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MEMORANDUM REPORT NO. 1892(Supplement to BRL MR No. 14Th
DYNAMICS OF LIQUID-FILLED SHELL:
AIDS FOR DESIGNERS
by
John T. Frasler
December1 7 1.
Tnfis docicvt nas been approvea fv'r podlic release ard sale;its distrizution is unlivited.
U. S. ARMY MATERIEL COMMAND
BALLISTIC RESEARCH LABORATORIESABERDEEN PROVING GROUND, MARYLAND
C L:-~(i
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BALLISTIC RESEARCH LABORATtORIES
I)ORAmDmu4 REPoiT NO. 1892
(SuDide-ent to BRL .uR No. 1477)
Deceber 1967
Ii
DYNtA]4IC OF i~ir D-FIT7Lr S -
AIDS FOR DESIGNERS
john T. rsr
im mI
V Exterior Ballistics Laborattoryj
[ This d~camet has been appmee 'or public release acd sale;
itsl ditiuiaisulmtd
=fi&-E Projectl No. mT01501a3D
AE- P
ABRDEN PR VIG ROND MRYAN
S -Etro i!ifc Lo~o
mm mmA
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PAGESARE
MISSINGIN
ORIGINALDOCUMENT
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BALLISTIC RESEARCH LABORATORIES
-.EM&)RMD4 RXMORT NO. 18902
Ji~rasier/zoA4berueen Prtoving Ground, 1-U.Deecep-er 19671
Ballistic Researc-h La-borattories Ypewr'±n-dtm Report 1477 (jarpo7v. may
3*193 includes a discussion of Ste-wrartsom's stability anal~ysis of lianlid-
filed project-iles, and "Tables of Poles and Residues t' neede-d for
quantitative design use of the analysis. Various desig -_o-b1,_--- sbx;
that an extenmdeed tabulation is ne-.ded, and the preseent reeporlu moroiides
frev~ency range of 0.00i to 0.70 in increments of 0.02 and a range ofI
cavity fill ratios of 20 to 100 mpercent in raaxi:-r increme-nts of ten
pmercent..
A brief descriution of Steva"-so'n's analysis is also given in this
4report. Eripasis is placeed on the pbysica sigaificmz.e ef the
J ass= ions and resnIlts ofL the theovy ratheer than its =Ithezatical detall.1Thee intent is to nrovide the nvice designer of li-quid-fill~ed shell1 -with
an appreciation and first woeking 1morledge of tthe amalyzis. Addlitionaally,7
tesma=ary ofL the; theory is a~sed to pint. ount the significant advances
that 'havre baeea m~de in un-derstandin irayid- t ill ed sel prbles sne
thle a'iblication ofL Ballistic ?eesearch Laboratories M'enorandi= Rport.
NIo. lhT7.
P 3
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I]
I%
II
TABLE OF COUI±S
'Page
AB STC .... .... AC....T ..... 3
i. M-Rth CTIO.' ........................ 7
Ii. ST-iARMAO.N'S STABILIT.f ANALYSIS .............. 10
* A. Assu=Dtiens of Stevartsam's Analysis ............ .....
B. Results of Ste•-artson's Anaaly-sis ............ 16
4in_. c.cIs ................ ......................... 29
.A7PirIX A: ESIG!I ...... - .......................... 334AM_•!X B: TM3IES OF ?PO!S AND ESIDUB.. . ............ 3
DISUKI-0.I LIST ............... ..................... 63
I
I *
if
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In Ballisti-cs Rieseareb Laborzatories vj--mrandmz Report 14,77, 1-%y
.Z.963 Ka-rpcrv presented r-e-orr endatiorns and aids for desigl±ers of lI~i~id-
filled shell . He a-.:-ise-d that Stev~ae-son's 1* analysis concerning the
fliVWht stability of spinniz-n projeetiles cal-7-yn-g liquid. in- zylindrical I1cavities reparesenteed the best, a p~zrio means for design against flig7ht
instabili-ty of liquid-fifIled shell'. The thneory dewastrattes tthat un-
st,-bb e flights arre the result of resonan-ce betixeen- oscillations in t~he
li-cruid a-id the nut-ational mition of the shell'. Tb aid designeers in use
of the- theory. ~Zr~s-'ieithe dee~tof St-earartson's ins-tabilty
criter27ion-, and ±mz-'. ided am- exteen-sive wmerical 0ablaio:o the 'poles
and residraes" reanired for cuantitative design uurok. Ibhis tabulation, in
_ vjmc ion Stewa-..son' s -criteriom, allows designers to calculate the
aereco=5inations of physical and geometricall omioerties off a s~lell
and its liquid filler that, will render an unstablee flighit. Ti'i zpra=ezAers
gover-n the aneof conditions oerQby -the tables or -oles adresidms
(1) the 1lioul:d filil-ratio of the avyand (2) zzertain non-dim-ensionall
elgnfre~penz~es(netural frequencies) of -the liculd. In Ka-os
tabulatiom-F , fill -ratios from 50 to 100 poercenTt are enzacouasseed. -3ile
thre 2ru~c ag s0.00 to 0.50.
Szoerscrizpt wxzbers denote mfferenmcs whichi =a be foxzd m~ pqge 31.
-a-3-
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II IA rr~ber of instances have occurred -bere the coverage of the
tables given by Karpov was insufficient for quantitative design. Hence,
calculations were xmdertaken to extend the tables to include fill-ratios
of 20 to 100 percent (in steps of 5 and 10 _mercent) and frequencies frozm0.00 to 0.73 (in steps of 0.02). 7he pricary purpose of the present
report is to provide designers viith the extended tabulation. As a
-onvenience to users of the- tables a brief sma-y of Stew•artson's theory
is also ineluded. The ass=-Ttions, capabilities, limitations, and
ji portamt for_ alae of the theory are .'o-.red, but not in extensive
I -athematical detail. By so doing, -we bhoe to _roiide a useful reference
for the designer familiar with the stability probis of liquid-fil!ed
shel!, and to give the novice designer an appreciation and first working
J wirledge of the basic theory.
