SOVIET ATOMIC ENERGY - VOL. 34, NO. 6

? Declassified and Approved For Release 2013/09/15: CIA-RDP10-02196R000400010006-4 Russian Original Vol. 34, No. 6, June, 1973 December, 1973 SATEAZ 34(6) 531-612 (1973) SOVIET ATOMIC ENERGY ATOMHAH 3HEPikla (ATOMNAYA il4MIGIYA) TRANSLATED FROM RUSSIAN CONSULTANTS BUREAU, NEW YORK Declassified and Approved For Release 2013/09/15: CIA-RDP10-02196R000400010006-4 N.. '? Declassified and Approved For Release 2013/09/15: CIA-RDP10-02196R000400010006-4 SOVIET ATOMIC ENERGY ? ? Soviet Atomic Energy is a cover-to-cover translation of Atomnaya Energiya:a pUblication of the Academy of Sciences of the USSR. r An arrangemeni with. Mzhdunarodnaya Kniga, the SOviet book, _ export agency, makes available both advance cdpies of the Rus- sian journal and original glossy photographs and artwork. This serves to decrease the necessary time leg between publication of the original and Oublication of the trensietion and helps to im- pr&e the quality of the latter. The translation began with the firSt issue of the Russian journal. Editorial Board of Atomnaya Energiya: Editor: M.,D.,Millionshchikov Deputy Director , I. V. Kurchatov institute of Atomic Energy ? ' Academy of Sciences of the USSR" Moscow, USSR Associate,Editors: N. A. Kolotiortsov N: Viasov A. A. Bochvar N. A. Dollezhal' Fursov I. N. Golovin V: F. Kalinin A. K. Krasin A. I. Leipunskii - A. P. Zefirov r ? V. V. Matveev M. G. Meshcheryakov P. N. Palei V. B. Shevchenko D. L. Simonenko V. I. Smirnov A. P. Vinogradov , ? CopyrightC1973 Consultants I3ureau, New York, a division of Plenum Publishing Corporation, 227 West 17th Street, New York, N.Y. 10611. All rights reserved. No article contained herein may be Yeproduced for any purpose whatsoever without permission of the publishers. Consultants Bureau journals appear aboueslx months after the publication of the original Russian issue. For bibliographic accuracy, the English issue published by Consultants Bureau carries the same nu,rnber and date as the original Russian from whiCh it was translated. For example, a Russian issue published in Decem- ber will, appear in a Consultants Bureau English, translation 'about the following June, but the translation issue will carry the December date. When orderind any volume ,or particular issue of a Consultants Bureau journal, please specify the date and, where applicable, the volume and issue numbers of the original Russian. The material you will receive will be a translation of that Russian volume or Issue. Subscription $80 per volume (6 Issues) Single Issue: $30 2 volumes per year S,ingle Article: $15. (Add $S for orders outside the United States and Canada.) CONSULTANTS BUREAU, NXIN YORK AND LONDON Davis+louse 227 West 17th Street 8 Scrubs Lane .? New York; New York 10011 Harlesden, NW10 6SE England Published monthly. Second-class. postage Paid at Jamaica, New York 11431. Declassified and Approved For Release 2013/09/15: dIA-RDP10-02196R000400010006-4 Declassified and Approved For Release 2013/09/15: CIA-RDP10-02196R000400010006-4 SOVIET ATOMIC ENERGY A translation of Atomnaya Energiya December, 1973 Volume 34, Number 6 June, 1973 CONTENTS Engl./Russ. Academician Mikhail Dmitrievich Millionschikov 531 426 ARTICLES On Choosing Methods of Cutting Metals in the Repair of Reactors ? Yu. F. Yurchenko, V. F. Murav'ev, B. A. Pyatunin, and B. G. Malyavin 532 427 Some Problems in the Operational Safety of Atomic Power Stations using Gas-Cooled Fast Reactors with a Dissociating Coolant ? G. A. Sharovarov 540 435 Choosing Absorbing-Rod Efficiency for Shielding Against Excessive Power Levels ? A. A. Sarkisov, V. N. Puchkov, and B. A. Melinikov 545 441 Neutron Transport Equation Suitable for Obtaining Approximate Thermalization Equations ? N. I. Laletin 549 445 Effect of Scattering Anisotropy on the Thermal-Neutron Use Factor ? N. I. Laletin, N. V. Sultanov, Yu. A. Vlasov, and S. I. Konyaev 555 450 Genesis of Radiogenic Lead Halos in Precambrian Uranium Deposits ? A. V. Tarkhanov and V. I. Zhykova 561 455 Determination of Stable Neon Isotopes in Radioactive Minerals and Natural Cases ? Yu. A. Shukolyukov, G. Sh. Ashkinadze, and V. B. Sharif-Zade 566 461 Lossless Particle Capture in RF-Acceleration Mode in Proton Synchrotron ? E. A. Myae and P. T. Pashkov 570 465 The REP-5 Heavy-Current Relativistic-Electron Pulse Accelerator, with a Beam Current of About 50 kA ? G. R. Zablotskaya, B. A. Ivanov, S. A. Kolyubakin, A. S. Perlin, V. A. Rodichkin, and V. B. Shapiro 577 471 ABSTRACTS Numerical Solution of the Problem of Optimization of a Heterogeneous Reactor by Means of Blocked, Burnup Absorbers ? A. V. Voronkov and V. A. Chuyanov 580 475 Analysis of a Pulsed Neutron Experiment by the Moments Method ? D. A. Pankratenko 581 475 An Instrumental-Activation Method for the Determination of Mo, Al, Ca, Mn, Cl, Na, and K in Soil and Plant Samples ? R. Rustamov, Sh. Khatamov, I. I. Orestova, and A. A. Kist 582 476 Optimal Placement of a Specimen in Relation to a Detector ? A. N. Silantiev and I. G. Shkuratova 583 477 LETTERS TO THE EDITOR Utilization of Metallic Uranium in Power Channel Uranium?Graphite Reactors ? A. D. Zhirnov, A. P. Sirotkin, S. V. Bryunin, V. I. Pushkarev, and V. I. Runin 584 479 Stability "In the Large" of a Stationary Regime of a Heterogeneous Nuclear Reactor ? V. V. Mikishev and Yu. F. Trunin 587 481 Nuclear-Radiation Detectors Based on High-Purity Germanium ? V. P. Aver tyanova, M. I. Ginzburg, N. B. Strokan, V. P. Subashieva, and N. I. Tisnek 591 483 Declassified and Approved For Release 2013/09/15: CIA-RDP10-02196R000400010006-4 Declassified and Approved For Release 2013/09/15: CIA-RDP10-02196R000400010006-4 CONTENTS Determination of Oil?Water Interface Using a 6-8 MeV Electron Beam ? M. M. Dorosh, A. M. Parlag, V. A. Shkoda-U11yanov, I. I. Danilich, V. M. Mazur, and A. Yu. Urgin Penetration of Fast Neutrons Through an Axisymmetric Shield ? A. N. Kozhevnikov, V. A. Khodakov, and A. V. Khrustalev Energy Balance of Nuclear-Fission Reactions (dt) in the Beam?Target System (continued) Engl./Russ. 594 485 597 487 ? R. A. Demirkhanov, Yu. V. Kursanov, and L. P. Skripal' 600 490 Average Yield of Prompt Neutrons V in the Fission of U233 by Neutrons with Energies from Oto 1.4 MeV ? B. Nurpeisov, V. G. Nesterov, L. I. Prokhorova, and G. N. Smirenkin 603 ? 491 INFORMATION: CONFERENCES AND MEETINGS The Thirty-Third Session of the OIYaI Academic Council ? V. A. Biryukov 605 495 ANNIVERSARIES Twenty-Fifth Anniversary of the First Soviet Synchrotron ? B. S. Ratner 610 498 The Russian press date (podpisano k pechati) of this issue was 5/28/1973. Publication therefore did not occur prior to this date, but must be assumed to have taken place reasonably soon thereafter. Declassified and Approved For Release 2013/09/15: CIA-RDP10-02196R000400010006-4 Declassified and Approved For Release 2013/09/15: CIA-RDP10-02196R000400010006-4 ACADEMICIAN MIKHAIL DMITRIEVICH MILLIONSCHIKOV The editorial board and staff of nAtomnaya Energiyan express our deep sorrow on the occasion of the death of this journal's Editor-in-Chief, Academician Mikhail Dmitrievich Millionschikov, an outstanding Soviet scientist, the Chairman of the Supreme Soviet of the Russian Soviet Federated Socialist Republic, the Vice-President of the Academy of Sciences of the USSR, Deputy Director of the I. V. Kurchatov Insti- tute of Atomic Energy, Hero of Socialist Labor, and laureate of the Lenin and State prizes of the USSR, who died on the 27th of May, 1973, at the age of 61. We share the bitter loss of the relatives, friends, and colleagues of the deceased. Translated from Atomnaya Energiya, Vol. 34, No. 6, p. 426, June, 1973. 1973 Consultants Bureau, a division of Plenum Publishing Corporation, 227 West 17th Street, New York, N. Y. 10011. All rights reserved. This article cannot be reproduced for any purpose whatsoever without permission of the publisher. A copy of this article is available from the publisher for $15.00. 531 Declassified and Approved For Release 2013/09/15: CIA-RDP10-02196R000400010006-4 Declassified and Approved For Release 2013/09/15: CIA-RDP10-02196R000400010006-4 ARTICLES ON CHOOSING METHODS OF CUTTING METALS IN THE REPAIR OF REACTORS Yu. F. Yurchenko, V. F. Murav'ev, UDC 621.039.5/68:004.6 B. A. Pyatunin, and B. G. Malyavin All conceivable reactor repair situations have not as yet been studied in sufficient detail; however, it is reasonable to assume that the experience which has been gained all over the world in the use of nuclear power stations will shortly enable mechanisms for the execution of preventive maintenance and emergency repairs to be incorporated in standard reactor repair equipment. Problems of this kind are even now facing the designer. The majority of repair works involve cutting operations and the removal of the reactor construction elements which are to be replaced. This requires special mechanisms developed for particular repair con- ditions. The levels of radiation in the repair zones are usually so high that no repair crews can work there. Sometimes special measures may be taken to reduce the level of radiation in the repair zones. For ex- ample, filling the vessel of a discharged water-cooled, water-moderated reactor with water after several years use enables repair work to be carried our fairly safely using special remote-control mechanisms in- side the vessel. It is therefore of particular interest to discover and develop such effective methods of cutting metals as will enable reliable remote-control mechanisms to be created, capable of working both in air and under a layer of water. For separative cutting in the dismantling of reactor construction elements requiring replacement, mechanical and gas?electric (plasma) methods of cutting are usually employed. The mechanical cutting of construction materials is executed with special remote-controlled machinery. The machines are most frequently designed for one particular operation and are very complicated in design and manufacture. Me- chanical cutting involves a great deal of mechanical pressure between the tool and the part being cut. This means that the framework of the mechanism has to be rigid, and the whole thus becomes much heavier. The tool in such mechanisms also has to have at least two motione (to and fro), complicating the kinematics of the machine. The use of gas?electric cutting is limited by the thickness of the metal being cut, the dimensional circumstances in the repair zone, and also the complexity of the technology of repair work under water. Existing equipment allows steel up to 60 mm thick to be cut under water. Thicker metal can only be cut if there is space for the plasma jet to pass right through. As the result of a continuing search for other methods of cutting metals, free from the disadvantages associated with those just indicated, it was found that the electrical-contact method of cutting was the one most suitable under the specific conditions of reactor repair. This method involves very little pressure between the tool and the part being cut, it enables various cutting operations to be carried out with the tool simply moving forward in the feed direction, the cutting process is stable in both air and water, simple and inexpensive equipment may be used, and there is a low specific consumption of electrical power (1-4 kW ? h/kg). In order to compare mechanical drilling with the plasma and electrical-contact cutting of metals, Table 1 presents some characteristics of the corresponding equipment for driving holes 120 mm in diameter in stainless steel plates 130 mm thick under a layer of water. The thickness of the platewas chosen from a consideration of the maximum resistance of a circular drill under optimum boring conditions. Translated from Atomnaya Energiya, Vol. 34, No. 6, pp. 427-434, June, 1973. Original article submitted February 1, 1972. 