Relative motion & 2d vectors
Please show work and write neatly.
Relative motion & 2d vectors Please show work and write neatly. There are two ports, A...
QUESTION 3 : Relative motion and 2d vectors Question 3 (relative motion & 2d vectors) There are two ports, A and B. The displacement from port A to port B is 1600 m at 40% (or 40% north of east). You have a boat that travels 400 meters per minute in the water. Further, there is a constant current in the water that flows 80 meters per minute at 110% (or 20° west of north) as observed from the shore....
Please show work and write neatly. Question 2 (uniform circular motion) A rollercoaster with you in it is at the bottom of dive. Let's say you are 50 kg in mass. The coaster is traveling at 30 m/s and the curve is 8 meters in radius. a. What is the centripetal acceleration on you at the bottom of the curve? b. How much force is required to hold you at the bottom of the curve? C. What force(s) is responsible...
I need clear drawings and explanations for problems 7 and 10. Please include visuals for both. 7) A stone is thrown with an initial speed of 15 m/s af an angle of 53° above the horizontal from the top of a 35 m building. If g 9.8 m/s? and air resistance is negligible, then what is the speed of the rock as it hits ground? a. 15 m/s b. 21 m/s c.) 30 m/s 36 m/s k star in the...
Please answer questions E through L. Please show all your work and write your answers neatly and thoroughly. Class Date: (13%) Problem 6: A ball is drown upward from the ground with initial velocity vi upward direction to be positive Refer to the figure Neglect aur resistance Click here fo detailed view Ω v? S% Part (a) what is the acceleration, m meters per second squared, to d e ball when is un the air? 2 Completed 8% Part (b)...
I need help on number 80 M ILW Iwo ships, A and B, leave port at the same time. Ship A travels northwest at 24 knots, and ship B travels at 28 knots in a direction 40° west of south. (1 knot 1 nautical mile per hour see Appendix D.) What are the (a) magnitude and (b) direction of the velocity of ship A relative to B? (c) After what time will the ships be 160 nautical miles apart? (d)...
+ Relative-Motion Analysis of Two Particles Using Translating Axes < 5 of 5 n Review Learning Goal: Part A To analyze the motion of a particle using a translating frame of reference. Two particles, A and B, are moving along arbitrary paths and are at positions r A and rb from a common origin. The relative position of point B with respect to A is designated by a relative-position vector ТВА and is specified with the equation A cruise ship...
Show all work, neatly on worksheet. The only formula provided is wa-va-2a(r지). 1. A car is parked on a cliff overlooking the ocean on an incline that makes an angle of 22.0° below the horizontal. The negligent driver leaves the car in neutral, and the emergency brakes are defective The car rolls from rest down the incline with a constant acceleration of 3.52 m/s? for a distance of 50.0 m to the edge of the cliff, which is 25.0 m...
Instructions for PHY 2048 Problem Set (PSET): (1) Please NEATLY write your name and your solutions. (2) You must use blank 8"x11" printer paper. (3) Begin each problem on a new page, and put your name on each page. Staple your pages together. 4) Only write on one side of the page. (5) You must write up your solutions independently (i.e. don't copy anyone else's solutions), using your own words and thought process. You must show all of your work....
6. An astronaut ona distant planet wants to determine its acceleration due to gravity. The astronaut throws a rock straight up with a velocity of +15 m/s and measures a time of 20.0 s before the rock returns to his hand. What is the acceleration (magnitude and direction) due to gravity on this planet? See Diagram below: 20.0s v,15 m/s Show your work below: 7. Problem using vectors: A sailboat sails for 1 hr at 4 km/hr (relative to the...
Please let me know questions 3 through 9. 1. Show all the atepa neceasary to convert 2.00 kilometera into milea atarting from 2.54 cm 1 inch. Explicitly ahow how the intermediate unita divide out in the converaion. 2. A poaition veotor ia alwaya drawn with ita tail at the origin. It haa unita of length and it locatea a point in a choaen coordinate ayatem. A diaplacement veotor ia drawn with ita tail anywhere in the coordinate apace. Diaplacement vectora...