Patent Grant
11504730
The present application is a 371 U.S. National Stage of International Application No. PCT/CN2016/106706, filed Nov. 22, 2016, which claims the benefit of the earlier filing date of Chinese Patent Application No. 201610940904.1 filed on Nov. 1, 2016, which are each incorporated herein by reference in their entirety.
The present invention relates to a method for calculating performance parameters of a translational sprinkler in the technical field of agricultural irrigation, particularly to a method for calculating instantaneous sprinkling intensity.
A translational sprinkler is a kind of typical sprinkling irrigation equipment, and is widely applied in agricultural water-saving irrigation in China. The movement speed of a translational sprinkler has a direct influence on the volume of sprinkled water in unit area; specifically, the lower the movement speed is, the greater the volume of sprinkled water in unit area is; in contrast, the higher the movement speed is, the smaller the volume of sprinkled water in unit area is. Therefore, the movement speed control strategy of a translational sprinkler is key to ensure effective operation of the translational sprinkler.
When a translational sprinkler is applied to irrigation of farmland, the relationship between instantaneous sprinkling intensity of the translational sprinkler and soil infiltration capacity of farmland is a key factor in determining whether runoff is generated. At present, there is no effective method for calculating instantaneous sprinkling intensity of a translational sprinkler yet. Consequently, if surface runoff occurs when a translational sprinkler is applied to irrigation of farmland in some special circumstances, it is impossible to directly analyze whether the surface runoff is caused by mismatch between soil infiltration capacity of farmland and instantaneous sprinkling intensity of translational sprinkler unit, so that it is impossible to specifically solve such research problems. Therefore, it is of great theoretical and practical significance to develop a method for calculating instantaneous sprinkling intensity.
The technical problem to be solved by the present invention is to provide a method for calculating instantaneous sprinkling intensity, in order to overcome the lack of understanding and mastery of the relationship between soil infiltration capacity of farmland and instantaneous sprinkling intensity of translational sprinkler when studying the problem of the movement speed control strategy of the translational sprinkler, and to specifically solve such problems.
To attain the above-mentioned object, the present invention provides a method for calculating instantaneous sprinkling intensity, which comprises the following steps:
(a) placing rain gauges in number of b with water-receiving opening in diameter D at a distance of a meters from a translational sprinkler, to measure the volume of water sprinkled from the translational sprinkler;
(b) setting an operating pressure of the translational sprinkler, maintaining the translational sprinkler in a stable operating state, setting a movement speed s of the translational sprinkler, moving the translational sprinkler till the rain gauges cannot receive water sprinkled from the translational sprinkler, and then stopping the translational sprinkler; measuring the volume of sprinkled water ci (i=1, . . . , b) received in each rain gauge, repeating the test for n times at the same movement speed, and calculating the average volume of sprinkled water di=ci/n (i=1, . . . , b) received in each rain gauge;
(c) calculating the movement time t=2R/s during which the volume of water sprinkled from the translational sprinkler is received in the rain gauges; calculating the average volume of sprinkled water V=Σi=1bdi/b received in the rain gauges; calculating the average depth V=Σi=1bdi/b of sprinkled water received in the rain gauges;
(d) assuming a distribution shape of the volume of water sprinkled from the translational sprinkler, and establishing a functional relationship ht=kf(t) between instantaneous sprinkling intensity ht and the movement time t according to the mathematical characteristics of the assumed shape, where, k is a general term of all variables in the analytic expression f(t), and f(t) is an analytic expression of the independent variable t; calculating the variable k in the functional relationship ht=kf(t) from the value of the movement time t and the value of the average depth H of sprinkled water which are calculated in the step (c), according to the mathematical characteristics of the assumed shape; and
(e) substituting the specific numerical value of instantaneous movement time t of the translational sprinkler into the functional relationship ht=kf(t) established in the step (d) to obtain the value of ht, which is the numerical value of the instantaneous sprinkling intensity of the translational sprinkler.
Furthermore, the assumed distribution shape of the volume of water sprinkled from the translational sprinkler (1) is an elliptical shape, a triangular shape, or a parabolic shape.
Furthermore, the volume of sprinkled water ci (i=1, . . . , b) received in each rain gauge (3) is measured after the translational sprinkler (1) operates stably for 10 min.
Furthermore, the distance of a meters between the rain gauge (3) and the translational sprinkler (1) is greater than the sprinkling range R of a sprayer on the translational sprinkler (1).
Furthermore, the number b of the rain gauges is greater than or equal to 1.
Furthermore, the number n of repetition times of the test is greater than or equal to 1.
The method for calculating instantaneous sprinkling intensity provided in the present invention is simple and quick to operate, and can obtain an accurate calculation result at a lower experiment cost, thereby providing a direction and basis for subsequent study on optimization of the movement speed of a translational sprinkler.
In the FIGURE:
1. translational sprinkler; 2—sprayer; 3—rain gauges
Hereunder the present invention will be further detailed with reference to the drawings and embodiments, but the protection scope of the present invention is not limited thereto.
