BPELSG's 3 Sample CBT Exam Questions (Survey)

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Don't make me relive those days of punching numbers furiously... :D

I got A, B, B... 

 
The total volume of exacavation is from sta 0+00 to sta 3+15. Not from sta 1+00 to sta 3+15. Very tricky like the exam. Nice one.

 
I got A, B, B as well. Curious as to how you got C for problem 1, @ptatohed.
Ok, correct me if I am wrong. 

You have three 2D sections, right?  One at 1+00, one at 2+00, and one at 3+15.  H@1+00 = 6', H@2+00 = 7', and H@3+15 = 10'.  The areas are as follows: A@1+00 = 102 SF, A@2+00 = 133 SF, and A@3+15 = 250 SF.  Thus, V = (100)((102+133)/2) + (115)((133+250)/2) = 33,772.5 CF = 1250.83 CY = answer C. 

Thoughts?

 
Ptatohed disregard my comment at sta 0+00. I have the same answer A as Maji and leggo at first attempt. Then I asked myself why ptatohed have different answer at C. Second attempt I included area and volume at station 0+00 and 1+00.  But I know why where the error in calculations. Maji, leggo and me used the trapaziod area formula, which is wrong approach. 

 
I agree with ptatohed's answer and don't see how Irap is coming up with volume at station 0+00. There is no information to indicate if flow line is flush at 0+00 or if it is below the existing grade like the other stations.  Additionally, if you are going to go back 100 feet to station 0+00, whats stopping us from also looking forward to predict station 4+00 or maybe even 10+00.

 
Very tricky as usual... ptatohed is correct... I used 1+00, 2+00 and 3+00 instead of 3+15 for the last one. Great question!!

 
Very tricky as usual... ptatohed is correct... I used 1+00, 2+00 and 3+00 instead of 3+15 for the last one. Great question!!
I did the same. Even when I first read the problem and made a note of it being sta 3+15, not 3+00. Punched it into my calculator incorrectly. That's what you get for not checking your work!

 
I approached this problem wrong, sorry guys. Its understandable now. I need to review more. ?

 
I approached this problem wrong, sorry guys. Its understandable now. I need to review more. ?
No problem, that's why I posted it.  For practice, discussion, and learning.  And I think all three happened.  :)   To be totally honest, I had A, B, B the first time I did the problems and I even had it typed out in Post #1.  Right before I hit 'Submit', I thought to myself, let me check one more time as it might be a little embarrassing as the thread starter to have wrong answers.  That's when I saw my mistake and changed it to C, B, B.  :)  

 
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No problem, that's why I posted it.  For practice, discussion, and learning.  And I think all three happened.  :)   To be totally honest, I had A, B, B the first time I did the problems and I even had it typed out in Post #1.  Right before I hit 'Submit', I thought to myself, let me check one more time as it might be a little embarrassing as the thread starter to have wrong answers.  That's when I saw my mistake and changed it to C, B, B.  :)  
Goes to show how carefully one needs to approach the exam problems... the "A" answer is a "distractor"... something that many will choose because making a common mistake... 

 
What I thought was interesting is these sample questions don't word their question to include "most nearly" as do NCEES questions.  I thought the state exams used "most nearly" too but I guess not. 

 
I got C, A, B ... i'm sorry but problem #2, i keep getting 1:400 answer which is 'A' ... how did you all get answer 'B' ..

I used this formula, Scale Factor = reproduced scale / original scale ; 5 = (1/x) / (1/2000) ; x = 400  

maybe you can help me Mr. @ptatohed. Appreciate your help.

 
I got C, A, B ... i'm sorry but problem #2, i keep getting 1:400 answer which is 'A' ... how did you all get answer 'B' ..

I used this formula, Scale Factor = reproduced scale / original scale ; 5 = (1/x) / (1/2000) ; x = 400  

maybe you can help me Mr. @ptatohed. Appreciate your help.
AH, thanks for working these problems.  For #2, the current scale is 1" = 2,000'.  Or 1" = 24,000".  Or 1:24,000.  Or 1/24,000.  Right?

They ask you to enlarge the scale.  This means the scale will be closer to 1:1.  So you'll divide the 24000 by 5.  1:(24000/5) -->  1:4800.

I think you are using the correct formula, you just forgot to convert the 2,000 feet to inches so the units on each side are the same.  Basically take your answer of x = 400 and multiply it by 12. 

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

 
AH, thanks for working these problems.  For #2, the current scale is 1" = 2,000'.  Or 1" = 24,000".  Or 1:24,000.  Or 1/24,000.  Right?

They ask you to enlarge the scale.  This means the scale will be closer to 1:1.  So you'll divide the 24000 by 5.  1:(24000/5) -->  1:4800.

I think you are using the correct formula, you just forgot to convert the 2,000 feet to inches so the units on each side are the same.  Basically take your answer of x = 400 and multiply it by 12. 
Thanks for your prompt reply. This map factor should be easy but i keep getting confused with converting. You are right. I thought 1:2000 is the same as 1" = 2000' which differ my answer. Now i got 'B' :D

Appreciate for your help. 

 

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