Above we mentioned Karwo,'s advice to make use of Stewartson's theory
to design liquid-lifled shel!. 7bere is no reason to alter this reccm-
men-aeion excent to state it mre e:batically and to take cognizance of
recent advances in ou; understanding of the factors. influening the
behavior of these shell. The ory remains the most effective basis for
design of well behaved licuit--dlfed projectiles. Its ele=ents shno-Jld be
understood by designers and -it results s !ould be put to use at every
o protunity. Furthermore, advantage should be taken of the_ increased
ca-aabi'lity for design analysis achieved t-ough the research efforts of
I 37.mrg , Wede-zaey, and Scott'. Ste-.-a.t.son' s basic theory deals only
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I with shell coatamining in-viscii, f'ully-spinning iiquids in cylindrical
cavities. !Bwe-.er, the letter in-vestigators have shoun how to treat
-Dfblm 1movi(1) Viscoas effects in the liouild filler2
(2) Certain types of non-cylindrizaJ. cavities, including tho.;se
j wnith m'-o-fi 1les similar to tie ogival shame of the conventional
arti-Lery shell: 2 f , a
(3) Liauid spin;-Lm effectsae(by a sem-- emirlical apo~)
Rt is in-.rt-antf that designers '-ow z o these advan-es and wie int;end t) is
-'-eoz-t to have- the second-ary sur-posa of pmroiding an awareness of them.
Onhis irill -be done in the- cmarse of ou~r su-iary of Stewartson' s theory by
discussion (be- not deeocetof foiaemlp) and referenze to i~mor-ant-
-aNikiations. An erkensivwe theoretical accotunt of-: tbe advances is no'-
amqxropriate he-ra * Such detail wouild likeely aefeat our pirpose of mi-anlying
a wmeking -apr-eciation of Stmewart bson's basin- theory. ~rhzra Demsign
Ha-ndbCook for icmuid-Filled -Projectiles is to bee pubolished end -willl c-over in
detail all thases of lictuid-filled 7projez4tile theory and design. Acco-r=ing-ly,
this report. is prepared as an interim s-xpolemnt. to MRL Memran-d-ra Report
I l4-77.
*Tehandbook, "Lianid-11illed oecleDsg itobo-bshdn- ~t:he Army Materiel Cbýi -: ee" Hand-book series.
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3II. SvARTSO!W'S TheORY OF S¶1BILT.JI
Stewartzon's theorj concerns the flight stability of a spinning
shell with a right circular cylindrical cavity either wholly or partially
f£lied with liquid. Results of the theory show that growh of the
"anutational co-ponent of the projectile's yaw is possible under adverse
co•binations of the geometrical and physiza! characteristics of the
projectile and its liquid filler. The mechbanis= producing this instability
is resonan•ce between the nutational frequency of the snell and certain
of the natural freauencies of the liquid. When resonance oc-curs,
oscillations of the_ liquid produce a meriodic mnoant (coute) on the shell
casing and lead to the growth in yaw.
TThe the-orj is very valuable for several reasons. --xrst, it mroT•_des
a clear underst.anding of the 3hysical phenomena tbro,2gh 'n liraUids
produce instability of spinning projectiless namely, the resonance Ibehav.ior
mentioned above. This basic mechanism applies to cavities of al'
I ]geometries and not just cylinders. With this knowledge, --e are better
nrepared even for ad hoc design approaches. Second, the theory ora-vides
a cuantitativz means for designing against instability in liquid-filled
shell provided the varioos rea-airements placed on the shell allow use of a
Scylindrical cavity*. O0- course, Stew-a-son's theory is not --niversal in
aonlication but is based upon assui~tions and sitipuations that define
the situations for -ehich it is val-id. Here -we will review the s"t
*Act naily, we can now design for so=e non-cylindrical cavities.
10
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it~ortant of these factors and attempt to -pint- out theiar p~hys icall
iirzestigators will be mentioned and references to their work citeed
Ve begin our :.:_ary of the theory by stating and discussIng the
con3 itqions and assi~ptions on which it is founded. Certain of the st"ion-
jlations are absolute recauirernentCs in that if t-hey are not satisfied the
I4I theory is invalid. Others are ta:keen as a ra~tter of conv~enience to
sanplafy the analysis and to clarrify the r-ole of the 1licirud in =aising
* Iflig~ht insta~bility. An ex~eof an assuamtion of the l-att-er typle i.s
I Ithat the overtuxrning mment is teonly sitgnificaut ape oynac-ic for.-_ orzoment acting on the shell. Dragg, ete., can 'bee inelzmied in the analysis
but are aotI. essential to its develapc~eat. The-re-fore, we- sb"U neglect
the-n to rainta-in focus on the basic featuxres of interactl.ion betw-een the-
4she-l-L and its lic'2id. Distinctions bet-w~en t e tw.o tyn-es of assizumions
oil, become clear in the -oir-se of' Adizussi-cn.
4 A. Assiz~nions of Stpew-artson's Analysis.
(1) Tbe cavity- in the shell is a right circuialar cylIn.;der wboze faxis is marallel to the spin axis of the projeetile. I~~aeywe see
that t~he theory _is restricted zo shell w,,it~h cylindrlical cavritties. Hen--,a
direct- cuantuitative apolicatiom of its resunlts is 1:1-ted to a sing-le
geometrical. shapee. Wedemeyeerl howuever, has achievwed a modiificatiom
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17 -,7 - -
-.3
of Stewartszon's theory through which it is possible to design
for other shames; specifically, cavities whose radii change
slowly along their length. As a consequence, we are able to
perform analyses on =any practice! cavity goemetries. To use
Wedemv.yer's imodification, one rust have a working krzovledge of
the basic Stewartson ana3ysis-
(2) Mie aerocynanic overturning m~o~nt is the cnLv
external force or mcmant affectinc the flight of the shell. We
explained above %that this assu=rtim is taken for ccnvenience.
Gravity and other aerocynanic effects can be taken into accont,
but are not essential to the theeo-y. By. considering only. the
aerovnaric overturning =cnent, we will be able to -esign against
instability due to the liquid.
