1) What is the speed of the plane with respect to the ground? 2) What is the heading of the plane with respect to the ground? (Let 0Â° represent due north, 90Â° represents due east). 3) How far east will the plane travel in 1 hour?

Question

1) What is the speed of the plane with respect to the ground?     2) What is the heading of the plane with respect to the ground? (Let 0Â° represent due north, 90Â° represents due east).     3) How far east will the plane travel in 1 hour?

Jamir · Answer

1) The speed of the plane with respect to the ground can be calculated using the Pythagorean theorem. We need to find the magnitude of the resultant velocity by adding the velocities of the plane with respect to the air and the air with respect to the ground. This can be done using the formula: Speed of the plane with respect to the ground = â(180 m/s)Â² + (31 m/s)Â² = â(32400 + 961) = â33361 â 183 m/s Therefore, the speed of the plane with respect to the ground is approximately 183 m/s. 2) The heading of the plane with respect to the ground can be calculated using trigonometry. We need to find the direction of the resultant velocity relative to due north. This can be done using the formula: Heading = arctan((180 m/s) / (31 m/s)) â arctan(5.806) â 240Â° Therefore, the heading of the plane with respect to the ground is approximately 240Â°. 3) To calculate how far east the plane will travel in 1 hour, we need to find the distance traveled in the eastward direction. This can be calculated by multiplying the speed of the plane with respect to the ground by the time taken: Distance traveled east = (183 m/s) * (1 hour) = 183 m/s * 3600 s = 659,400 m = 659.4 km Therefore, the plane will travel approximately 659.4 km east in 1 hour.

Calculating Airplane Speed and Heading

Explanation:

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