DEPTH CONTROL AND SWEEPING DEPTH STABILITY OF THE MIDW TRAWL
중층트롤의 깊이바꿈과 소해심도의 안정성
중층트를 어구(漁具)의 소해심도(掃海深度)를 일정(一定)한 적정어획속도(適正漁獲速度)에서 기동성(機動性)있게 변화(變化)시키기 위하여 기초적인 모형어구(模型漁具)의 수조실험(水槽實驗)과 특별(特別)히 고안한 깊이바꿈틀을 이용(利用)한 이차(二次)에 걸친 해상시험(海上試驗)을 통(通)하여 연구한 결과를 요약(要約)하면 다음과 같다. 1. 중층(中層)트롤의 그물어구의 깊이 y는 끌줄의 길이 L과 단위(單位) 길이의 끌줄, 깊이바꿈틀 및 그물의 각(各) 수중중량(水中重量) $W_r,\;W_o,\;W_n$과 각(各) 항력(抗力) $R_r,\;R_o,\;R_n$ 사이의 관계(關係)는 차원해석법(次元解析法)에 의하면 다음과 같다. $$y=kLf(\frac{W_r}{R_r},\;\frac{W_o}{R_o},\;\frac{W_n}{R_n})$$ 단(但), k는 상수(常數)이고 f는 함수이다. 2. 단위 길이당(當)의 수중중량(水中重量) $W_r$, 길이 L인 끌줄 끝에 항력(抗力) $D_n$, 수중중량(水中重量) $W_n$d인 수중저항분를 매달고 끌줄의 다른 한 끝을 수면(水面)에서 예인(曳引)할 때,. 끌줄의 형상(形狀)을 현수곡선이라고 보면, 수중저항분의 깊이 y는 다음과 같다. $$y=\frac{1}{W_r}\{\sqrt{{D_n^2}+{(W_n+W_rL)^2}}-\sqrt{{D_n^2+W_n}^2\}$$ 3. 중층(中層)트롤의 그물어구(漁具)깊이의 변화(變化) ${\Delta}y$는 예강(曳綱)의 길이 L을 바꾸거나 추(錘) ${\Delta}W_n$를 부가(附加)하면 다음과 같다. $${\Delta}y{\approx}\frac{W_n+W_{r}L}{\sqrt{D_n^2+(W_n+W_{r}L)^2}}{\Delta}L$$ $${\Delta}y{\approx}\frac{1}{W_r}\{\frac{W_n+W_rL}{\sqrt{D_n^2+(W_n+W_{r}L)^2}}-{\frac{W_n}{\sqrt{D_n^2+W_n^2}}\}{\Delta}W_n$$ 단(但), $D_n$은 그물어구의 항력(抗力)이다. 4. 끌줄 상(上)의 중간점(中間点)에 추(錘) $W_s$를 부가(附加)할 때 중층(中層)트롤 그물어구의 깊이바꿈 ${\Delta}y$는 $${\Delta}y=\frac{1}{W_r}\{(T_{ur}'-T_{ur})-T_u'-T_u)\}$$ 단(但) $$T_{ur}^l=\sqrt{T_u^2+(W_s+W_{r}L)^2+2T_u(W_s+W_{r}L)sin{\theta}_u$$ $$T_{ur}=\sqrt{T_u^2+(W_{r}L)^2+2T_uW_{r}L\;sin{\theta}_u$$ $$T_{u}'=\sqrt{T_u^2+W_s^2+2T_uW_{s}\;sin{\theta}_u$$ $T_u$ 추(錘)를 부가(附加)하지 않았을 때 끌줄 상(上)의 중간점(中間点)에 있어서의 예인어선(曳引漁船) 쪽을 향하는 장력(張力)이고, ${\theta}_u$는 장력(張力) $T_u$와 수평방향(水平方向)과 이루는 각도(角度)이다. 5. 어떠한 형태(形態)의 저예강용(底曳綱用) 전개판(展開板)도 성능(性能)에 있서어 차이는 있으나 전중량(全重量)을 가볍게 하고 저변(底邊)에 무게를 달아 안정(安定)시키면 중층예강용(中層曳綱用)으로 사용(使用)할 수 있다는 것이 모형(模型) 실험(實驗)결과 밝혀졌다. 6. 모형(模型) 그물(Fig.6)의 수조실험(水槽實驗)에서는 예강속도(曳綱速度) v m/sec, 강고(綱高) H cm 및 수유저항(水流抵抗) R kg 사이에는 다음과 같은 간단(簡單)한 관계식(關係式)이 성립(成立)한다. $$H=8+\frac{10}{0.4+v}$$$R=3+9v^2$$ 7. 특별(特別)히 고안한 십자(十字)날개형(型) 깊이바꿈틀과 H날개형(型) 깊이 바꿈틀을 비교(比較)한 결과(結果) 전자(前者)보다 안정성(安定性)이 우월하였다. 8. 그물어구(漁具)의 유수저항(流水抵抗)이 매우 크며 또 거의가 항력(抗力)으로 볼 수 있으므로 깊이바꿈틀의 종류에 관계없이 그물어구의 소해심도(掃海深度)는 대단히 안정(安定)된 상태를 유지하였다. 9. H날개형(型) 깊이바꿈틀의 수평(水平)날개 면적율 $1.2{\times}2.4m^2$로 하였을 때 유수저항(流水抵抗) 2 ton의 그물 어구를 2.3kts로 예인(曳引)하면서 영각(迎角)을 $0^{\circ}{\sim}30^{\circ}$로 변화(變化)시킨 결과(結果), 끌줄의 길이에 관계없이 약(約) 20m의 깊이바꿈을 얻을 수 있었다.