(3) The shell flies with constant translational --elocity
and soin. This ass -ticn is ccnsist-nt with (2) above but also
irolies that the liauid does not irfluence the spin rate of the
projectiie. in practice these cc&.tions are never satisfied,
Sof caurse. For a meric-d af ter the projectile leaves the gun
=uzzle, the shell's spin decreases lecause it =ust soin-u-m
the liquid. Subsequent to i'quid spin-unp, the shell
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e-pe-riences smin decrease dme to drag. Yurt'hercore, the -rojeztil
enco~mt-ers tzranslattion-al dr-ag. Inn 1--eral bm-re-er. on-- the tran-Siea4
phase of lI-quid spin-unp is con-letee, tedra-g effect'-s arre sufficiently
snall for tbe c-urrment assu=ntion to -ze- reasonable for mast mrojezctiles.
--m. er~- t'n-t this ass-.xmntion dealls -xtb the shhel casing-
not ith the liaain- and rellates to the eacuattion of =tioa arte for toe
j nr~Ž~ile s'tns(. n (5) he -- onzern the =rt mo of tae 'iQuid.
(4) Me- mxos natom of -the icii i a rlidi body --rarnsipion
and S-afl idenmtical to the translation and spnof the projtie 2. Thi
taszsetion. inM cofl3Ufztton it (3). restrilcts ourr consadexrations to tb--
r-uJZ- s-pin zomdiltion of the 1 cuid. !:-: t~heoy- -:oes n-o't consider--
situastioas -U'e tensell' casing and Klicuid have unequal- rii5-~dy
spi-as, nor aDoes it ta:- acn oA vaitios in th spin of" the1 liid.
Wed-emeyer 31 and Scot-t- hzare uerforz-ei anlvyses that an us tof alculatetre ti-e rea-ired for the- licuid- to ~-nafter a mroII
lewzes the =uz-l 'z.in mrac-ticall situat-iors - we --e- dete~rire -4hlen
Stewatse'sa5sutz-Of ion~ e valid. Usually, it is soon
aft.er eaxt ffrmm tbý~'~e Fartherzm-re.. a se-i--mi ical analysis is
aviabeto detexr-dm ine betber instabillity is likely during tZhe tran-sient,
spin-iip =-oeesse. The possibility ofl tbis latter nhnreasbwould be-
guardeS against in the design of all li iuid- filI led shell'
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(5) ib p s-in f the lio~,d and the dfr~ens ions of the-
Ulinitc'aa ca:it -aiy the condition
af 2)cc()
-abere
I~a. = cavity radius~, inchems.
0 =spin rate of the prorjectile (and tberefore th*-e licaid),
rail/see.
q =nagnitd of thbe -resolved gravity and drag ve-ctors,
infsec;2.
2c = height, of the cavity.. inches.
Th T2ivsica2l sigrd~ficanze of this assum-tion is that centtri-fugl forces
ev-rred oa- thee U-liL-:i daue to its spin f ar on shailov any forces i~pozed -by
gravity ox drag. A conseaqaencze of the assum-tion is that the licm-id
(exce-pt .iihen the cavuity is ccopletely filled) has the shamoe of a cylinder
vith a bollow, cylindrical core*.
Eouation (1) =ast be satisfied for Stevi-artsom' s the-oryv to -be usedi.
If -1. shell1 extperiences highu d-rag alonig v a !a spinl rate there is a
-vossibU ;t~y tthe relatiorn ~-"be violateed. 7iben th lciqid ---M not bave-
a cylindrical core, cIme viii dev--looz a Par-aboloidal- surface. Mle
desianer sho-uld alvay-s veif amtiom (1) is zatisi'ied to avoid i--=udeent
a-Uplcation of tbe theory.
AAct-maly a --ara-hl~o]ii -W-ose verxte3x is far fzomx the shell.
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It should be understood that the cuirren-t assuzntio is distinct
from ass'.zmticm (2). The forzer condition concerns external forces
and mozents acting on the shell casin9 -and their effect rn the =otion
of the shell. "Ibe present assu~ptivn ecncrnns the efffect of gravity
(6 She =ass o' th" licuid is szal-l c-- armed to the total
=ass of the -shell1. This assirmdton is one of convenience. It is sa ti..fied
for mrny, shell4 and sirnlifiies th 'eauaticns of ot&icn for the liquid-
shell systen. Ve use it 1here fow these reasons.
(7) She licuid is inccnnre%-ssibe!- an-d invi1scid. The assu--tion
of inconnressibility is reascaablee for the liquids encozinteered in actual
projectiles. Viscoin effects, hcire-.er, camn -influence the behavior of
:Lioui&-flled mroaectiles. ?ortimnately, Wedentýyer-3c has provzideed an
analysis to acccmnt for these effects. 'His an-aly,-sis; involves a bolmdary
[Ilayer corrzection to the basic, in-.isci:d theory. of Stevar-tso. Here we
consider only. the f~ds ntal in-.iscida case and recc~end that designers
o-cone faniliar with Wede~eyeer~s work once they. hav-e Steweartsmo's theory
well in hand.
8)Tie final assunticn concern the natur-e of any variations
to the risid podt. translation and spin of the shell' and liquid. Any,
distuiban-ce to- The shell'ls notion is restri3cted to -- al arlitude
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j Derturationls superposed on its Mrss translation and sumn. Corr-s~onding-
ly. the lioid is assumed to experien--e only sr~al ainulitude perturbations
to its large sca2le translation and suin. 7The assit--ation about the shell
is the-- fariliar -s-al.1 yaw situation associated -i'ith the linearized
eoaetions of yawing ration. Similarly, the ass=cption im-poseed on the
liquid lineeari-zes the- eaimtio=- describing its biehavior. By virtre of
li11earization!, the equations for t.be liquid nations can- be solved and
tbeir res-ult inmrororated into the eauations of the =ot-ion for the shell.
