Answer:
The instantaneous axis of rotation=
x = 0 ; z = 8.4 ft
Explanation:
Given:
Speed of helicopter, Vo= 120 mi/h, converting to ft/sec, we have:
[tex] \frac{5280 * 120}{60*60}[/tex]
= 176 ft/s
Angular velociyy, w = 220 rpm, converting to rad/sec, we have: [tex] \frac{200*2*pi}{60} =20.95 rad/s [/tex]
The helicopter moves horizontally in the x direction at a speed of 120 mi/h, this means that the helicopter moves in the positive x direction at 120mi/h
To find the instantaneous axis of rotation of the main blades, we have:
Where Vc = 20.95 rad/s
Vo = 176 ft/s
[tex] z = \frac{V_0}{V_c} = \frac{176ft/s}{20.95rad/s}[/tex]
= 8.4 ft
Therefore the axis of rotation=
x = 0 ; z = 8.4 ft
