If an airplane travels 19.0° north of east for 243 km, how far east and how...
If an airplane travels 48.0° north of east for 251 km, how far east and how far north did it travel? In other words, what are the magnitudes of the east component and north component of the plane's displacement?
An ocean liner leaves New York City and travels 35.0° north of east for 218 km. How far east and how far north has it gone? In other words, what are the magnitudes of the components of the ship's displacement vector in the following directions? (a) due east km (b) due north km
An ocean liner leaves New York City and travels 54.0 north of east for 163 krm. How far east and how far north has it gone? In other words, what are the magnitudes of the components of the ship's displacement vector in the following directions? kom 95.81 (b) due north 131.87km As an aid in working this Two forces are applied to a tree stump to pull it out of the ground. Force FA has a magnitude of 2370 newtons...
Magnitude o north of east EXERCISE orth A cruise ship leaving port travels 51.0 km 45.0 north of west and thendingo. of east. 23.46 the two x components is the x component of the resultant 74.89 Find the components of each displacement, then add the two x components is the χ component of the resultant. km (b) Find the displacement vector's magnitude and d Magnitude You have the correct expression for the magd wrong, so this one is too. km...
a hiker travels 2 km due east of his starting point. then he travels 1 km northwest. finally, he travels 3 km due north. how far is the hiker from the starting point adter the 3 displacements and in what direction ? draw the three displacement vectors to scale and add them graphically.
A person walks 30.0° north of east for 3.20 km. How far due north and how far due east would she have to walk to arrive at the same location?
1. A car travels 30 miles north, then 10 miles east. The displacement vector is X miles north, Y miles east. A) What is X? B) What is Y? 2. A car travels 30 miles north, then 10 miles east, then 20 miles west, then 2 miles south. The displacement vector is X miles north, Y miles east. A) What is X? B) What is Y? (beware of signs) 3. A car travels 30 miles northwest. The displacement vector is...
6. An airplane has a speed of 120 km/h degrees east of north when a wind start 2: Long Answer (15 points) Two trains, both traveling at 30 m/s, are headed toward each other on the same track. When they are 4.0 km apart they see each other and slam on the brakes a) If their decelerations are constant and equal, what must be the magnitudes of these accelerations if the trains are to barely avoid collision? b) How many...
An airplane is flying 25 degrees north of east at a speed of 820 km/h. How fast is it moving to the north ?
A small plane flies 32.0 km in a direction 45° north of east and then flies 13.0 km in a direction 15° north of east. Use the analytical method to find the plane's straight line distance from the starting point (in km) and the geographic direction of its displacement vector (in degrees counterclockwise from the east axis) total straight-line distance direction km X ° counterclockwise from the east axis What is its displacement vector (in km)? (Assume the +X-axis is...