QUESTION 8
A plane is flying at 400 mph with a heading of S 20 w. A strong cross wind is blowing at 40 mph with a heading of N 55º w. Show all steps.
a) Sketch the graph, determine the vector representing the velocity of the plane relative to the air in the form <x-component, y-component>.
b) Sketch the graph, determine the vector representing the velocity of the wind in the form <x-component, y-component>.
C) Determine the true velocity of the plane in the form <x-component, y-component>.
d) Determine the speed of the plane relative to the ground
d) What is the true bearing that the plain is flying?
QUESTION 8 A plane is flying at 400 mph with a heading of S 20 w....
An airplane is flying at 250 m/s due north, relative to air. There is a strong wind of 65 m/s blowing in a due east direction. Sketch a Vector Diagram showing the velocity of the airplane relative to the air, the velocity of the wind, and the final velocity of the plane relative to the ground. Use it to help you determine the magnitude and direction of the velocity of the plane relative to the ground.
2D Kinematics Question: A plane is flying 162 m/s west relative to the air. The wind is blowing 23 m/s north relative to the ground. Determine the plane's velocity relative to the ground. Velocity relative to the ground (magnitude)= Velocity relative to the ground direction = degrees W of N
5. A commercial passenger jet is flying with an airspeed of 185 miles per hour on a heading of 036°. If a 47-mile-per-hou wind is blowing from a true heading of 120°, determine the velocity and direction of the jet relative to the ground. a. 188.5 mph, 021° b. 186.1 mph, 021° c. 186.1 mph, 069 d. 195.6 mph, 069°
The heading of an object is the angle, measured clockwise from due north, to the vector representing the intended path of the object. Example 4 A plane is flying with an airspeed of 185 miles per hour and a heading of 12o* . The wind currents are running at a constant 32 miles per hour at 165 clockwise from due north Find the true course and ground speed of the plane?
The heading of an object is the angle, measured...
An airplane was heading due east at 320 mph in still air and encountered a 46 mph headwind blowing in the direction S 32° W.Determine the resulting ground speed of the plane and its new bearing The resulting ground speed of the plane is mph. (Round to two decimal places as needed.)
An airplane was heading due east at 320 mph in still air and encountered a 46 mph headwind blowing in the direction S 32° W.Determine the resulting ground...
Question 15 0 out of 3 points A pilot is flying with an air speed of 63.5. Realizing there is a cross-wind, she is adjusting the heading of the plane to compensate. The pilot wants to fly directly north, but the cross-wind is blowing to the east with a speed of 30.4 relative to the ground. At what angle west of north does the pilot need to aim the plane? Find your answer in degrees, but only enter your number...
plz dont skip steps
(1 pt) A plane is heading due west: its nose points towards the west direction, but its trajectory on the ground deviates from the west direction due to a sideways component of the wind. The plane is also climbing at the rate of 120 km/h (height increase per unit time). If the plane's airspeed is 550 km/h and there is a wind blowing 90 km/h to the northwest, what is the ground speed of the plane?...
80 mpli po mph 45 45 - 590 mph 590 mph 28 N N 28 w w (b) Write the velocity of the wind as a vector in componentform 80(cos(45), sin(45°)] (c) Write the velocity of the jet relative to the air in componentform 590( cos(118°), sin ( 118°)] (d) What is the speed of the jet with respect to the ground? (Round your answer to one decimal place.) 2410.37 X mph (e) What is the true direction of the...
Consider flying between Los Angeles and San Francisco, as shown in the image below. Assume that San Francisco is directly north of Los Angeles, and that the two cities are separated by a distance D=377D=377 miles. The engines of the plane (as with any plane) maintain its speed relative to the air, which for the sake of this problem we take to be constant. Denoting the velocity of the plane relative to the air by v⃗p/av⃗p/a, this means that ∣v⃗p/a∣=v0=424∣v⃗p/a∣=v0=424...
A pilot sets an air speed and heading of 575. km/hr at 36.6 degree S of W A wind is blowing at (58.0i + 58.0j)km/hr. a) Determine the plane s velocity, in km/hr, with respect to the air in unit vector (i,j,k) notation. b) Determine the velocity, in km/hr, the air traffic control station observes for the plane unit vector (i,j,k) notation.