B. Rezullts or Steu.-artsons Analis.
-Al t!ie lasac aszS5ptions and condi5tions ~~l~gSea'sz
the-or-y -.-ere pmresented abo~ve. ?rom these ass-m.j.tofl5 -&e can mae a ual-i-
jtat-ive sta-em-ent of our- problem. !iama-ly, detersnine the ondit-ions for
-.6icb a s_-ýtrric, -a~il sping proJecti-le expill eriencefl~I instability as a conseqience of having liquid (at full sp~in) in a cylindri-cal
ý-Ivit alngits axis. Stev-.art-Isar attacked thi-s problem iz two
I ~ms.es and it seem-s most effective to describe his analys-is in a similar-
I asbion. ?irst, he -consiiered thbe be-hav.ior of, th-e liudin a state of
j amid rotation vithin a comt-airner t;hat cou"Il perform =)'ios Si;l to
those- of the Yaw.ing ='tion of-: a sheill . Z-- then wzobined the Duroblem
soluation he f ound for the licraid wdtth the eamations of Motion for a sh-el.I
U=o anal.ysis or the resulsti-mequations ilt -wras ,Lomid that 'under certain
adve-rse cond3itions the Yaw Of t1-1 shell 'Wil grow -vitivout limit.
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71b describe- the behaVior Of the liqaid, we remember that it is
confnedin a -ontainer and that its basic motion involves rigid body
snPin about anl axis withn fixed dirrection. U-pon ass-,-i-ng that the axis of
the contain-er is siubjected to a sczalll distlawbance sikilar to the yaviing
m~tiOm Of a strell', it is necessary that. the liquid also
axroerlen-ces adisturbarace to its basic =otiom becawase it -mstz4o
o1-0i0a tine walls Olf th-a cwiity. Stewartson's soluxtion show~s that the-u
liquid confe'm-s to the carrity motion tifro-ugb the exitation of smiU
am litude oscillations su->erc-osed on the rigid boyction. Thenre is a
inf-iimite muraber of discrete frec-enzies for tUhese oscillations - the
ntrlffreonencies (or ignraecs)of the spinning lionid. ]For an
-~ azbitrary motion of the con~tainer all the natural freaueancies wil be
jexciteed, bu~t ini -arying degreeas. if. bowe-er, the cozntainer yer-fozrns a
vain =o ~tlom at. cerltain of- the eigenfrecaenzies off the 1-;,id, oscilla:tions
at this f'ýAGme-ny be ome Dredom_-inantu -thatu is, a condition Of re-sonanc-e is
established. -As -re shall des=_ibe later,*i is tlis eonanc that" lads
to instability of a 1l-iqn_ fil-led projectile.
We shaiemnhasize that the oscillations mverfor-ed by the :licuf i
arre of sralll amulit'ue. Slohm Adoes xot occuzr, blut a wave pattvern, is
- establishdi thee longit. in al, ra.ia, and circt~ferential directions
of the ca-vity and there are modes mumbrbcs* associated with each direction.
For p-o'ble~s of projectile stability, am infinity of the possible
*Ttbese can llbetougigt off as f~nd-mntal wave patterns and hwazrnics.
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longitudi• and radial nodes are sis-miicaut th__e-orettica!!y, but only
the_ first circumferential mode is i--vortant. Tais circumtace is a
result of th•e fact that t~he pressure fluc:tuations produced in t•e liquid
Sby, this mode lead to a periodic couple (vith the same ffrecency as the,
of the osci~lating liqauid) an th1,e wal of the container. it is this
Raw, -.- I-t e~plain bow the nat -requencies of Vhe_ liquid are
determined. Stea tson's tdi eary gi-es tese frequencies in a colicatoed
resation of thee forh
2 5i; n 1, 2, ,- (2)Sj = 0 , --, 2 , ---
by~~ t=i rdladitoal wderoi cum~i (ith- theba sof deoes nc ash tradia
j = longituinal 'a.-ve n~beer (2j+l n= n--•br of npds in
tUn longitdint walls ote c t rhern)i
r~~~, we au t epan e hentl frequencie of-: t7he lioidarc ~ 3a whoch re.r9 rjctl ntbe
r,= the atioei requcy of the njo =de,
iii1.,,. 2
2a = ditmeter o f cavity.
2b = dirae••er of the cylimndr( ical air core,
2c = cat.-t:•a len oeh.
; ~18 •
Page 18
Several. asnects of Eauation (1) s~inld be nated. First, the eigen-
frequencies of- the- liquid are dependent upon the cavity geometry tbroughthe~~~~~~ raiscaadb 2 . The.- ratio -b2 /aF is the air -c. ntecvt
I expressed as a -raction of the total cavity. volir-e. Hence (I- b2 /aF) is
the fraction of the ca-wit: occupied by liquid -et-enoehate
eigenfreonencies depeni upon the- longitudin-al mode nuzber thbrough the -
ratio c/a(2j-1l) Saonearingg as a v-rariable in f..This is a fortunate
ciremzstance, because once i.- 2 is 1-mou-n for a seeI of-: fixed -values of
c/a(2j+1). , 2/i , and n. the eige-n-frfequeencies are knawn for all loaigiý-
atudi-mal mdezs for vhiCnh; c/a(2j-91) ecu-al-s the- set vralue. Finally, Equation
(2) sboi.-s the frecu=-ncies arre linearly related to 0, that. is, T~is
indeo-enden-1t of -0.
As memtioned above, th fun ctp:ion in Ecua-tion (1) iz a complicated
one andI It uastq be evaluated n=erically throug~h rachima detsermination of
t~he -tles (singuplarlities) af anaotha eqruatian appe-aring in the Ste--aeuson
analyysis. Mie eigen-frequency (poles) partion of Steiiartsom's -alsis
-no mra than r- mumericall tabnltion of selecteed vzalues of T.~ c/a(2j+l),,
b2 /a 2 . and -a satisfyi-:ng 7Eq=aton (1).
Aumeendbc B contains the tabulatimom of I-= Arag-enment of the Tmbles
i s as :Pollo-rs. Eacdh sheet is for a fiLxed value of the Darraeter ba
I ani contains a col= headed v-;. and coli= rairs h-ea~ded cja(2j+l) anI 2fobr ze-ea aleof ni. 'in _d the aleof 7~~satisfyi.-ng Equation 1
*T-.e significemne of this ci dlbe exwlaimned later.
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for given values of 1,/a2, c/a(2j+l), and n we proceed as follows.
to the sheet for the specified value of b2 /a 2 and pick jut the colirm
pair headed by the proer value of n. Next, read do-n the c/a(2j+l)
"colm= to the assigned value aui read to the left to deterine T -. WhenC
the values of b2/a2 or a(2j+l) do not appear explicitly in the Table,
Slinear interpolation is to be used.