532 Co 1973 Consultants Bureau, a division of Plenum Publishing Corporation, 227 West 17th Street, New York, N. Y. 10011. All rights reserved. This article cannot be reproduced for any purpose whatsoever without permtss ion of the publisher. A copy of this article is available from the publisher for $15.00. Declassified and Approved For Release 2013/09/15: CIA-RDP10-02196R000400010006-4 Declassified and Approved For Release 2013/09/15: CIA-RDP10-02196R000400010006-4 TABLE 1. Some Characteristics of Equipment for Driving Holes in a Steel Plate by Various Methods Form of cutting Thickness of plate, mm Form of tool Cost of tool, roubles Cutting time, min Cutting force, kg Weight of equip- ment (without supply source), kg Cost of equip- ment, roubles Drilling Plasma cutting Electrical-contact cuttirm 130 55 130 Circular drill ( 0 130 mm, length of work- ing part 200 mm) Plasma bumer Circular electrode 416 50 2,5 55 2,5 16 Axial 1500, cir- cumferential 350 ? Up to 5 3100 45 20 3800 6800 1200 Fig. 1. Section of an objectwith a complex cross section after cutting with a disc elec- trode, the cutting zone being intensively water-cooled. Arrangements for the Electrical-Contact Cutting of Metals This method involves the removal of metal from the part being cut by virtue of the thermal action of powerful transient arc discharges on its constituent material, these discharges being excited between electrodes (usually in mutual contact) attached to ac or dc sources. Electrical-contact cutting may be executed with either rotating or nonrotating electrodes. In the first case cutting may be effected over wide ranges of the electrode voltages and the specific powers evolved at the electrodes. When these parameters vary, so do the cutting efficiency and the quality of the surface cut. For example, cutting by elec- trical fusion at a voltage of 36 V or over is characterized by a high value of the specific power evolved at the elec- trodes and a high cutting efficiency, but a low quality of the cut surface and a fairly deep zone of thermal influence. This somewhat restricts the use of electrical- contact cutting in the electrical-fusion mode. Figure 1 shows a cut through a part of complicated cross section obtained in water by means of a ro- tating tool electrode (disc) with 24 V on the electrodes. The quality of the surface of the cut is V3. By using special discs with abrasive electrical-insulating coatings of their lateral surfaces (for ex- ample, a coating made from aluminum oxide powder) we may improve the quality of the cut surface to V6- V7. On using such electrode tools for the electrical-contact cutting of hollow parts and tubes under a layer of water or with intensive water cooling of the cutting zone, we may obtain a high-quality cut surface over the whole cross section of the part. The cutting efficiency increases by about a factor of ten over that of conventional mechanical methods. The foregoing advantages of electrical-contact cutting with a rotating electrode offer excellent pros- pects for its use in industry [1-3]. However, the use of this type of cutting for the'repair of nuclear reac- tors involves serious difficulties. This is due to the following circumstances. The weight of the machines used for electrical-contact cutting with a rotating electrode is as great as that of those used for mechanical cutting [3]. In the first case the machines have comparatively complex kinematics, which makes remote control more difficult. Furthermore, the presence of water (as a coolant) greatly increases the power of the drive motors required for electrode discs rotating at more than 20 m/sec, and requires the installa- tion of complicated sealing systems to prevent water from passing into the current-taking devices and thus to ensure their efficient operation. Hence under the specific conditions of nuclear reactor repair special interest is evoked in electrical- contact cutting with nonrotating electrodes, which, depending on the shape of the working part of the elec- trodes, facilitates separative cutting, the cutting of apertures in metal plates and the sides of the vessels, the removal of broken pins from these, and other operations. The simplicity with which such operations may be executed enables us to create light, reliable, and inexpensive equipment. 533 Declassified and Approved For Release 2013/09/15: CIA-RDP10-02196R000400010006-4 Declassified and Approved For Release 2013/09/15: CIA-RDP10-02196R000400010006-4 Fig. 2. Cut through a stainless steel plate made with a laminar graphite electrode under a layer of water. Fig. 3. St. 3 sample with a hole 80 mm in diameter drilled through it. Cutting with a nonrotating electrode may only be effected in the mode of electrical fusion. Figure 2 shows a cut through a stainless steel plate 30 mm thick made with a nonrotating electrode under a layer of water. The cutting speed was 150-200 mm/min. Figure 3 shows a St. 3 plate 180 mm thick with a hole bored through it, 80 mm in diameter. The operation was effected with a tubular graphite electrode under a layer of water. Materials for Tool Electrodes and Their Wear in Electrical-Contact Cutting The intensive action of the powerful arc discharges causes wear of the tool electrode materials, ap- pearing in the form of electrical erosion. Furthermore, tool electrodes working without intensive cooling by an external medium experience severe thermal loading. This influences the mechanical strength of non- rotating electrodes, and reduces the dynamic stability during the operation of rotating electrodes, owing to thermoplastic deformations. The use of liquid media possessing a fairly high specific heat and thermal conductivity (for example, ,water and aqueous solutions of chemical compounds) greatly reduces the thermal stress on the tool electrodes and improves their working conditions. Apart from electrical erosion, wear on certain electrode materials may also arise from the forma- tion of volatile oxides and other chemical compounds in gas media. Such materials include molybdenum and tungsten, which, despite their high thermophysical properties, ,undergo serious wear when used as electrode material for electrical-contact cutting in air. ,The oxides of these metals, formed at .750-800?C, sublime very considerably at the same temperatures. The wear on graphite electrodes increases with in- creasing rate of pumping air through the cutting zone because of the oxidation pf the carbon. The external medium has hardly any effect on the amount of electrical erosion of the electrode ma- terials at those currents characterizing electrical-contact cutting with a nonrotating electrode. Tests showed that the degree of electrical erosion of nonrotating graphite electrodes during electrical-contact cutting in water, electrolyte solutions, oils, and air (without pumping the latter through the cutting zone) remained constant. The same effect was noted in [4], in which it was indicated that for high currents in arc discharges the external medium was displaced from the electrodes by the vapor of the electrode ma- terials. The wear of the rotating electrodes also includes a component due to processes taking place as a re- sult of friction between the tool electrodes and the part being machined in those cases in which cutting is effected with a low voltage on the electrodes, i.e. , in which the contact mechanism of arc-discharge ex- citation predominates. Water-cooled rotating electrodes are usually made from low-carbon steels, brass, copper, or special cast iron. The use of refractory metals or metalloceramic composites is economically undesirable owing to the complexity involved in the manufacture of such tools and their high net cost. Investigations showed that, under optimum cutting conditions, the wear resistance of tools using me- talloceramic of the VM-70 type (tungsten?copper?nickel) was only 1.3-1.6 times higher than that of cast iron tools. 534 Declassified and Approved For Release 2013/09/15: CIA-RDP10-02196R000400010006-4 Declassified and Approved For Release 2013/09/15: CIA-RDP10-02196R000400010006-4 It Aib 1-1 Fig. 4 Fig.