The EASA
ATPL General Navigation
test bank contains questions pertaining to
061-03-02 Representation of meridians, parallel, great circles & rhumb lines
. The following list contains only a relatively small percentage of the pertinent
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General Navigation
test bank.
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Sample Questions
from the EASA ATPL
General Navigation
Test Bank |
- The scale on a Lambert conformal conic chart:
- On a Lambert conformal conic chart the distance between parallels of latitude spaced the same number of degrees apart:
- The angular difference, on a Lambert conformal conic chart, between the arrival and departure track is equal to:
- A straight line track is drawn on a polar stereographic chart from P (80° S 145° E) to Q (80° 112° W). At what longitude will the track reach its highest latitude?
- Consider the following statements on rhumb lines:
- On a Lambert conformal chart the distance between two parallels of latitude having a difference of latitude = 2° , is measured to be 112 millimetres. The distance between two meridians, spaced 2° longitude, is, according to the chart 70 NM. What is the scale of the chart, in the middle of the square described?
- On a Lamberts chart, scale is smallest at:
- On a Lambert Conformal Conic chart great circles that are not meridians are:
- Which one of the following statements is correct concerning the appearance of great circles, with the exception of meridians, on a Polar Stereographic chart whose tangency is at the pole?
- On a Lambert conformal chart the distance between two parallels of latitude having a difference of latitude = 2° , is measured to be 112 millimetres. The distance between two meridians, spaced 2° longitude, is, according to the chart 70 NM. What is the latitude in the centre of the described square?
- Parallels of latitude on a Direct Mercator chart are:
- On a Direct Mercator chart at latitude 15° S, a certain length represents a distance of 120 NM on the earth. The same length on the chart will represent on the earth, at latitude 10° N, a distance of:
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General Navigation
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