'his ca--pletes om- discussion of the natural frequencies of the
spinning liquid. We have sbown ho-i these fequan'cies deedupon tbe
fini the fre-ajencies fro= Stewsartson's Tables. ricri, we turn to the
-uestions -f oow and wLV=n instability of a liauid-filz1led shell is produced
by the oscillating liqucid. rib begin -F recall our as.=ions that the
overturning mm:it is the only significant aerod-ymaic force or o=eant
Sa•ng on t shell and that -e_ are d-ealing with small yaws. Under these
conditions, the rh~tion of the shell (without the liquid) is governed byI the r-eltions
iD-2
w7-re i. and 1 are, resuecti-ely, t:e axial and trsverse zonents of
inertia of "the shell, and
20
Page 20
I_ is the complex yaw,
t is time,
. is the non-dimnsional. frenimen2y Of the motion of the shell,
s is th- gwsco'oic stability factor.
Equation (3) represents t- form of the motion of the sheU and the
-ahlues of 1 are mrvided by solution of E(ration (4). Sinca E quation (4)
is -uadratic, the latter are found easily:
- IL |l H: ½ (i + a) frequency -5
- = ½ (1 - g) -Precessional ferency (6)
-2S
r= n "
SSd, -2M X. CU -r
= air daesity,
S reference area of, shell, usuilly th cross-
sectional area.
213
I
Page 21
n = twist of rifling, calibers per turn,
d = diame-ter of the shell,
M=-ass of the s==eU,
=a 3Todnamic c've-rtur~img mament coefficient.
It is adva'cageo~zs to recall beree that the shell-- is stable (the
yaW. d:Oes aiot VrOW with tire) so l.ong as -. and T7, are real quantitices-
To achieve this situaltion we ust !hav- c greater than v~n7e. a familiar
condition for the axyroscopic stability of & projezt-ile. if s is less
than 3ne. a arnd t1herefore -.. and -., lbecocre arzaginary. and- an, exponiential
grolwth or yaw Occurs =
Im
Earlier. ve stated that the oscillating hia id proiuces a nocent on
the casing of the mrojectile. Now wie =4st describe that Mament in
functional for-- and mDiify Equation (4) to incl-ude its effect.- Ste--wartso:n
sbo.wed thatt w.hen thie ifrequency, iof the projectile is near any one- of
t~he natunral frecueancies, vsof heliquid, t~he roc-ent applied to the
shell casing is given by
Il
-O I2(;,)f/42
ii -
22
Page 22
where -14 is the m:)m;ent exerted omth she-ll by the liquid,
I i is the- freauency of motion of the shell,
o is t.he density of the liquid,1T
!I(i-.., is a~smaill) constant depending upnonr ani is always positive.
'The quantity P.,~ is the res-Ifdue" of' thie Tables of' moles and residue-s,
and wre see fro= Equation (7) that it gov-erns the =agniitude of the liociid-
rkx-ent for a given cavity and freauenc-y, ... 3 Every, possible frequency
and modal -configuration of the liquid imnwvnl'- a specific value of
and these values are listed in the tables ad.~acent to C/a(2j+3l). When
-r-3~ is obta!ne-d f'--3 the- tables, the -corresponding value of R jis obtained
I by reading to the righit of th-e value for C . With regard to the
-esidu-. it- is convenient to point out a significant fea-ture of.t
behvior as seen in the tables- N-=ely, for an.; specific value of freqcienny,
r-. t~he residue decreases greatly Ifor each succcessively lkrger value- of
n (i.e., 1ý decreases with increasing radial mi~e rnu~ber). Maus, theV
higier radial zodes produ~e relativwelyj weak 1i ud~nts. In practice
it has been foun-d that =)sdes be-yond n 2 are seldom strong enough toL
cause shell to be imstable.[
ii he rma3ent dtue to thle liquid is a forcing Afuntion on the notion of
th hell. 71ras to account- ftr the uresenze of the licaid in t~he ecraa-on
of- rtion of the shell we add E-cuation (7) to the rig~ht-hannd-side of
Ean-ation (4) and obtainj
I - -- - - -- _ _ _ _ _ _ _
Page 23
- T-Y + ULL -c
41 L
wieefrzoInec.-0hsbe rteni lc f t ~hsz
is cnerton for -.nveience rr h as benaritninpnarte ofu~n. of Courzn sie.
t'hat. s > 1). Here, we shall onuW s'marize t:he r-esult-'.s of this solution.
It is f ound tha"t wihen -., is close to ',:!t:e pr-ec--ssico--' fteauency, noW
instalbfllit-y occurs. -Boezer. if -. is near tbhe nuttational fr-equenzy, ,
Ea-matin (8 has the roots
Pr -- Pa'[ (-.))
T!:e condition for instability is provided ixrediattely by Equiation (19)..
When the quiantity =nder tte rs=dicall is negattive, v has ýa naegative 1=agi-nary
pa-rt as w-e see by stfrsVIz.atinig (9') inta (32):
o(ll
ex 2 texn ut
-Zhere-
pal-
4CI.CL
2!:
Page 24
Thus. an exwn:ential growtbn of th~e n-utational comp'Onent of yaw. occurs
when
11
or, written m-re conveniienttl:, -Xnen
-1< 0 -,T. )/s < 1 -iec-anlition for (iins tabilit-;
v.iere S, "Stew-arltson' s Pparameter, i
WEcu cation (U1) is satisfied. t~se rate of growtýi of yaWC is
P-quation (10)] =J~~~2,(2
orJ
22
Fig-u-1 is a -pot of (2yS2)a against (z0.i.. )/S2- Th:is reson-ance dW
ciwre, as vweU as e~miainof Bomtos(11) and (12), seres theI
______ ____
Page 25
1' 0
CLC
44
I-. -
Page 26
instabilit~y to be sitrongest when T-=1-i- For n-on-zero values of -0T
the yaw growlth rzate decreases until it ranislesfo 1 c- S-.
'Eqations (11) and (12) are the basic result-s of th-e Ste-iar-tson
412eory. "Ihey permit us to calculate the coaditionse produazing instability in
a Siven projectile (and t~here-fore the ne-ans to a-v--d th~ese instabilities)
and to malculate the steghof the instability.