- 5 Fig. 4. Granules formed after the electrical-contact cutting of 18-8 steel under a layer of water; the granules are collected with a magnet. Fig. 5. Arrangement of the apparatus for remote-control electrical-contact cut- ting of an array of tubes: 1) tube being cut; 2) guides; 3) electrode plate; 4) mas- ter nut; 5) carriage; 6) lead screw; 7) electromechanical drive. For the reasons just outlined, chief interest lies in nonrotating tool electrodes. These are made of graph- ites, which have the great advantage that under the thermal action of arc discharges they suffer no fusion but rather sublime, dissipating far more thermal energy than would occur on melting, and a higher wear resistance is thus achieved in electrical-contact cutting. As regards erosion resistance and mechanical strength, pyrolytic graphites are the best; these have a highly oriented structure and high specific gravity [5]. Pyrolytic graphites may also be used as coatings for ordinary graphites, increasing the strength of tool electrodes made from such materials and increasing their cutting efficiency. Of all the pyrolytical graphites, we may specially mention that of the PGV type, which has advanced thermophysical and mechanical properties; 1) thermal conductivity ? along the a axis 150-300, along the c axis 2.5-4.0 m?W/deg; 2) compressive strength ? along the a axis 5-7, along the c axis 25-30 kg/mm2; 3) bending strength ? along the a axis 1-2, along the c axis 25-30 kg/mm2; 4) resistivity ? along the a axis (1.63-2.0) ? 10-4, along the c axis 0.2-0.3 St ? cm. Phenomena Accompanying Electrical-Contact Cutting In developing a technology for repair which involves electrical-contact cutting, allowance should al- ways be made for phenomena accompanying the cutting process. As a result of the thermal action of the arc discharges on the electrode material the latter evolve their own vapors, which emerge from the cutting zone at a high velocity. The intensity of vaporization depends on the power of the arc discharges, their repetition frequency, and the thermophysical properties of the electrode materials and the medium. When the vapors of the electrode materials condense in the gas medium, highly dispersed solid par- ticles 0.1-20 pin size are created. The particles formed as a result of the cutting of construction materials having induced radioactivity are propagated into the free gas space in the form of an aerosol cloud. The particles settling on the wall surfaces of the room and on the equipment constitute radioactive contamina- tion. These particles adhere firmly to metal, particularly to polished stainless steel, and remain attached to them [6]. Hence when conducting electrical-contact cutting in air it is essential to provide special suc- tion systems and corresponding systems of gas purification. Methods of deactivating the equipment must also be selected. In order to remove the contaminants formed during electrical-contact cutting, ordinary redox deac- tivation methods may be used. The volumes of the desorption solutions and the number of deactivation cy- cles may be reduced if easily-removable coatings are first applied to the surface of the equipment. 535 Declassified and Approved For Release 2013/09/15: CIA-RDP10-02196R000400010006-4 Declassified and Approved For Release 2013/09/15: CIA-RDP10-02196R000400010006-4 TABLE 2. Examples of Metal-Cutting Operations in Reactor Repair .o ,... Disc cutting of construction units. Feed Executed with a rotating electrode and water cooling in the cutting zone. W. Surface quality V3. Electrode voltage 18-32 V. -0; .10 .. ? Finishing of metal surfaces. 0._...?"eg, Feed Executed with a rotating brush electrode and water cooling in the cutting zone. Surface quality V3-'75. Electrode voltage 10-18 V. Wate ' idi V .1 Rotation 4. \c, N,.../6 SW ip ,t a) w Cutting into tubes,, cutting apertures in tubes and sheets. Executed a rotating tube electrode and water cooling in the cutting with 411Mzone. Electrode voltage 18-32 V. s. Cutting of construction units, face plates, etc. a, Executed with a graphite electrode (no rotation) and water cooling of , . the cutting zone, or under a layer of water. Surface quality ? unclassified. Electrode voltage 36-50 V. V, "A Broaching of apertures, removal of broken pins. tmommwstis: Water Executed with a circular graphite electrode (no rotation), water being r zAFeed fed into the inside of the electrode. Quality of machined surface ? unclassi- w.memrrnmo fied. Electrode voltage 36-50 V. , 4, 1111M=11 -a ate r c a) 4) w II r Amr, + Hollowing of grooves in parts ' Executed with a graphite electrode having a profiled working part, the working zone being water cooled, or executed under a layer of water. Surface quality after machining ? unclassified. Voltage 36-50 V. In under-water cutting, the electrode vapors condense in the water. In this case colloidal solutions are formed. Coarse colloidal solutions rapidly coagulate (in 25-30 mm). Fine solutions break up more slowly. Thus, for example, after leaving the water used for cutting stainless steel to settle for two days it still contains up to 4 mg/liter of iron oxides and 0.5-0.7 mg/liter of chromium and titanium oxides. The formation of colloidal solutions turbidizes the water, and this impedes the use of optical observation sys- tems. Under-water electrical-contact cutting is accompanied by the evolution of oxygen and hydrogen, formed by the decomposition of the water. For a thin layer of water above the cutting zone, these gases are in- tensively evolved and suffer combustion. The possibility of hydrogen accumulating in a certain closed vol- ume cannot however be ruled out. On immersing the cutting equipment to a depth of 5-6 m these gases fail to reach the surface of the water. Evacuation of the cutting products from the repair zones is one of the essential measures required to ensure successful execution of subsequent operations. 36 Declassified and Approved For Release 2013/09/15: CIA-RDP10-02196R000400010006-4 Declassified and Approved For Release 2013/09/15: CIA-RDP10-02196R000400010006-4 Rotation of electrode Turning of head Fig. 6 I. Fig. 7 Fig. 6. Mechanism for the electrical-contact cutting of tubes from within: 1) shaft-rotating motor; 2) current-taking device; 3) hous- ing of cutting head; 4) screw supports; 5) tube being cut; 6) shaft; 7) electrode. Fig. 7. Arrangement of apparatus for the electrical-contact broach- ing of holes in freely-mounted parts: 1) cast iron cube (part to be broached); 2) plate on which the part is freely mounted; 3) tool elec- trode; 4) electrically-insulating plate; 5) carriage; 6) guides; 7) lead screw; 8) electromechanical drive feeding the electrode; 9) stand. In electrical-contact cutting in air, it is esSential to provide surface protection for equipment sit- uated around the current zone so as to prevent the adhesion of molten metal, and also to provide for the subsequent removal of any which does adhere. Demountable screens are used to this end. The thermophysical properties of the metal being cut and the rate of cooling the molten metal affect the size and shape of the solidified drops. On cutting in air, the drops of melt merge into a shapeless mass. On cutting under Water the molten metal becomes granular. During the cutting of stainless steel under water, hollow granules 0.01-12 mm in size are created. Of these 10-12% are spherical and the rest are drawn out and geometrically irregular. Up to 60% of the granules acquire magnetic properties arising as a result of the formation of delta ferrite by the high rate of cooling of the melt in water; magnets may thus be used to remove them (Fig. 4). The shape and size of the granules formed in the under-water cutting of aluminum and its alloys dif- fer considerably from steel. In this case long, drop-like granules with acicular tips are usually formed. Some granules extend to 15 mm. Supply Sources In electrical-contact cutting, supply sources with strict volt?ampere characteristics and fairly high powers (100 kVA and over) are used; their voltage is regulated within the range 18-50 V. No special dc or ac sources are produced by industry for electrical-contact machining. Standard- production armored transformers are therefore employed. These include, for example, dry transformers 537 Declassified and Approved For Release 2013/09/15: CIA-RDP10-02196R000400010006-4 Declassified and Approved For Release 2013/09/15: CIA-RDP10-02196R000400010006-4 of the OSU-100 type, which may be used in twos or more by parallel connection in the supply source. The same transformers, furnished with rectifier systems, may be used as dc supply sources; these have some advantages over ac sources in respect of a reduction of the reactive components of the circuit impedance and the wear on the tool. The choice of supply sources with due allowance for the required cutting efficiency is considered in {7}. The same paper indicates a method of calculating the circuit elements of the supply source for the electrical-contact cutter. Use of Electrical-Contact Cutting in the Repair of Reactors Examples of some technological operations encountered in reactor repairs for which electrical-con- tact cutting is suitable are presented in Table 2. In the repair of reactors, cutting operations often have to be executed under cramped conditions so that traditional cutting methods are difficult or impossible. In such cases electrical-contact cutting with nonrotating electrodes is particularly effective. We shall now give a brief description of some mechanisms for electrical-contact cutting in similar operations. Cutting of an Array of Tubes. The most typical repair operation is the cutting of an array of tubes. If the array of tubes is situated in the housing in such a way that the distance between individual tubes and the walls is insufficient for the operation of ordinary cutting tools, the device illustrated in Fig. 5 is em- ployed. A laminar graphite electrode with a length greater than the width of the array of tubes is moved along guides on a carriage by means of a lead screw, driven by an electromechanical system. The cutting pro- cess is stabilized and the normal thermal conditions of the cutting electrode kept constant by virtue of feed- back (introduced into the electrical drive circuit) between the rate of rotation of the de electric drive motor and the cutting current. In order to avoid rupture of the electrode, a current-limiting relay is also pro- vided for the current in the core winding of the electric motor driving the electrode; this disconnects the motor if the current rises too high. The supply source includes two parallel transformers of the OSU-100/0.5 type each with a power of 100 kVA. The power of the supply source is sufficient for the series or parallel cutting of any tubes made from the construction materials generally employed in reactor buifding. ;Cutting of Tubes from Inside. In repair work it is often required to cut tubes from inside with the cutting instrument