Polar Grid Navigation
Hy,
does anybody know how to calculate this question? At 60°N 030°W, the true heading is 090° and the Gyro is 000°. At 62°N 010°W, the True heading is 095° and it has taken 1.5 hours to travel the distance. What will the Gyro read assuming no Latitude Nut correction? 003° 345° 328°( this is the right answer) 334° |
The question involves working out the transport and earth wander.
TW/hr = E/W GS * Tan(lat) / 60 EW/hr = 15 * Sin(lat) E/W GS = change of long * Cos(lat) / duration. Mean lat is 61 GS = (30-10) * 60 * Cos(61) / 1.5 = 388 TW = 388 * Tan(61) / 60 = 11.7 EW = 15 * Sin(61) = 13.1 Total Wander for 1.5hrs = 1.5(11.7+13.1) = 37.2 Travelling E in N hem so 360-37.2 = 322.8 So I don't get quite the same number. But as both involve a 3,2 and an 8 I wonder if there is a typo? |
Grid/Gryo
Answer 328 is correct (no typo error), HWD calculations are correct, but you also need to ADD back in the 5 degree actual heading change from 090 to 095.
323 + 5 = 328. Bit of a bar steward. |
Well spotted :O
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I was always taught by the Late Great Sandy Thomson that the easiest way to do these is to draw it all out to scale, and then just measure off the angle with a protractor.
Can't remember the ins and outs cos was TOOOOOO long ago!! But try it and see if it still works. It got me through!! |
The question wasn't actually a Polar grid problem. It was a gyro question.
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