Appendix A providdes eyxanznles of tbe- use or- t"he theory in s~hell design.
Tv rg'r to use off t:e teor for auantitattive design, a cauttknaryi note
i~s advisable here.. It, coacerns theý theoretical limits of 1- avzea'in
J ~ in ~xain(11) -which wrere der.ive.d -mder t:he ass-.cnntioi ths t1 the liquid
is in-viscid - Wedaerýeyer and Karpo-w ~v show.n tliatl viscous effects
c-an exertC a sinfcm vS-ez on the shame ofL the-- reswi-ce M~-~Te
inflenceis -ie~~strated qualitatively in ?iggure I wl:ere a remresentative
resomnzne Tir-.g- for a viscous lI.-nird is -danalong ith he cu; p-rovilded
by the inviscid amaal-ysis. Vis-cosity is seenn to decrease Vhee neak vwaluej
of a. noweve-r.. it also bmdan the czr Inl fazt. . with viscozitv, the curve
never becomes zero or neggative and the liquid alvays tends to cause th1-e a
to grow. ~aeeon the -wrings off the crea' -s very sm-aUl and zan be
Overcome by aerrodynanic dacxnping in ac~tual -.-act'Ice. En"Oe, the ]inits
(in Etraation p1l)) to be used in ora-ctice =-ist%, be established ky the-
shame of -the viscous resonenze cur-re and the zagnit Ae of aerodyn-anic ds"Azig
We mention the effects of' --zoit hOZ.-. ere bcseindiscrlininate use of'
thetheretcal liiso 1 appearing in 3azuation (11) could lead to an
27
Page 27
iipop-verly designed sseU.. Sver:; d-2sign-t~r is advised to study "Wedemeyer' s
viscous correction to Stewartso.2 s th~eory oie he 'has be conee familiar with
the basic, in7is-zid analysis-.
The vrevious discassion has surr.eyeed Ste-wartsom' s analysis of the
instability of liquid-filled shell w&it~h cylin-drical cavities. The.
mnec:hnnism -roducing instsbility is reson-anze bnet-ieen the nutatio!2al frem.uency
of the pojectille ani ertain of the eigenfreane-ncies lof t1-- spinning lic-iid.
Ior th-ese eigenfreqne--nci;es, the- vpess-:e- fluctua-m-tions in the liquaid p-rodirce
a -aerio'dc m-aent on the walls of the cavity and this w-nent continuously
Lincreases the y of the p--ojeztile. The- tables of moles an residues
calculated fron the analvsis mrovide z7he- =--a- to deternidne the Uicuid
c:.lindcr dimensicas that will camse a gi en 1 el.i to b- uimstable,
and3 to ~tzietestr-ength of the instambility. Thus, thCe theory emnables
us to -ýkae a v2riozr design, against- instabilities in Ucquid--filled selle11
-When a cylindrical cavitty is ezrplayeed. If other design considerations alaaow
t:-:, use of such a cavit y, it se"l be -ased bo ass-.e a we. -r'ling
ooectile - W~hen rec. -ements demnud oher than a1 ynri al city,
evere attt- sho-uld be --de tD have- the --ont,-iner satisfy the conditionls
used i-n Wed-=e-j;er' s analysis --:or non-cylind-rical ca.ites - Then the
design-r stillj can- perfo--= a cuantitasti-ve stud- of his she!-'
The.re a=. situatticas where it is necessary to use cavity
~eoetresnot covered k.-j the =analyses of Stewmartscm and eeyr-
-Tat the cavit:-y r-ad5us changes slowly as a function of' ca-vity lengt-h.
* * 28
Page 28
An ad hoc design approach is then necessary. However, even in these
cases Stewartson' s analysis can be nut to o'.ialitative use. Fobr even
thnough the nuierical. results of the theory no xt apply, the Mechanisci
for instability rems-ins the sarne: resonanze bet-ween natural frequencies
of the shell and liquaid. With this understanding, the astute designer
possesses valuable guidance for selecting and m:Iifying cavity geometries
to achieve a stable Pnr1ojectilee.
Steowrsn s hieory and the -,iork of Kaxwov. Wedaeeyrer, and Scott
provide tine shell designer vith r-axderfv"1 tools for design against flight
instability of lieuid-filled projectiles. To use these tools, it is
-eesar to have a 4fI=r =miersaj of the pbysical ba~sis azd signifi.-
canZe Of the theoretical results, and the n=-erical tables reauifred for
quantitative uiorrk. Ma this report, w.e hone to have supplied a partof
bothn. Tob give the tables is a sirle task, and those- contained in App~endixBshould satisfy the reourirreze-nts of' vitually- all desig mroolems here
-v et: " l i rdr
the the-ory is applicalee. To give an adequate descriptioz of the th,,eory
i s a =aen more difficult Dnroblem. The fall =atbi.ratical aalysis is both
oD=plex and tedi,,ous, and we recognize that its idetailled pumrsm-ft is beyond
the t. e den an.ds placed on cost. designers. In onterast to the athesaticsm however, the hrysical resno fhena associated with instability of li.qid-
filled shell are relatively sit le, and familiar to the designer. s tus,
.-- -- :29
.- __= _-_=:: =: •sesss vluabe •anc £orselctin an mo•.f• cavty gomerie
Page 29
ve bave atteinpteed to si=;arize Stei-a.tson s th-ovry by stressing the-
,ihysical. significsnme of its basic assiriptions a-nd results. O.-ice the
daesigner ims the-se la-torz well in had, --e is pr-epared to apply
Stewartson' s results to pr-oblems of sheell. design. and to smudy the -more
recent advanmes a--bieved through- licuid-i'i led sbe~ll researcn.
39
Page 30
J B ." As an R. M. GuTn erse,• "Inw • • s . - t.on •in fte•; Exte-riar•J.N•.
S -
2. (a) B. l.St'artson Dynatmcstbly of aiud3Pe Shell.n A-ids fontDeigners:
a) Milneds Jornal~ b) Sluid aeanics, Taole. BM, Memranu 4, 1959
14 77,-= -1563.
(b) A.G deailed, account oF' 1()d itrscoe ahepEicetio of Rronetilsis
N=.e oAs nd Reoac. MLs GuneD-rt 132,"InOscgtobes 10,t55:-7r.