situated at a considerable distance from its drive point. For cutting tubes with an in- ternal diameter of 30 mm or over in this way in straight vertical sections an electrical-constant cutting head may be used (Fig. 6). The cutting head is furnished with a lamellar electrode made of pyrolytic graphite fixed to a shaft with a current-collecting device. To the framework of the mechanism an electrical motor for driving the rotating shaft is attached. The mechanism is placed at the top of the tube and fixed with a screw support. The shaft carrying the tool electrode is placed eccentrically with respect to the axis of the tube being cut. When the supply source and the shaft-rotating motor are connected, the working edge of the electrode touches the wall of the tube, as a result of which electrical fusion occurs. After the graphite electrode has rotated through 360? the tube is not completely severed. This is achieved after rotating the framework of the cutting head through 180?. The cutting may be effected in either air or water. The fact that there is no pressure between the tool electrode and the part, together with the fact that the electrode is very light, enables tubes to be cut at a depth of 10-15 m from the site of the mechanism. Broaching Holes in Freely-Mounted Parts Using the mechanism illustrated schematically in Fig. 7, open apertures may be broached in freely- mounted parts. The mechanism has been used to broach holes 130 mm in diameter in cast iron cubes freely installed on a steel floor. The depth of the apertures is 280 mm. 538 Declassified and Approved For Release 2013/09/15: CIA-RDP10-02196R000400010006-4 Declassified and Approved For Release 2013/09/15: CIA-RDP10-02196R000400010006-4 Broaching is effected with a tubular electrode having a diameter 4-5 mm smaller than the diameter of the opening to be broached, while the length exceeds the thickness of the broached metal by 60 mm. The electrode is fixed in a movable carriage set in motion by a lead screw. The screw is rotated by an electro- mechanical drive, the electrical circuit of which incorporates feedback between the current in the core winding of the dc drive motor feeding the electrode and the current effecting the broaching. All the mecha- nisms are placed on a firm base. Inside the electrode is a plate of electrically-insulating material pre- venting it from coming into contact with the core being cut out. The tool is made of GMZ graphite, the surface of the electrode being coated with pyrographite. As supply source there is a pair of parallel-connected transformers of the OSU-100/0.5 type with an electrode voltage of 40-50 V. As the broaching depth increases, the rate of feed of the tool falls from 40 to 5 mm /min. This is because the conditions for removing the erosion products worsen as the depth of incision in- creases, despite the fact that water is forced through the inside of the electrode. Using an analogous de- vice, apertures may be made in the walls of reactor vessels. CONCLUSIONS Practice has shown the efficiency and economic viability of the electrical-contact cutting of metals in the repair of nuclear reactors, particularly cutting with nonrotating electrodes. The advantages of the electrical-contact method of cutting metals are as follows: simplicity of execu- tion, low cost of the equipment, and possible application to all metals used in reactor building, whether the cutting is effected in air or in water. LITERATURE CITED 1. In Nonstandardized Technological Equipment and Fittings, Catalog No. 2 [in Russian], TsINTINefte- khimash, Moscow (1971), p. 36. 2. N. S. Kabanov and A. V. Piskunov, Avtomaticheskaya Svarka, No. 4, 11 (1967). 3. D. M. Zmiev and B. V. Kuznetsov, Anodic Mechanical Cutting of Metals in Disc Machines [in Rus- sian], ENIMS,? Moscow (1970). 4. V. I. Rakhovskii, G. V. Levchenko, and 0. K. Teodorovich, Break Contacts of Electrical Apparatus [in Russian], Energiya, Moscow (1966). 5. A. S. Fialkov et al., Uspekhi Khimii, 34, No. 1 (1965). 6. A. D. Zimon, Adhesion of Dust and Powders [in Russian], Khimiya, Moscow (1967). 7. A. S. Davydov, in: New Methods of Machining Metals [in Russian], GOSINTI, Moscow (1964). 539 Declassified and Approved For Release 2013/09/15: CIA-RDP10-02196R000400010006-4 Declassified and Approved For Release 2013/09/15: CIA-RDP10-02196R000400010006-4 SOME PROBLEMS IN THE OPERATIONAL SAFETY OF ATOMIC POWER STATIONS USING GAS-COOLED FAST REACTORS WITH A DISSOCIATING COOLANT G. A. Sharovarov UDC 621.039.58 One of the most important problems in nuclear power generation is the operational safety of atomic power stations using gas-cooled fast reactors, which are characterized by high thermal stress, low ac- cumulating capacity in the coolant, and correspondingly short periods of operation before breakdown pro- cesses develop. Breakdown processes may be divided into two main stages; first, a rise in the tempera- ture of the fuel and the jacket of the fuel element until the melting point is reached and, second, melting of the active zone, with displacement of the fuel and the possible formation of a secondary critical mass, leading to an explosion. The requirements for absolute safety have been discussed in many recent works on breakdown pro- cesses in various types of fast-reactor power stations [1-5]. Unfortunately, the general requirements and the corresponding standards for the investigation of nonstationary breakdown processes in the design of atomic power stations have not yet been clearly formulated. This is attributable to the fact that the various atomic power stations investigated differ considerably in their thermodynamic cycles, their flow circuits, the coolants they use, and other features. The most important problem in operational safety is to prevent the melting of the active zone, with possible displacement ,of the fuel, formation of secondary critical mass, and explosion. As is generally known, this is defined as ultimate failure. T,? 1000 900 800 700 600 e \I ? 9 o Fig. 1 1100 goo 700 500 C=0 0=C 300 0 01 0,2 Fig. 2 Fig. 1. Coolant temperature as a function of time when the heat flow q varies as a step func- tion: 1) process for equilibrium properties; 2) process for nonequilibrium properties. Fig. 2. Coolant phase diagram for oxygen (P = const, qv = ?23,000 kcal/m3. sec). The curves are drawn for a constant value of C = dp40/dT, with C2 > C1 > 0 > ?C3. ?3 Po Translated from Atomnaya Energiya, Vol. 34, No. 6, pp. 435-439, June, 1973. Original article submitted November 9, 1972. 540 ? C 1975 Consultants Bureau, a division of Plenum Publishing Corporation, 227 West 17th Street, New York, N. Y. 10011. All rights reserved. This article cannot be reproduced for any purpose whatsoever without permission of the publisher. A copy of this article is available from the publisher for $15.00. Declassified and Approved For Release 2013/09/15: CIA-RDP10-02196R000400010006-4 Declassified and Approved For Release 2013/09/15: CIA-RDP10-02196R000400010006-4 ????11 In order to solve the problem it is essential, above all, to ensure reliable coolant circulation during a power-station 1,0 breakdown and shutdown cooling of the reactor. In addition, the reactor design must ensure the necessary temperature effects and include a highly reliable breakdown-protection system. The most dangerous breakdown situations are those involving a failure of the seal in the primary loop at various points of the flow circuit, cutting off the flow of the main cir- culating pumps, the compressors, or the entire power sta- tion, and also those involving an accidental change in reac- tivity. In all breakdown situations, it is essential to main- tain continuous circulation of the coolant through the reactor. The length of time that continuous circulation is maintained and the nature of the change in coolant flow for different types of breakdown are determined primarily by the flow circuits, the thermodynamic cycle, the design of the reactor, and the 0 2 4 properties of the coolant. In the present study we shall discuss possible solutions of these problems for atomic power stations using the dis- sociating coolant N204. We shall investigate the characteris- tic factors which are specific to dissociating coolants alone, since the other difficulties involved in maintaining safe opera- tion remain the same for all gas-coolant reactors. The most important feature of atomic power stations using a dissociating coolant is that they use a single-loop conver sion system and use a gas?liquid thermodynamic cycle in a gas-cooled reactor [5-10]. The main characteristics of nonstationary processes in nuclear power installations using a dissociat- ing coolant are determined by nonstationary processes in the coolant, which differs in principle from or- dinary gaseous coolants. Because the thermophysical properties of a dissociating coolant are variable, the processes in it cannot be regarded as inertialess. For a given pressure and temperature and com- parable periods of time for the chemical reactions and technological processes, the properties will also depend on the characteristics of the nonstationary process taking place in the coolant. For example, Fig. 1 show S that the temperature of a gas in a real nonstationary process varies more sharply for a change in heat flow than for inertialess chemical reactions. In Fig. 2 we show the phase diagram for the relative density of oxygen in the dissociating mixture. The curve C = 0 corresponds to the process with inertialess chemical reactions. The arrows indicate the direction of the possible process when cooling takes place as a function of the initial state. The amount of oxygen depends not only on the temperature and pressure but also on the initial conditions and the na- ture of the nonstationary process. Thus, the dissociating coolant is a dynamic system characterized by the kinetics of the chemical reactions. 