Therefore Denominator A = 118.1769304
Therefore Denomintor A = 122.34
Scale is 1:122.34
Sometimes on days like today I doubt my capabilities of becoming a professional pilot. I have not been (up) since my return from Canada, I think maybe it's time I reminded myself why I want this so much. Soon as there is break in the wx I'm booking out.
Thank you for trying Flip, I think I have it now , it's just dissapointing when you dont arrive at the same answer as the one in the book, this is where distance learning falls down.
Sometimes on days like today I doubt my capabilities of becoming a professional pilot.
I really wouldn't let it get you down. The only time I have had to apply this sort of knowledge is for theory exams (which you may find yourself doing many times if you join the international circuit). It gives your brain a good workout in the right direction, that is all.
For what it is worth, the JAA exams are far and away the hardest system I've been through. So they will give you an excellent grounding for the rest of your career.
Best tip I can offer is, by all means work through your answer, certainly take advantage of the knowledge-base on here..... but don't spend too long beating yourself up - you will bump into many 'typos', including on the CPL(H) exams.
I lost count of the hours I repeatedly quizzed myself over typos!
This question specifically - flying in the UK it is not really relevant, and our ground-school guru basically said it would only become of notable use if you are operating in the northern parts of Canada for example. (Or similar latitudes to the south).
And don't get me started on rhumb-line tracks...!!!
So I did some research and 122.3 is indeed the correct answer from the question banks, not 121.3.
With that said, I'll explain how I got my answer and perhaps it will be of some assistance if a similar question arises.
Gross Error Check
As my initial post proved, always do one
A direct mercator has straight, parallel meridians.
Thinking just in terms of longitude (to keep it simple) the chart distance between 2 meridians is always the same on a direct mercator, irrespective of whether you are looking at the Equator, 20N, 45S, 60N etc. But we know that the earth distance between 2 meridians changes as you move away from the equator - it gets smaller as the meridians converge on the poles.
For this question, we are moving closer to the equator - from 15S to 10N. That means we should expect the earth distance to be bigger at 10N for the same chart distance.
To answer the question, I used the ABBA forumla.
This formula presumes you have information on two points... point A and point B.
We will call 15S "A", and 10N "B"
The formula goes like this:
Scale at A x Cos B = Scale at B x Cos A
Let us consider the scale at A as being 1:1. It almost certainly isn't, but that doesn't matter. All we want to know is the relationship between Scale A and Scale B, not what their actual values are. I'll also point out that the North / South makes no difference to the question, so you can disregard that information.
1 x Cos 10 = ? x Cos 15
(1 x Cos 10) / Cos 15 = ?
1.0195 = ?
So this tells us that the relationship between the scale at A and the scale at B is 1:1.0195.
Plugging in "120nm" in place of "1"... 120nm x 1.0195 = 122.3nm
Edited for terrible spelling!
Last edited by flip2 on Fri Dec 02, 2011 3:17 pm; edited 1 time in total
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