BalitcsofSel ith qn-oid ?ilersd Shell: Razneseanch
mI
FounBation., Dynamic reortudrA??ojc !o 17 L 90
Ef)c ofiViecsity.. BM Steapoton 129abls 31%,65.aiii
2.(a) B. G. Karpov, Exermntalc oObservat-onslef thee. yA~ids Bo esineors
1o77 Mayd--ile 1963.M eo-t17, uat.169
(e) B. G. Karpov7, Dyaicsaftaid-Filleed Syosoe:l InetaffectofRyno
D~unriong Rsoinanc. m: mmoan Report i629, Octobery 19.65.
()B. G. ltirpov, Dj-aamiccs of Lianid-_Filled 3"hell: Resonance and
of Lia;ind-?iale Caveties BM Report 1332, August 1962
3. (a) E. H. Vedemtyer, M"e Unsteady Srii r Within a Spinning Cylinder.
BLM Report 1225% October 1963. Also: o. ,luid Mchaics, Vol. 20,
m~art 3, 1964, W 3133 399.
31
(a ealdac~to ~)m•isapcto c•~c•e sJ°E s - . .Gnesn netgtos nte Se•
Balsis -.-- e!Wt ----n--Soi •~r, •------ ---sea --h
Page 31
1()3. H. 'WedemLeyer, Dynamics of Liquiid-Fil-led Shell1: The-ory of Viscous
-& IICorrections to Stewartson's Stability Problem. BRL Report 1237,
' 1 Jue 10965.
(C) 3. H. Wademay-er, Viscous Cor-rect.ions to Stevwartsoan's Stability
Criterion. BR1TI Report 1325, June 19,65.
*(C) B. H. Wademey-er, Dyvnamics of Liquid-Filleed Shell: rba-Cylindrica1
Cavity. Bm.L Remort, 1326, Augus-t 19,66.
1*(a) W. E. Sc6tt, The Free Flight Stability of a Liquid-Fill-ed, Spinning
Sbell. Part la - Non-S-Pinnin-g LT7ccpreessible, Mmr~iscid Lis-anc,
Co~ole-.iely IYuilee Right Cy- ind-rical Cavi-ty. M:. Report 3120:',
December 1,060.
(b) W. E. Scott, Zhe Yrea Flightl Stability of a Liquifi-Filleed Sh-ell.
Part lb - Incomnressiblee, Tbwiscid Ligaid; Par-tiall'y Filed, Right.
Cylinlrical C;avity. MIRLA Rep--ort 1335, July -10.61.
(c) Wi. EL Sco'tt-, 7b-- Free IF i-ht Stability. of a Liwaiii-Fill-ed, Spinning
Sbhell. Pat2a - Spinininz, inco.-mpressible, Inviscid; la.iqid,
Cao-mlemte-17 -Fil-led, Rig~ht Cylindrical Cavity. BML Repmort 1233,
Decemb3r 963.
(d) Wi. B. Scott.. A The-oretical ½lssof the -Axia1l Spin Decay of a
*Sgin-Stabilizeed qiuid-Fil-led Bhe,. - Rew3rt iV7.0, Argust 19,652.
32
- --. ------------
Page 32
A.PP~rLDIX A
BEmxales of D-wesign of Lia'±id-Fifled SbellI
-Tbe dasign zroblees contained in th-is appeendix have been extractc-d
AVithoult ch=ange from 3RL- Y4=r 1eor477. They provide lucid exa-.-les of
the design prozedure for shell -dith =ylind-rical. cavities. Wheen -wrorkinZ
1.7=ougi thne exea-les, tha read-ar will n-te that Ste-warton :rtio for
instablity Equ.Aton (ai)) is used with thbe li---ts -3.9, and +-2.7.
The-se er reco--en-ded for design pracctice prior to iVed~e~yerls analysis
OZ NvisCUS SA'fects. H eret we have not chanrged the limits to --h6asize-
that tetheoreti%':cal (invistcid) ones o--:- 1 ofteen require modIfi-cation as
AdIscuss-e: in Ithre bodýy of this repor-t.
'lo
I3
Page 33
7Ib illustrate the use of the tables. we =ay consider tuo cases:
a) new shll.!, and b) existing shell. For the new sheell it is important
to know, a priori, the cavity dinensilons which will give rise to resonanme
between 4the fluid oscillations and the ntztationp.1 frequency of the shell1.
T!.e designer, thefeCf-re, should avoid tbese dimensions. If the existing
slhelll is being adapteed 'for carrying liuds.i si ratt nur
whether its c-avity is such as to lead to -resonance an~d. Dresuzably, bad
Consider the-- case of a new shll he designer shouild estimate the
mom-ents of inertia of tbe einpty shell, I, and I7, and the- gyroscop~ic
stability factor, s. from wihich to -omrate aT. With these he conutees
the nutationall freoquenzy
1.t might be adequ~ate, at thnis stage, to usee avp-v-Oxinate for-z"Aae
L. I and
I,. 0 .51,~ + 0-059~4 =E?-
wh~ere m= =ass of thell
d = ia--ter
L = overall length
31,
Page 34
Th-e wyroscoDic st-ability factor
-2S
and -S. =turist o--: rifllng in calibers per t.nurn. 7-4 can bee 'wrrtte-n
M o.Sd K2M~~~~ = ~ ;( cg) C_
weecn cezter of pressure, in zaJi-Ters
cg =Center of gravity, in cal~ibers
=ý wr flbree coefficient
ep and -C depeend only on the- exterior shame of t~h abefl anid, hence,
remain invariant withn Ithe changees in the ca-vity dimnesions.
let us c-onsi-de-r, as Pan ex--=le, the l05=. chemical shell for 'which 'we
have either es~tirnalted or measurred the fel-ow-ing characteristics:
105= Cbe-iical Shell
I, =0.56 lbs ft 2
T7 = 5.56 lbs ft 2
s = 1. 2; ;7= .41
=0. 07
35
Page 35
II1£
IThe geometry of the cavity is right circular cylinder with the
diameter a = 0.13 ft, and with the finenres: ratio, c/a, so selected as
to aoid resonance condition. The cavity is to be filled to W50 by a
liquid of density o = 62.4 lbs/t 3 .