0,5 s-, sec0,5 Fig. 3. Curves showing flow rate, pres- sure, and temperature of the coolant at the reactor inlet when the pumps fail: ?) main circulating pumps; ---) pow- er station. One of the most dangerous breakdowns in multi-loop atomic power stations using a gaseous or liquid ?metal coolant is loss of power in the main circulating pumps or compressors, since in this case it is ex- tremely difficult to maintain continuous circulation. Continuity of circulation can be maintained for some time, at diminishing pressure difference, for a specific quantity of coolant on the high-pressure side. The use of a gas?liquid thermodynamic cycle with a dissociating coolant is characterized by the large amount of coolant in the loop in comparison with the flow rate and the considerable drop from maximum to mini- mum pressure in the loop WM The ratio of the amount of coolant to the flow rate in the corresponding segment of the loop is deter- mined by the coefficient 541 Declassified and Approved For Release 2013/09/15: CIA-RDP10-02196R000400010006-4 1,0 0,9 0,8 47 0,6 451 4336 Declassified and Approved For Release 2013/09/15: CIA-RDP10-02196R000400010006-4 U,T,A 1, 2 r lk MIN\ t 2 , 4 * I 6 1 / 4536 736 4936 1,136 Fig. 5. Variation in fuel-element jacket temperature when there is a break in a duct at the reactor outlet: 1) T = 0 sec; 2) 0.5 sec; 3) 1.5 sec; 4) 2 sec; 5) 2.5 sec; 6) 3 sec. 7 csec Fig. 4. Curves showing the flow rate, pressure, and temperature of the cool- ant at the reactor inlet for a burst duct at the reactor outlet; ?) break in main vapor duct, with Fell = (1/6)F0; break in one branch of a six-branch va- por duct. which indicates the length of time the segment could maintain a nominal coolant flow rate. The difference between the maximum and minimum pressure values results in natural flow of the coolant between the high- pressure and low-pressure sides. Relatively low flow velocities in the dissociating coolant in the liquid phase will result in large values of the coefficient Km. In in- dividual segments, according to the data of the Nuclear Energy Institute of the Academy of Sciences of the Byelo- russian SSR, this length of time that the coolant continues to flow after the pump stops may vary from 20 to 6.0 sec, depending on the design and the parameters of the cycle. For gas-cooled loops with other coolants, this co- efficient is much lower. In a two-loop conversion sys- tem the difference between the maximum and minimum pressure values in the first loop depends only on the hy- draulic resistances and has a low value, which cannot maintain the necessary coolant circulation. In a single- loop conversion system this difference depends on the pressure ratio in the thermodynamic cycle. When the coolant used is helium, this values varies from 2 to 7 [6]. In a gas-liquid cycle with a dissociating coolant the pressure ratio is about 70 when the difference be- tween the pressures ranges up to 160 atm. The following basic assumptions were made in the investigation of breakdown situations: the gas in the loop expands polytropically; the fuel and the jacket of the fuel element have a temperature equal to the value obtained by averaging over the radius; the processes in each volume correspond to equilibrium properties; the characteristics of the turbines conform to Fluegelts equations; and the reactor kinetics are charac- terized by a concentrated model with six groups of delayed neutrons. We can see from Fig. 3 how the flow rate, pressure, and temperature of the dissociating coolant at the reactor inlet vary when the main circulating pumps fail (there is no overshoot of the pumps, and vapor is formed only as a result of the heat contained in the coolant). When the whole station loses power, the vapor goes past the turbines into the condenser. Owing to the accumulation of gas on the high-pressure side, continuous circulation is 'maintained for a fairly long time, affording an opportunity for action to restore the power or shut down the reactor and organize the shutdown cooling process. Let us consider a breakdown in which there is a break in the main vapor duct with an effective cross section equal to the area of one branch on the segment between the reactor and the high-pressure turbine. The variation of the coolant flow rate, temperature, and pressure at the reactor inlet is shown for two cases of this kind of breakdown in Fig. 4. The coolant flow rate sharply increases at first, after which it diminishes as time increases. The reactor control systems maintain constant power, and the breakdown protection system is not yet activated. In Fig. 5 we show how the fuel-element jacket temperature varies along the zone. The maximum temperature drop is about 10%. 542 Declassified and Approved For Release 2013/09/15: CIA-RDP10-02196R000400010006-4 Declassified and Approved For Release 2013/09/15: CIA-RDP10-02196R000400010006-4 Fig. 6. Diagram of shutdown cooling system; 1) reactor; 2) regenerator; 3) condenser; V-4 4) pump; 5) tank of liquid coolant. A study of the power variation resulting from the temperature effects following a failure of the auto- matic power-regulating system showed that when the value N = 1.15 No is reached, the breakdown-protec- tion system will be activated, with a delay of 0.5 sec. The variation in jacket temperature vertically along the zone does not exceed the allowable values. Thus, when there is a break in the main vapor duct at the reactor outlet, the accumulation of gas on the high-pressure side may maintain continuous circulation, affording an opportunity to take steps to shut down the reactor and initiate the process of shutdown cooling. The greatest danger in such a breakdown may result from the substantially increased pressure drop in the structural elements of the reactor due to the increase in hydraulic resistances when the coolant flow rate is high. A break in the main vapor duct at the reactor inlet is a very serious kind of breakdown. Depending on the cross-sectional area of the break, the forward circulation may be reduced and reverse circulation may take place. There may be points with zero coolant flow in the gas passages. When there is reverse circulation, the coolant stops at the instant the break takes place, after which it flows in the reverse direc- tion owing to the accumulation of gas in the segment between the reactor and the high-pressure turbine. The gas in the high-pressure cavity'flows out in two directions at the same time; through the reactor and through the high-pressure turbine into the regenerator, after which it passes through the low-pressure turbine into the condenser. In order to estimate the properties of reactor self-regulation when there is a sudden variation in reactivity, we compared it with a sodium-cooled reactor. To obtain an equal power-excursion value, we must introduce twice as much reactivity into the reactor using the dissociating coolant. The density effect makes very little change in transient regimes. Even when the coolant is complete- ly removed and the regulating system fails, the power excursion does not exceed the allowable values. The special physicochemical and thermophysical properties of N204, whose boiling point lies in the operating-temperature range, makes it possible to use the coolant in the liquid phase for shutdown cooling of a gas-cooled reactor [11]. A special system is provided for emergency shutdown cooling. The initial (emergency) cooling of the reactor, as was shown, can be carried out by means of the main loop, after which the shutdown cooling system is connected. In Fig. 6 we show a diagram of the shutdown cooling system, which is a closed gas?liquid loop con- nected to the reactor in parallel with the main loop. While the power station is in operation, the coolant passes through the shutdown cooling system by way of the shutoff valve V-3, heating the heat-exchange ap- paratus and the ducts. The coolant passes from the reactor to the regenerator and is then condensed; it enters the regenerator by way of valve V-4, bypassing the pump and is discharged to the condenser of the main loop. When there is a breakdown, the heat is initially removed by the main loop owing to the coolant flow- ing through it. Then, by means of the breakdown-protection system, shutdown cooling takes place; for this purpose valves V-1 and V-2 are opened and the main loop is disconnected. The shutdown cooling sys- tem operates on a gas?liquid cycle. After reducing the pressure and temperature of the coolant, there is a change to liquid circulation. For this purpose, valve V-5 is opened and the liquid frdm the tank enters the loop. The shutdown cooling system is fed by an independent source of electric power. 543 Declassified and Approved For Release 2013/09/15: CIA-RDP10-02196R000400010006-4 Declassified and Approved For Release 2013/09/15: CIA-RDP10-02196R000400010006-4 It should be noted that an emergency shutdown cooling system using a liquid product can be used in ordinary operation. On the basis of the foregoing, we may state the following conclusions. 1. The special properties of a flow circuit and a thermodynamic cycle using a dissociating coolant make it possible to maintain continuity of circulation and ensure both initial cooling of the reactor and shut- down cooling after the breakdown-protection system has been activated. 2. The special physicochemical properties of dissociating coolants make it possible to use the cool- ant in the lquid phase for shutdown cooling of a gas-cooled reactor. k.?) 3. In order to prevent any deformation and rupture of structural elements of the reactor, means should be provided for limiting the flow rate of the coolant coming out of the maximum-pressure region. 4. For single-loop atomic power stations with a dissociating coolant, it is desirable to use a special emergency shutdown cooling system. LITERATURE CITED 1. D. Okrent et al. (United States), Third Geneva Conference (1964), Report No. 267. 2. W. J. McCarthy Jr. et al. (United States), Third Geneva Conference (1964), Report No. 284. 3. K. Grattion et al. (Netherlands), Fourth Geneva Conference (1971), Report No. 023. 4. 0. M. Kovalevich, in: Status and Prospects of Work Designed to Develop Atomic Power Stations with Fast Reactors, Vol. II [in Russiani, SEV Symposium, Obninsk (1967), p. 344. 5. Yu. E. Bagdasarov et al., Technological Problems of Fast Reactors [in Russian], Atomizdat, Mos- cow (1969). 6. A. K. Krasin, Reactors of Atomic Power Stations [in Russian], Izd-vo Nauka i Tekhnika, Minsk (1971). 7. V. B. Nesterenko, Proceedings of the All-Union Conference on Dissociating Gases as Coolants and Working Fluids of Power Installations [in Russian], Izd-vo Nauka i Tekhnika, Minsk (1970),, p. 11. 