For regulating the depth of midwater trawl nets towed at the optimum constant speed, the changes in the shape of warps caused by adding a weight on an arbitrary point of the warp of catenary shape is studied. The shape of a warp may be approximated by a catenary. The resultant inferences under this assumption were experimented. Accordingly feasibilities for the application of the result of this study to the midwater trawl nets were also discussed. A series of experiments for basic midwater trawl gear models in water tank and a couple of experiments of a commercial scale gears at sea which involve the properly designed depth control devices having a variable attitude horizontal wing were carried out. The results are summarized as follows: 1. According to the dimension analysis the depth y of a midwater trawl net is introduced by $$y=kLf(\frac{W_r}{R_r},\;\frac{W_o}{R_o},\;\frac{W_n}{R_n})$$) where k is a constant, L the warp length, f the function, and $W_r,\;W_o$ and $W_n$ the apparent weights of warp, otter board and the net, respectively, 2. When a boat is towing a body of apparent weight $W_n$ and its drag $D_n$ by means of a warp whose length L and apparent weight $W_r$ per unit length, the depth y of the body is given by the following equation, provided that the shape of a warp is a catenary and drag of the warp is neglected in comparison with the drag of the body: $$y=\frac{1}{W_r}\{\sqrt{{D_n^2}+{(W_n+W_rL)^2}}-\sqrt{{D_n^2+W_n}^2\}$$ 3. The changes ${\Delta}y$ of the depth of the midwater trawl net caused by changing the warp length or adding a weight ${\Delta}W_n$_n to the net, are given by the following equations: $${\Delta}y{\approx}\frac{W_n+W_{r}L}{\sqrt{D_n^2+(W_n+W_{r}L)^2}}{\Delta}L$$ $${\Delta}y{\approx}\frac{1}{W_r}\{\frac{W_n+W_rL}{\sqrt{D_n^2+(W_n+W_{r}L)^2}}-{\frac{W_n}{\sqrt{D_n^2+W_n^2}}\}{\Delta}W_n$$ 4. A change ${\Delta}y$ of the depth of the midwater trawl net by adding a weight $W_s$ to an arbitrary point of the warp takes an equation of the form $${\Delta}y=\frac{1}{W_r}\{(T_{ur}'-T_{ur})-T_u'-T_u)\}$$ Where $$T_{ur}^l=\sqrt{T_u^2+(W_s+W_{r}L)^2+2T_u(W_s+W_{r}L)sin{\theta}_u$$ $$T_{ur}=\sqrt{T_u^2+(W_{r}L)^2+2T_uW_{r}L\;sin{\theta}_u$$ $$T_{u}^l=\sqrt{T_u^2+W_s^2+2T_uW_{s}\;sin{\theta}_u$$ and $T_u$ represents the tension at the point on the warp, ${\theta}_u$ the angle between the direction of $T_u$ and horizontal axis, $T_u^2$ the tension at that point when a weights $W_s$ adds to the point where $T_u$ is acted on. 5. If otter boards were constructed lighter and adequate weights were added at their bottom to stabilize them, even they were the same shapes as those of bottom trawls, they were definitely applicable to the midwater trawl gears as the result of the experiments. 6. As the results of water tank tests the relationship between net height of H cm velocity of v m/sec, and that between hydrodynamic resistance of R kg and the velocity of a model net as shown in figure 6 are respectively given by $$H=8+\frac{10}{0.4+v}$$ $$R=3+9v^2$$ 7. It was found that the cross-wing type depth control devices were more stable in operation than that of the H-wing type as the results of the experiments at sea. 8. The hydrodynamic resistance of the net gear in midwater trawling is so large, and regarded as nearly the drag, that sweeping depth of the gear was very stable in spite of types of the depth control devices. 9. An area of the horizontal wing of the H-wing type depth control device was $1.2{\times}2.4m^2$. A midwater trawl net of 2 ton hydrodynamic resistance was connected to the devices and towed with the velocity of 2.3 kts. Under these conditions the depth change of about 20m of the trawl net was obtained by contro..