Fun Survey Questions

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Maji

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I see people posting quizzes on other subjects, so I thought that I will post a couple of problems related to survey. This one is taken from a publication by Bruce R. Harvey. He took this from an article published by R. B. Horner. I believe Mr. Horner published a number of challenging problems that needed sharp analytical skills before the age of CAD. I don't think a problem like this can come in the survey exam but thinking about, at least that is my hope, will help me develop better skills. 

Q6 quiz.jpg

 
Man, this one is really busting my 8@!!$.  I have about 2 hours into it so far with no clear idea of how to proceed.  :/ 

 
You can use CAD, but then you are missing out on the hours of agonizing analytical thinking :)

You can draw some construction lines at D and E. At D, draw DA. Also, draw a line from D perpendicular to AC. This one is 100 links long. Draw similar lines at E. Maybe this will help.

Another option is to extend FE till it meets the extension of AD. Consider this point as the origin 0,0. Now consider this as a coordinate geometry problem. The CAD program is basically using coordinate geometry. So, we can think like the CAD program as a shortcut. 

I know that this problem is way beyond the exam, but just a fun brain twister for us Engineering Nerds. Have fun torturing your brain.  

 
Good problem, thanks Maji.

Yeah, I have drawn the C-E and C Perp D-E lines but I still don't know how to proceed.  Even if I were to use CAD, how do I even draw it accurately?  I need to know length E-F or the angle(s) at C. Arrggghhh.  Ok, no more hints, I will keep trying......  ;)  

 
D-E    S 47^ 23' 27" E    1033.985 Links

E-F    38.997 Links

Area is 46739.125 SQ/Ft       1.073 Acres

Used CADD

 
Nice job zzz.

Okay, I gave up doing it by hand and used ACAD as well.  I'd really like to know how to do this problem by hand.  Does it involve two equations, two unknowns? 

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

 
Here is my partial solution. I think the rest of it is easy to calculate. Took me a good three hours to figure out. I can't believe I wasted three hours instead of studying for exam questions but this was more fun ;) .

View attachment DOC007.pdf

 
Here is my partial solution. I think the rest of it is easy to calculate. Took me a good three hours to figure out. I can't believe I wasted three hours instead of studying for exam questions but this was more fun ;) .

View attachment 8610
Dude, that is brilliant.  I am very impressed Maji, very nice work.  I didn't see that you can equate lengths AG to GJ.  I thought about it but then dismissed it.  But when following your work, it seems so obvious that they can be equated.  Dar.  :eek:S  Again, great job. 

 
I see people posting quizzes on other subjects, so I thought that I will post a couple of problems related to survey. This one is taken from a publication by Bruce R. Harvey. He took this from an article published by R. B. Horner. I believe Mr. Horner published a number of challenging problems that needed sharp analytical skills before the age of CAD. I don't think a problem like this can come in the survey exam but thinking about, at least that is my hope, will help me develop better skills. 

View attachment 8598


Ok Mr. Maji.  I never forgot about this thread and this problem you posted.  It's always been in the back of my mind to come back to it and solve it "from scratch".  I can't believe it has been over a year! 

I spent probably 4 - 6 hours on this thing over 2-3 nights!  (What you don't see here are the countless wadded up scrap paper balls in the trash can, before I finally got on to something that would work!). 

I can only get the answer by using my TI-89's solver......... but........... I FINALLY GOT IT!  :D   Tough one, for sure! 

Please see my solution and answers attached.  I have not looked at your partial solution since last year but I think we each had a different approach. 

Do you have the book answers for this one?

View attachment R B Horner Q6.pdf

 
Last edited by a moderator:
Ok Mr. Maji.  I never forgot about this thread and this problem you posted.  It's always been in the back of my mind to come back to it and solve it "from scratch".  I can't believe it has been over a year! 

I spent probably 4 - 6 hours on this thing over 2-3 nights!  (What you don't see here are the countless wadded up scrap paper balls in the trash can, before I finally got on to something that would work!). 

I can only get the answer by using my TI-89's solver......... but........... I FINALLY GOT IT!  :D   Tough one, for sure! 

Please see my solution and answers attached.  I have not looked at your partial solution since last year but I think we each had a different approach. 

Do you have the book answers for this one?

View attachment 10281
WOW!!! You do love geometry and surveying :)

I had to spend some time to locate the pdf in my archives... your answer is correct!! 

For the book... do a web search on "Survey Computations" bruce harvey and you should be able to locate it... it is notes from Bruce Harvey, a professor of Civil Engineering from Australia.

 
Hey Guys,

Would any of you happen to know what type of survey does not require a vertical control?

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Hey Guys,

Would any of you happen to know what type of survey does not require a vertical control?

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There are plenty of horizontal control surveys that don't require vertical control.  

 
There are plenty of horizontal control surveys that don't require vertical control.  
 
Do route, construction, and topographic surveys all require vertical controls?

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Can a post 1981 civil engineer perform surveying work granted a land surveyor will review and stamp the work?

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