Eg:
Following are the different contours at 2m. intervals in a pond up to a water level with their respective areas.
|
Sl. No. |
Contour |
Area in m² |
|
1 |
550 |
775 |
|
2 |
552 |
920 |
|
3 |
554 |
1145 |
|
4 |
556 |
1565 |
|
5 |
558 |
1980 |
|
6 |
560 |
2650 |
|
7 |
562 |
3425 |
Calculate the volume of water in the pond.
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To find:
The volume of water in the pond.
Calculation:
The volume of water is calculated by using the trapezoidal & prismoidal formulas for contour maps. The answer will be nearer to accuracy & slightly differ from each other.
Now, let us calculate the volume of water by using both of them to observe the difference.
1. Trapezoidal formula:
The volume of water in the pond
V = D х [{(A0 + An) ➗2} + (A1 + A2 + A3 + ---- + An - 1)]
Here,
D = Interval between the successive contours
D = {562 - 560} = 2
A0 = area of 1st contour line = 775m²
A1 = area of 2nd contour line = 920m²
Similarly,
A2 = 1145m², A3= 1565m², A4 = 1980m²,
An 👉 The area of the last contour = A6 =3425m²
(An - 1) 👉 Prior to last contour = A5 = 2650m²
Now,
The volume of water in a pond
V = D х [{(A0 + A6) ➗2} + {A1 + A2 + A3 + A4 + A5}]
= 2 х [{(775 + 3425) ➗2} + {920 + 1145 + 1565 + 1980 + 2650}]
= 2 х [{2100} + {8260}]
= 2 х [10,360]
V = 20,720m³
2. Prismoidal formula:
The volume of water in the pond
V = D/3 [ 1st area + last area + 4 Σ even area + 2 Σ odd area ]
V = [ (D ➗ 3) х { (A0 + An) + 4 х ( A1 + A3 + A5 ) + 2 х ( A2 + A4)}]
= [ (2 ➗ 3) х { (775 + 3425) + 4 х ( 920 + 1565 + 2650 ) + 2 х ( 1145 + 1980)}]
= [0.6667 х { ( 4200 ) + 4 х ( 5135 ) + 2 х ( 3125)}]
= [0.6667 х { 4200 + 20540 + 6250 }]
= [0.6667 х 30,990 ]
V = 20, 660 m³
To understand A to Z of surveying, click here.
Thank you for going through these calculation steps❤. Have a good day 😄.
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