a direction of 23.4° north of east. Vector B has a direction of 41.0° east of south, and vector C has a direction of 35.9° north of west. Find the magnitudes of vector B and vector C. .
Displacement vectors A B, and C add up to a total of zero. Vector A has a magnitude of 1550 m and a direction of 22.9° north of east. Vector B has a direction of 41.0° east of south, and vector C has a direction of 32.3° north of west. Find the magnitudes of vector B and vector C.
Displacement vectors A,B, and C add up to a total of zero. Vector A has a magnitude of 1550 m and a direction of 22.4° north of east. Vector B has a direction of 41.0° east of south, and vector C has a direction of 32.0° north of west. Find the magnitudes (in m) of vector B and vector C.
A grasshopper makes four jumps. The displacement vectors are (1) 35.0 cm, due west; (2) 25.0 cm, 34.0 ° south of west; (3) 21.0 cm, 61.0 ° south of east; and (4) 18.0 cm, 55.0 ° north of east. Find (a) the magnitude and (b) direction of the resultant displacement. Express the direction as a positive angle with respect to due west.
A pilot flies her route in two straight-line segments. The displacement vector A for the first segment has a magnitude of 256 km and a direction 30.0o north of east. The displacement vector for the second segment has a magnitude of 169 km and a direction due west. The resultant displacement vector is R = A + B and makes an angle θ with the direction due east. Using the component method, find (a) the magnitude of R and (b)...
Displacement vector A points due east and has a magnitude of 2.98 km. Displacement vector B points due north and has a magnitude of 1.54 km. Displacement vector C boints due west and has a magnitude of 1 km. Displacement vector D points due south and has a magnitude of 1.4 km. Find the magnitude and direction (relative to due east) of the resultant vector A +B+C+D. magnitude direction km ocounterdlockwise from due east Additional Materials section 1 8