8. Thermodynamic and Transfer Properties of Chemically Reacting Gaseous Systems [in Russian], A. K. Krasin and V. B. Nesterenko (editors), Izd-vo Nauka i Tekhnika, Minsk, Part I (1967); Part 11 (1971). 9. V. B. Nesterenko, Physicotechnological Foundations of the Use of Dissociating Gases as Coolants and Working Fluids at Atomic Power Stations [in Russian], Izd-vo Nauka i Tekhnika, Minsk (1971). 10. V. B. Nesterenko et al., Izv. AN BSSR, Seriya Fiz. -Energ. Nauk, 3, 5 (1971). 544 Declassified and Approved For Release 2013/09/15: CIA-RDP10-02196R000400010006-4 Declassified and Approved For Release 2013/09/15: CIA-RDP10-02196R000400010006-4 CHOOSING ABSORBING-ROD EFFICIENCY FOR SHIELDING AGAINST EXCESSIVE POWER LEVELS A. A. Sarkisov, V. N. Puchkov, UDC 621.039.566.8 and B. A. Mel'nikov Most of the emergency shielding (ES) algorithms in use specify reactor shutdown when an excessive power level is signalled. This has two extremely undesirable effects; 1) significant thermal stresses arise in the core structural elements; this has a negative effect on their reliability; 2) restarting the re- actor takes a great deal of time which significantly decreases the installation's adjustability. It is known that most cases of triggering the shielding when excessive power is signalled are caused by reactivity release when the control system malfunctions or by errors made by personnel. In several cases when the reactivity release is caused by moving the controls it is possible when the power is exceeded to a certain extent to stop the action of the source of disturbance by inserting an inter- lock into the absorber control circuit. Then, to end the emergency situation, instead of shutting down the reactor, one can rapidly insert into the core absorbing rods whose efficiency is equal to the magnitude of the released reactivity. Functionally, these duties can be given, for instance, to the reserve regulator which is constantly in "hot" reserve. In this variant, the emergency shielding rods must play the role of an insurance unit. For this purpose, their triggering level must be increased a bit. The main problem of this study consisted of determining the minimum efficiency for absorbing-rods which would provide reliable reactor shielding during reactivity disturbances in all cases when these rods are triggered simultaneously with stopping the effect of the source of disturbance. The study was made using the IR-100 reactor and an electronic model of reactor kinetics made on an MN-14 analog computer. While the experiment was performed on the IR-100, an absorbing rod was located in the central ex- perimental channel; it was moved out of the core by a special servomechanism at various cons6nt speeds. The rod was moved in the range where its differential efficiency is practically constant. Removal of the rod began at a certain steady-state power level No = 0.5 Np = const, and ended when the ES was triggered by a signal that the prescribed power Np had been exceeded by a factor of 2. The prescribed power level was kept constant in all modes. The rate of reactivity release was varied within the limits (8-32) .10-5 sec-1. As a result of the experiments, we obtained a family of curves determining the variation in relative reactor power as a function of the rate of reactivity release and the time. Since in all cases po = 0 and the reactivity increases linearly, at any moment of time the magnitude of the released reactivity is pt. Thus, the dependences we obtain can be given in the form p = f(p, N/No) (see Fig. 1). By comparing the curves given in Fig. 1 it follows that at low rates of reactivity release the magnitude p corresponding to the given value of N/No depends significantly on the reactivity-release rate. As p in- creases, this dependence approaches a saturation point, and becomes weaker. In connection with this, we continued the study on an electronic model of reactor kinetics, which allowed us to increase the reactivity- release rate to 68 ? 10-4 sec-1. When the process was described mathematically, the space distribution of neutrons in the core was disregarded and a one-group representation of the neutron spectrum was taken to be correct. The admis- sibility of such a simplification when studying transition processes with prolonged reactivity discontinuities Translated from Atomnaya nergiya, Vol. 34, No. 6, pp. 441-444, June, 1973. Original article submitted July 14, 1972. C 1973 Consultants Bureau, a division of Plenum Publishing Corporation, 227 West 17th Street, New York, N. Y. 10011. All rights reserved. This article cannot be reproduced for any purpose whatsoever without permission of the publisher. A copy of this article is available from the publisher for $15.00. 545 Declassified and Approved For Release 2013/09/15: CIA-RDP10-02196R000400010006-4 Declassified and Approved For Release 2013/09/15: CIA-RDP10-02196R000400010006-4 p, x 104 21 19 17 15 f3 11 2 4 7 10 f,2 1,4 1,6 Fig. 1 1,8 N/No 28 24 20 16 12 8 4 0 2 4 6' ; 7 0 10 1,4 ,1,6 Fig. 2 1,8 N/No Fig. 1. Dependence of the reactivity p released up to the time when the power increases by a factor of N/No, on the rate of reactivity release .1) (sec-1): 1) 32 ? 10-5; 2) 28 ? 10-5; 3) 24 ? 10-5; 4) 20 ? 10-5; 5) 16 ? 10-5; 6) 12 ? 10-5; 7) 8 ? 10-5. Fig. 2. Dependence of p released up to the time -when the power increases by a factor of N/No on the rate of reactivity release 16 (sec-1): 0) limit; 1) 68 ? 10-4; 2) 56 ? 10-4; 3) 44 ? 10-4; 4) 32 '10-4; 5) 20 ? 10-4; 6) 8 ? 10-4; 7) 2 ? 10-4. up to Ap = 6 ? 10-3 has been shown in [1]. The differential equations have been recorded for all six groups of delayed neutrons, whose parameters were chosen in accordance with the recommendations in [2] (i3 = 0.0064). The mean lifetime of prompt neutrons was taken to be 5 ? 10-5 sec. We did not simulate the inverse temperature relation, since we studied emergency regimes caused by releasing reactivity through remov- ing regulating units from the core. Under such conditions, the reactivity temperature effect would only ameliorate the emergency situation by decreasing the reactivity-release rate. The results obtained from the model were analyzed using the same method as the experimental data. The curves shown in Fig. 2 also support the fact that, beginning with certain large values of p, the mag- nitude of the reactivity released up to the time when the threshold value N/No is reached is practically in- dependent of the rate of reactivity release and is determined only by the value of N/No. This indicates that at the limit the dependence p = f(p, N/No) simplifies to a relationship of the form p = f(N/N0), which is of greatest interest. We can show that when we examine transient processes having durations no greater than 0.1 sec, when Np = No = const, and the triggering setting of the emergency-shielding system does not exceed 200-250% of No, then the limiting dependence in which we are interested has the form P=0 (1?No/N). (1) This dependence characterizes the maximum reactivity which under the above indicated conditions can be released at the time the threshold power value is attained; it is shown in Fig. 2 as a limiting curve in- dicated by 0. Thus, in the simplest case, when Np = No = const and pi) = 0, the efficiency of absorbing rods needed to compensate excess reactivity in the emergency situation under consideration can be determined from Eq. (1). 546 Declassified and Approved For Release 2013/09/15: CIA-RDP10-02196R000400010006-4 Declassified and Approved For Release 2013/09/15: CIA-RDP10-02196R000400010006-4 p,x(o4 20 15 10 0 .... ' .... .... .....--. --- - / ......" / / /, / / / ?..--.? I ...? //''' ..- .... ...- ...? ? 1 4 8 12 Fig. 3 16 p, x10 Axto4 26 22 18 Fig. 4 Fig. 3. Dependence of reactivity p released when I = 5 ?.10-3 sec-1 and po = 0 to the time of introducing the reserve regulator, on the vafue of p and the triggering setting: 1) ARR 0.2; 2) 0.4; 3) 0.6. Fig. 4. Dependence of the reactivity p released when Srp = 5 ? 10-3 sec-1 and po = 12 ? 10-4 up to the time the reserve regulator is introduced, on the value of I; and the trig- gering setting; 1) Aim = 0.2; 2) 0.4; 3) 0.6. However, in practice there may occur more complicated emergency situations in which the reactivity release when the power increases by a factor of N/No exceeds the value obtained from Eq. (1). For exam- ple, if the above-studied emergency regime caused by releasing reactivity linearly is not limited by the condition No = const, then when N > 0, the necessary absorbing-rod efficiency will be somewhat higher than when Ip = const. Here, the maximum reactivity, release when the reserve-regulator rods are in- serted will be greater, the greater the rate of increase of the prescribed power level. To determine the absorbing-rod efficiency needed to compensate excess reactivity in the emergency system studied we can approximate the initial dependences N/No = go(j), t) by a function of the type N/No=exp (krtn). (2) The values of the coefficients, k, m, and n are determined from the composition and structure of the core 6 as functions of /3, l*, and E Pitt. The efficiency of the reserve-regulator rods is defined as the product p.t, where t is the time from the start of the emergency process until the insertion of the rods, which can be found from the relation- ship Npo+ t elt.PM ? A RR NPo (3) Here, ARR is the setting for inserting the reserve-regulator rods. The calculations using the method described were made in accordance with the modeled reactor. Here, the rate of power increase was taken to be 0.5% per second in the calculations. In Fig. 3, the solid curves show the results of calculations for three values of ARR with Np = 5 ? 10-3 sec-1. For comparison, we show by dashed lines on the same figure the dependences p = f(p, N/No) when Np = const. The emergency situation examined can be made more rigorous if we assume that at the time the im- balance between N and Np appeared the reactivity was nonzero (po 0), but corresponded to some value causing reactor excursion with maximum allowable period. In this case, the necessary reserve-regulator- rod efficiency can be determined from RR=Po-Ff;t? (4) 547 Declassified and Approved For Release 2013/09/15: CIA-RDP10-02196R000400010006-4 Declassified and Approved For Release 2013/09/15: CIA-RDP10-02196R000400010006-4 imivo 1,2 f, 48 46 0,4 0,2 )6-510-4 0 2 4 7 8 t, sec Fig. 5. Transient processes when absorbing rods having ef- ficiencies 20.10-3 (curve 1) and 1.1 ? 