You go for a walk in the mountains. Your GPS reads that you traveled a distance...
While in a park, you walk west for 52 m, then you walk 35.0° north of west for 40 m, and finally you walk due north for 25 m. Find the components of your final displacement (in m), from your initial to final point, along the north and west directions. (a) find the displacement component due north
What is the magnitude of your total displacement if you have traveled due west with a speed of 23 m/s for 165 s , then due south at 12 m/s for 295 s ?What is the direction of your total displacement in part A.
Suppose you first walk 12 m in a direction 20° west of north and then 27m in a direction 40° south of west as shown in the figure.Part (a) What is the component of your displacement in the x-direction, in meters? Part (b) What is the component of your displacement in the v-direction, in meters?Part (c) How far are you from your starting point in meters? Part (d) what is the angle of a line connecting your starting position to your final...
What is the direction and magnitude of your total displacement if you have traveled due west with a speed of 27 m/s for 150 s , then due south at 14 m/s for 66 s ? Part A. r = ___ Part B. Theta = _____
(18 %) Problem 3: west of north Suppose you walk 11 m in a direction exactly 25° south of west then you walk 18 m in a direction exactly 44° 25% Part (a) How far are you from your starting point in m? R- 19.26 X Attempts Remain × 25% Part (b) What is the angle of the compass direction of a line connecting your starting point to your final position measured North of West in degrees? Grade Summary Deductions...
Suppose you walk 13.5 m in a d rection exactly 24° south of west then you walk 195 m in a d rection exactly 42° west of north.Part (a) How far are you from your starting point, in meters?Part (b) What is the angle of the compass direction of a line connecting your starting point to your final position measured North of West in degrees?
Vector Addition and Subtraction: Graphical Methods Use graphical methods to solve these problems. You may assume data taken from graphs is accurate to three digits. 1. Find the following for path A in Fiqure 3.53: (a) the total distance traveled, and (b) the magnitude and direction of the displacement from start to finish. Figure 3.53 The various lines represent paths taken by different people walking in a city. All blocks are 120 m on a side. 2. Find the following for path B in Figure...
Suppose you first walk A = 14.0 m in a direction θ1 = 18° west of north and then B = 27.5 m in a direction θ2 = 37.0° south of west. How far are you from your starting point, and what is the compass direction of a line connecting your starting point to your final position? (If you represent the two legs of the walk as vector displacements A and B, as in the figure below, then this problem...
8. You go on a hike with some friends. You hike 3 km to the east to see a waterfall and then you hike 2 km north to reach a picnic area. a) What is the magnitude of your total displacement when you reach the picnic area? (Give you answer in km.) b) What is the direction of your displacement vector when you are at the picnic area (as measured north of east)? c) What is the total distance traveled...
Suppose you walk 18.0 m straight west and then 25.0 m straight north. (If you represent the two legs of the walk as vector displacements A and B, as in the figure below, then this problem asks you to find their sum R = A + B.) How far, in meters, are you from your starting point? What is the compass direction of a line connecting your starting point to your final position measured in degrees west of north?