As shown in
The movement speed s of the translational sprinkler 1 is set to 2.5 m/min., and the translational sprinkler 1 is moved till the rain gauges 3 cannot receive the volume of water ci (i=1, . . . , 6) sprinkled from the translational sprinkler 1, and then the translational sprinkler 1 is stopped. The volume of sprinkled water received in each rain gauge 3 is measured, the test is repeated for n times (3 times in this embodiment) at the same movement speed, and the average volume of sprinkled water di=ci/n (i=1, . . . , b) received in each rain gauge is calculated, as shown in Table 1.
The movement time during which the volume of water sprinkled from the translational sprinkler 1 is received in the rain gauge 3 is calculated as follows:
t=2R/s=2×3.5/2.5=2.8 min.
The average volume of sprinkled water received in the rain gauges is calculated as follows:
V=Σi=16di/b=(74.3+61.7+67.3+47.7+66.7+55.7+64.0+64.7+65.3)1/9=63.0 mL.
The average depth of sprinkled water received in each rain gauge is calculated as follows:
H=4V/πD2=4×63.0/(3.14×(0.2×100)2)=0.20 mm.
The distribution shape of the volume of water sprinkled from the translational sprinkler 1 is assumed as an elliptical shape, a functional relationship
between instantaneous sprinkling intensity ht and movement time t is established according to the mathematical characteristics of the assumed shape, where, the mathematical meaning of m is the longitudinal semi-axis of the assumed ellipse and the physical meaning thereof is the maximum instantaneous sprinkling intensity, the mathematical meaning of n is the transverse semi-axis of the assumed ellipse and the physical meaning thereof is half of the total movement time.
According to the calculated time t=2.8 min., it is ascertained that n in the functional relationship is 1.4 min.; according to the average depth of sprinkled water H=0.2 mm obtained through calculation, the area of the upper half of the ellipse in the functional relationship is H=½πmn, i.e., 0.2=½×3.14×m×1.4; then, it can be calculated: m=0.091 mm/min=5.46 mm/h. Thus, the functional equation of the ellipse is
Next, the specific numerical values of instantaneous movement time t of the translational sprinkler, for example t=1 min, 1.5 min, and 2 min, are substituted into the established functional relationship
to obtain the values of instantaneous sprinkling intensity ht of the translational sprinkler 1, which are 5.23 mm/h, 5.45 mm/h, and 4.93 mm/h respectively.
Although the embodiment described above is a preferred embodiment of the present invention, the present invention is not limited to the above embodiment. Any obvious improvement, replacement, or variation that can be made by the person skilled in the art without departing from the spirit of the present invention shall be deemed as falling in the protection scope of the present invention.
| Number | Date | Country | Kind |
|---|---|---|---|
| 201610940904.1 | Nov 2016 | CN | national |
| Filing Document | Filing Date | Country | Kind |
|---|---|---|---|
| PCT/CN2016/106706 | 11/22/2016 | WO |
| Publishing Document | Publishing Date | Country | Kind |
|---|---|---|---|
| WO2018/082129 | 5/11/2018 | WO | A |
| Number | Name | Date | Kind |
|---|---|---|---|
| 8285421 | Vander Griend | Oct 2012 | B2 |
| 8311786 | Kisch | Nov 2012 | B2 |
| 10058879 | Needham | Aug 2018 | B2 |
| 20190104696 | Fischman | Apr 2019 | A1 |
| Number | Date | Country |
|---|---|---|
| 101226107 | Jul 2008 | CN |
| 105160096 | Dec 2015 | CN |
| 1644818 | Apr 1991 | SU |
| Entry |
|---|
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| Ge et al., “Application of different curve interpolation and fitting methods in water distribution calculation of mobile sprinkler machine”, Aug. 2018, Elsevier Ltd., pp. 316-328. (Year: 2018). |
| Li et al., “Development and validation of a modified model to simulate the sprinkler water distribution”, Dec. 2014, Elsevier Ltd., pp. 38-47. (Year: 2014). |
| Jing-Hong Wan et al., “Translocating Speed Ration Effect on Water Distribution Uniformity of Lightweight Lateral Move Irrigation System”, Water Saving Irrigation, pp. 87-93, Sep. 2016. |
| Li, Jinchang, “Method for Calculating Irrigation Intensity of Clockwise Irrigation Machine”, Irrigation Technology, No. 2, Dec. 31, 1984, ISSN: 1001-4780, pp. 25-30. (See International Search Report for PCT/CN2016/106706 for relevance). |
| Hartmann, H., “The Measurement of Instantaneous Irrigation Intensity of Rotating Sprinkler”, Irrigation and Drainage, 12(1), Dec. 31, 1993, ISSN: 1000-646X, pp. 49-51. (See International Search Report for PCT/CN2016/106706 for relevance). |
| International Search Report for PCT/CN2016/106706, dated Jul. 28, 2017, three pages. |
| Number | Date | Country | |
|---|---|---|---|
| 20200047205 A1 | Feb 2020 | US |