10-3 (curve 2) are .ac- tuated. The time t from the start of the mismatch between the prescribed and actual power levels, as in the pre- vious case, can be found from Eq. (3), but the values of the coefficients k, m, and n in Eq. (2) must, in this case, be changed according to the initial reactivity /30. Besides this, the values of No and Npo are here taken not at the start of the transient process, but at the instant Np is exceeded. Figure 4 shows results of calculating the maximum values of reactivity released to the time when the power increases to (N/N0)* equal to 1.2, 1.4, and 1.6, when Np = 5 ? 10-3 sec-1 and po = 12 ? 10-4. All cal- culations were made in accordance with the modeled reactor. Comparison of the curves in Figs. 3 and 4 shows that the greatest reactivity can be released when po corresponds to the maximum allowable period and the given powerin the transient process increases at a maximal rate. However, in this case even when (N/No)* = 1.6, the necessary reserve-regulator rod ef- ficiency is only 2.88 ? 10-3. This allows us to conclude that, to eliminate the studied emergency situations caused by release of reactivity, we can effectively use relatively "light" absorbing rods. To illustrate the advantages of the suggested reactor-shielding method during reactivity disturbances, we made two series of calculations on an electronic model. In both cases, from the initial state po = 0 re- activity was released at rates of 10-4, 5 ? 10-4, and 5 ? 10-3 sec-1. However, in the first variant, when the prescribed power level was exceeded by 20%, "heavy" emergency shielding rods were actuated, having a total "weight" of 20 ? 10-3; the second variant used "light" absorbing rods whose efficiency was 1.1 ? 10-3, determined from Eq. (1). It is clear from Fig. 5 that in the emergency regimes examined, the use of "light" absorbing rods in- stead of the traditional system of shutting down the reactor allows one to ensure reliable shielding of the - reactor from accidentally exceeding the prescribed power level while minimizing thermal stresses. Be- sides this, triggering of the reserve regulator in this case practically does not interfere with the prescribed working regime of the power station. LITERATURE CITED 1. I. I. Sidorova, Analog Modeling in Nuclear Technology [in Russian], Atomizdat, Moscow (1969). 2. G. Keepin et al., Phys. Rev. , 107, 1044 (1957). 548 Declassified and Approved For Release 2013/09/15: CIA-RDP10-02196R000400010006-4 Declassified and Approved For Release 2013/09/15: CIA-RDP10-02196R000400010006-4 NEUTRON TRANSPORT EQUATION SUITABLE FOR OBTAINING APPROXIMATE THIRMALIZATION EQUATIONS N. I. Laletin UDC 539.125.52:621.039.51.12 It often proves useful to convert an equation describing some physical process into an equivalent equa- tion which, in some specific sense, is more convenient. The usual procedure for such a conversation is as follows. The operator A of the original equation Af = St is divided into a sum of two A = Ao + B. If there exists an operator Ao-i reciprocal (inverse) to Ao, then for the unknown function f we have an equation 1= A-0-1 S ? Examples of this kind of transformation include the following; in quantum mechanics, the derivation of the integral form of SchrOdinger's equation from the differential form [1]; in the theory of neutron transport, the derivation of the Wigner?Weinberg?Corngold?Orlov equation [3-4] and the Peierls equation [2] from the Boltzmann relationship. This kind of transformation will be useful if we make a successful choice of Ao, i.e., essentially if we choose an operator reasonably characteristic of the group of problems evoking our particular interest. When considering the thermalization of neutrons this type of transformation requires a certain modi- fication. We have to s?tart by choosing a characteristic solution, and in this regard cannot dispense with physical considerations. Let us consider the very simple problem of the energy spectrum of the slow neutrons arising from a monoenergetic, spatially-uniform source in an infinite homogeneous medium '[5]. The equation for this case takes the form [Ea (e) ? Es (e)] (I) (e) =Es (e' ?)- e) CD (e') de' +6 ?e'). (1) Here E = E/kT is the energy E of the neutrons in units of kT, where T is the temperature of the medium and k is Boltzmann's constant, 43(e) is the neutron flux of energy e, Ea(e) and Es(e) are the macroscopic neutron absorption and inelastic scattering cross sections, Es(el e) is the scattering cross section of a neutron with energy e' in the range close to the energy E, 6(x) is the Dirac 6-function, ei is the energy of the source neutrons. We shall consider that Let us rewrite Eq. (1): el >>1. dQ ? E a (e) CD (0-6 (e? et), de ? (2) where we have introduced the nomenclature e Q (6) = .c de" ). de'Es (e' e") (I) (e') ? .c de" ). de'Es (e' e") (e'). (3) o e We see from the foregoing equation that Q(e) is the generalized slowing-down density for the case in which the nuclei are moving. It is natural to call Q(e) the current along the energy axis. Translated from Atomnaya nergiya, Vol. 34, No. 6, pp. 445-449, June, 1973. Original article submitted April 17, 1972. 0 1973 Consultants Bureau, a division of Plenum Publishing Corporation, 227 West 17th Street, New York, N. Y. 10011. All rights reserved. This article cannot be reproduced for any purpose whatsoever without permission of the publisher. A copy of this article is available frcm the publisher for $15.00. 549 Declassified and Approved For Release 2013/09/15: CIA-RDP10-02196R000400010006-4 Declassified and Approved For Release 2013/09/15: CIA-RDP10-02196R000400010006-4 As auxiliary functions for the transformation of Eq. (2) we take the solution to the equation (18 One solution corresponding to Q(e) 0 is the equilibrium distribution M(e) = ee-6. Another solution will be the function for which Q(6) = const 0 (without reducing generality we may take the constant as 1). Let us denote this solution by 1(e) and present the basic information relating to it which will be needed for the future. In the slowing-down range (c>> 1) I (e) will transform into the well-known Fermi spectrum I(e) 1 A0E5e. Here is the logarithmic mean of the energy loss in a collision with a stationary nucleus. Gen- erally speaking, the function I(e) may be divided into two parts: 1(e) = ? (o(e)/Es(0) + Ir(6), where Ir(e) is the regular component of the solution. This component is accurately defined apart from the addition of a Maxwell function with an arbitrary factor. It is therefore more convenient to deal with the function i (8) [ir (8)/M (6)]* Making allowance for the behavior of i(e) at e >> 1 we introduce the new function 00 Z (e) = ee i (e')e-c' de'. C Then i(e) = z(e) ? (d/d6)z(e). Since in the limiting cases of the gas model (m = 1 and m >> 1 where m is the mass number of the slowing-down nucleus) the function z(e) may be expressed by a unique formula [6] zg.i-n(8)=bzscom co' it is reasonable in the general case-to express z(e) in the form 1+ t (e) z(6) = bEs (OM (6) ? It is easy to show that t(e) satisfies an integral equation of the second kind which may be solved nu- merically by standard methods. Hence t(e) 0 for a gas with m = 1 while for a gas with m >> 1 this func- tion only differs appreciably from zero for e < We note that in the expression for z(c) the quantity t(E) enters in the combination 0E5(e)/[1 + t(e)1. Let us introduce the quantity (6) = /[i+ t(c)J. We may assume that this in some way characterizes the width of the distribution of singly-scattered neutrons having an energy e before collision. Using the two characteristic solutions of M(E) and I(e) at our disposal we may transform the original kinetic equation (1). In the formal procedure under consideration, the first step-is that of separating out an operator Ao determined by the characteristic solutions. In the present case a suitable operator will be A0f= (e' ?)-e) f (e') de' ?Es (e) f (e). However, there is no continuous reciprocal operator A-01 in the class of functions satisfying the natural physical requirements, since there is no solution to the equation DO (6' f (8' ) de' ? Es (e) f (s) = ? 6(6 ? ei). Physically this is readily understandable, being due to the fact that there can be no steady-state neutron distribution in an infinite nonabsorbing medium with a constantly acting source. However, a solution exists for the equation 550 CO .c Es (e' 8) f (e') de' ? Es (6) f (8) = Declassified and Approved For Release 2013/09/15: CIA-RDP10-02196R000400010006-4 (4) Declassified and Approved For Release 2013/09/15: CIA-RDP10-02196R000400010006-4 and this will be used later. This solution is defined apart from the addition of a Maxwell function with an arbitrary factor. Apart from obvious physical considerations we may use a formal mathematical argument Is a verification of the existence of a solution to Eq. (4). It is well known that, if a homogeneous equation Aof = 0 has a nontrivial solution, the corresponding inhomogeneous equation Aof = cp will only have a solu- tion if the right-hand side of the equation'yo(x) is orthogonal to the solution of the conjugate homogeneous equation Ate- = 0. Since in the present case the solution of the conjugate equation 00 A+ f+ is constant, it is required that the integral of the right-hand side of Eq. (4) should vanish, and this is in- deed the case. In order to simplify the calculations we may put et ? 00 into Eq. (4), although this will not reduce the generality of the consideration. The solution of the equation so obtained we call G(e/eo). Since the left- hand side of Eq. (4) is the quantity dQ/de, it is easy to show that Q = 0 for e < eo and Q = 1 for e > E. We then proceed as follows. On considering the energy range e < eo, we may reasonably assume that, if the neutron sink situated at e = oin the problem is displaced in the direction of infinite energies, then this will only make an appreciable difference to the solution in the energy range of present interest in the im- mediate vicinity of e = Co, i.e. , the chief component of the solution G(e/ei) for E < eo will be the Maxwell function M(e). An analogous discussion when considering the range e > eo strongly suggests that the chief component of the solution will in this case be I(E). Guided by these considerations, we express G(e/e0) in the form G (8/8?) g (e/e0) 6 (8-60) I Ci (so) M (8), 8< so; 8 (e) 2a (8) + C2 (60) M (0+ I (8), 680- (5) After requiring that the equation Ci(eo)M(eo) = C2(e0)M(e0)+ 1(e0) should be satisfied, we are left with only one arbitrary function. We rewrite the expression for G(e/e0) {0, e6o. Equation (5) signifies that, instead of the unknown function G(e/e0), we have introduced the unknown function g(e/60). The usefulness of this change depends on how valid are the considerations serving as a basis for Eq. (5). Substituting (5a) into (4) and making a number of transformations, we obtain an equation for g(e/eo) 00 g (6'/2) 188'-) 8) de' g (e18) = S (s/so)? The expression for S(e/?0) takes the form 0. (6) .f p (e) co s (6/80) _ ; (,Bo ? E) X Es (e' --).- e) de' , e< eo; Es (80) 1 1 [ m 1 t,8 ) s b ,co), m (8, ) ___ I (8,)] t o I X Es (e' ??- 8) de', 8 > eo. It is easy to see that S(e/e0) is an alternating function only differing from zero in a narrow range of energies L close to the value eo (in the region of the energy transferred by a neutron in a single collision). The in- tegral of S(e/e0) with respect to e equals zero S (e/e0) de -= O. The function g(e/e0) is not determined uniquely by Eq. (6). In order to avoid the indeterminacy, we transform Eq. (6) by means of (5a), assuming C(e0) = const = C in the latter. We obtain an equation CO g (8/80) ? S (6'/8) g (6/8') de' = h (818). 551 Declassified and Approved For Release 2013/09/15: CIA-RDP10-02196R000400010006-4 Declassified and Approved For Release 2013/09/15: CIA-RDP10-02196R000400010006-4 Here h (?/Eo) = ?S (8/80) + Es (8)M (8) S (e/e0) i (8") de" d8'. b e? The function g(6/60) so defined is alternating, the interval over which it deviates appreciably from zero being similar to the corresponding interval for S(6/60). For e>> 1 we have g (8/80) [1(71 ?70-1 PA ( ) X (80 ? where PA(x) is the Placzek function [4], x(x) = (, 0, x 1/m and Ea(1)/0E0 1 have to be satisfied. If in Eq. (10) we put 1 z (e) ? 4Es (?) m (8) Ii (8) = z (8) ? z (e)1 ; /3 (8) = (1 erf me + ; V 111118 11 (ell)) = To = 1 1 a (ln ct)2CL? nz \ 2 2 (1? ago ' ) we obtain an equation incorporating three limiting cases: the Wigner?Wilkins equation for m = 1 and the Wilkins and Corngold equations for m ?1. This equation, which was earlier proposed in [6], should thus give reasonable results for a gas of any arbitrary mass. If the functions i(e) and y(e) are chosen so that, in a medium of low absorption behaving as 1/Arc, the approximate equation should give a solution as close as possible to the solution of the exact equation, we obtain the equation of the "generalized heavy-gas model" [10, 11] and that of the "secondary" model [11]. Furthermore, Eq. (10) enables us to derive formulas providing a more reliable determination of the func- tions i(e) and y(e) than those of [10, 11]. Of the two functions entering into the approximate equations under consideration, the principal part is, of course, played by the function i(E) for all energies 6, and especially for e >> 1, where its role be- comes dominant. In media with not too strong an absorption, however, the function y(e) only affects the behavior of the solution for 6 1, when the Maxwell component of the solution plays the major part. The weak dependence of the neutron spectra on the function y(e) in media with an absorption cross section vary- ing as 1//6 is demonstrated by the results of the calculations in [10, 12]. However, if the absorption varies 553 Declassified and Approved For Release 2013/09/15: CIA-RDP10-02196R000400010006-4 Declassified and Approved For Release 2013/09/15: CIA-RDP10-02196R000400010006-4 in a resonance manner, the role of the function y(E) becomes more important. This may be seen from the corresponding curves of [11, 121. These considerations served as a basis for the proposition that the thermalization of neutrons in wa- ter should be described by means of a two-constant model [12]. In choosing the function (E)Es(E) = const allowance was made for the fact (noted by many research workers) that the neutron spectra in water with an absorber varying as 1/1,re were excellently described by the "heavy-gas" model. The function y(E) was in- troduced so that the model should also satisfactorily describe thermalization in water with a resonance ab- sorber. Since all the "interesting" resonances in the absorption cross sections lie in the range E >> 1, the simplest relationship y(e) = yo = 1 was chosen. As we have just shown, this simple model gives a com- pletely acceptable accuracy. In conclusion, we note that there is no difficulty in carrying out a transformation similar to the one of the present analysis for an equation with the spatial dependence of [7]. LITERATURE CITED 1. D. Schiff, Quantum Mechanics [Russian translation], IL, Moscow (1957). 2. B. Davison, Theory of Neutron Transport [Russian translation], Atomizdat, Moscow (1960). 3. N. Corngold, Proc. Phys. Soc., A70, 793 (1957). 4. A. Weinberg and E. Wigner, Physical Theory of Nuclear Reactors [Russian translation], IL, Mos- cow (1961). 5. N. I. Laletin, Preprint IA-2146 (1971). 6. N. I. Laletin, At. Energ., 14, 458 (1963). 7. N. I. Laletin, Preprint IAE-2145 (1971). 8. E. Cohen (USA), First Geneva Conference (1955), Paper No. R/611. 9. N. Corngold, Ann. Phys., 6, 368 (1959). 10. H. Pitcher, AEEW-M-350 (1963). 11. M. Cadilhac et al., BNL-719 (c-32), Vol. 2 (1962), p. 439; in: Thermalization of Neutrons [Rus- sian translation], Atomizdat, Moscow (1964); M. Cadilhac et al. (France), Third Geneva Conference (1964), Paper No. R/73. 12. N. I. Laletin, At. Energ., 17, 193 (1964). 554 Declassified and Approved For Release 2013/09/15: CIA-RDP10-02196R000400010006-4 Declassified and Approved For Release 2013/09/15: CIA-RDP10-02196R000400010006-4 EFFECT OF SCATTERING THERMAL-NEUTRON USE N. I. Laletin, N. V. Yu. A. Vlasov, and ANISOTROPY ON THE FACTOR Sultanov, UDC 621.039:512.4 S. I. Konyaev In calculating the use factor of the thermal neutrons in a heterogeneous reactor, anisotropic scatter- ing is usually taken into account in only a very coarse manner. The transport approximation [1] is nearly always used, and only sometimes the linearly-anisotropic approximation [1, 2]. In these approximations the zeroth and first angular moments of the scattering indicatrix are correctly taken into account, but the higher moments are distorted. In the transport approximation all the angular moments with numbers n a-2 are regarded as being equal to the first angular moment, while in the linearly-anisotropic approximation they are put equal to zero. The general opinion to the effect that such a distortion would not lead to any serious errors in the thermal-neutron use factor was recently questioned [3]. When calculating certain two-zone plane cells, Eccleston and McCormick [3] observed that allowance for the second angular moment of the scattering in- dicatrix led to a change in the disadvantage factor comparable in magnitude with the corresponding change associated with the first angular moment. In addition to this, both changes were of the same sign. If these conclusions [3] are valid, then in calculating uranium?water cells it is extremely vital to al- low for the second angular moment of the scattering indicatrix. We note that for many of the methods em- ployed this implies serious complication of the computing process. The validity of the results presented in [3], however, arouses serious misgivings. It was in fact shown in [4, 5]* that 01-00?EarnVrn= C oll'I,P,16/77.VIn (1) Here 00 and 01 are the thermal-neutron use factors on the isotropic and linearly-anisotropic approxima- tions respectivelyt; lam is the absorption cross section in the moderator; Vm is the volume of the mod- erator; Egi)n is the first angular moment of the scattering cross section in the moderator; ?I/K0 and 14 111 are the first angular moments of the neutron distribution function in the moderator calculated on the iso- tropic (iIrRo) and linearly-anisotropic (4,4) approximations. By AP(ri) we understand 2n + 1-component vectors with components *(),k In KI)P111(rli,4) eik(PdC2, while 11411)?1,n) is their scalar product (here P(o) are associated Legendre polynomials with the usual nor- malization If we slightly transform the equations of [4] we obtain 0,-01 ?EamVm5Esm 011)11), 2 di'. (2) v. *The change in the thermal-neutron use factor 60 is simply related to the corresponding change in the dis- advantage factor 6d: tTwo-zone cells are here under consideration, scattering always being regarded as isotropic in the fuel. Translated from Atomnaya Energiya, Vol. 34, No. 6, pp. 450-454, June, 1973. Original article submitted August 22, 1972. C /973 Consultants Bureau, a division of Plenum Publishing Corporation, 227 West 17th Street, New York, N. Y. 10011. All rights reserved. This article cannot be reproduced for any purpose whatsoever without permission of the publisher. A copy of this article is available from the publisher for $15.00. 555 Declassified and Approved For Release 2013/09/15: CIA-RDP10-02196R000400010006-4 Declassified and Approved For Release 2013/09/15: CIA-RDP10-02196R000400010006-4 TABLE 1. Discrete Value of vc, ineff 0 1 2 3 Transport approxima- tion* 2,06 6,33192 6,33192 10,87639 7,68370 10,88836 7,68501 10,88836 10,88836 3,71085 5,22654 *The calculations on the transport approximation involve replacing Es by E s (1 -7). TABLE 2. Rate of Convergence of GN GN GI G3 Gb 07 Gii G13 d 1,0902 1,1442 1,1572 1,1611 1,1625 1,1630 1,1635 (1,1631)* The brackets indicate a calculation in which the integral in (3) was computed by a 27-point quadrature formula of the Gauss type. Here 02 is the thermal-neutron use factor calculated on an approximation in which the three first terms are left in the Legendre-polynomial expansion of the scattering indicatrix in the moderator, 2) is the second angular moment of the scattering cross section in the moderator, xi, f??, 2 is the second angular moment of the distribution function in the approximation under consideration. It follows from Eqs. (1) and (2) that the following relationships must be satisfied for the results of [3] to be valid: and 13r,g JC iriV, 077;2, dr 5E2,1)% 041(,1), 2 06* Vm V. llf.;,;011T,), 2 dr x'; x'-x ^ dv for x