The prob!em is to find wbich fineness ratios uill lead to resonance
and, hence, are to be awioided.
Lblo this, e tnrn to the table for -e-a? .05 (9$ ffII cavity)
and lozate on the Uin-'- 0.07 the corresponling values of c/a•. 'o "- - " •j - 1
and •ssoziated residue. 2R, in each of t be three cobri .airs. We faind
..he folloeing:
-or T = .07 C L I2j + 1
ist coiu-n Mair 1..OT8 .212
2:0d co!-z pair .5C9 .02_52
3rd colt-- pair .320 .0067
Therefore. the resonance will occur at the follow-ing c/a v-alue-s:
(eI,• = l.07o (2.j + 1)
(c/). =.51a)cjP (2ij + 1
(cfh= 20 + 1)
36
Page 36
3(Y3X c/) (c32)~
IID
e5.39 2-51.60
3 3- 57 2.24&
_4 459 2.88
5 3. 5 22
6 '4. 16
?aluý- Of the3 nutatio0all frec-aency, T, , remained constant. vwhile v--e hanged
c a. L- Pra-ctice.. Of courze, -.- will' change be-Canse T11 I, and aall. jjfl
wit 2hang.- s in z/a. 3u%.thesem can bi taken into~-
accoiint at mra d~etailed exa=Lmmtiamof 0?tbe situa+tion in Lh-e vicinity of'
the S3esired zia ratio. The- -piesent rougbn sur~-ey stakes out only the
danger areas.
The abooe- table zhoics a fairly; lar-ge- 7zbrofness ratios ;~b--h
are to be o-ted in order to escap-e resomiane. Ho-m-e-mer, the situation isj
w~t- as bad as it looks. T.-'e third cb.(c/a), , conarins- a greater
n'i~ber of entr-ls. But because of the verxy -- 1 resi~t-Is associated withthis coli=, the -coincidence of th ~~1vl~ fc/a wiith tabulated
muue st be: ve-ry prreacise for rescmanncee to o~cciu. 71bis 'can be sbmoun as'Using tbz .si~ies giaven above, -.,a -oc thequn.a-
37
Page 37
foIec2R caCI=Frain cn erwitna*Ir
I1;)1')] .
a
32-d --39 Go, I < 50 r(g) -(g)< 2
lahe-re ()are tim tabulated values as given above_, for ea!ýh -ol ari ar.,
a!
the- a~bovve in-stability con~itioms the differeane in t1.he vic!-nity of
tzablateed fineness ratios a--w!~ acttiaŽ desigmed valbueaz -ust be very
sal br tV -r o~m ess or the 2nd ccoli=, and still less
critical for th 1st col=. in practice, therefore, the coincidence
.itzb tab.aed value-s in te3rd col=i is li1kely. to '!,e pazrely zfrtuiJtoas
becruse one us'ycanot design th cvity vith tereauireed prneci-sion.
Sit fine-ness ratios anpeaeing in the is'. cobzn are tbe =)st iz-ýOrt~azt
and should, th-ere fora, be avoided.
MMEHE 2:
Tbor th se'cond case, ~-.-,-y considerte - O5=nc als
*Nbte tb-s of -. 9 - 1 2.7 uzen .-- rx ra~bx hn t--Oei~
Ii=-ts oi- 1 Se_-: ccýnt att beginning of thids app~endix.
38
Page 38
• I iI
Let_. -as supp:ose that the -ineness ratio of its ca-rity is = 3.2. We
-av_ foh'on already that this finenýess ratio should be avoided. But, as
San i-!ustra-ti;e ••ey e. -.e shel! r-roceed edi the analysis of this case.
Le 4i-±. 3.2317.1Da a (62.4 .37 xa
A= 17.8
"*n--e ,I- on.tton -for i--t-- iity, is, therefo--e
-3-9 < (17.8) < 2.72R
Le- --- 23
Since the za'-itv is to be _iled to q5% e use the table fbr b~/a= .05.
--- -- Tal "ja 2 = .05
___•c/a 2R B
0 3.2 - -
1 1.06 .06 9 -. 553:. =_ !.o67 --6.05 - -L
2 O.64o .23 .1d: 26._
S.... •3 0-b-57 :o- .6,57 Se:•
. 0.356 .- b .013.62 83
5 0.2%1 - .0182 -
6 0.246 - .0036
39
A
Page 39
17he restri~ts sho-i that- for this cavity, c/a - .,an 95 fl th- sb-1U
is p~redicted tolea iznstabl~e for j =1.
The y&~&ua~c roent s Doortion to the residues at the roles.
Heconly the leading poles, low~er j vahmues and a~ssozinated lar-ger residu-es,
arre t'-e ms-,, i~pOe-m.
One of t.oe -possible rend-es is tD Itry to ??'"g--te &-!!etry of the
7b-- Effect of Cbandng C& on 105zaShl
Values of-: -B"'Ij c/a = 283.0 3.2 3,11 3-6
122 -.42 -. 55 2.3 3.2
2 2i 26 126 25 29I
3 39 9100 92 722 5
-13 51 5339 101I5 153 37
j Thiia, this shell- is uastable for c/a =3.2, as ~r-i-SIODsM, bOU&t
also is dang-exrusly, closee to instability z-Lr values of c/a up to 3.6. -:brI i,c/a 3.57 for ez-mpe, it. is wnstabile frj o b .l
15-.6
4 - -40
Page 40
"" i
1 mI
A-tbehr possible remedy is to alter the air space or fill ratio. The
"folloving table +_ n-eyz some sense of sensitivity of itability condition L
to v2arious eir spaces.
7he Eff-ect of, ChAnzing Air Srace o-- Stability. l05=n Shell
c/a= 3.2, j=l, 2la• ~2j +l!
* ~b?/a 2 .
DO .-87-
.02 -.87
.05 -. 55
.A0 .16
.15
.20 1.8
With he_ f-ineness ratio of the cavity of 3.2, the shell is mstdble
for fill ratios fr--on W,;, to 103. For this shell. t-here1bre, witb a
fineness ratio of the cavity of 3.2, csnging the loading conditions is
not an effective means of rezed-ing a bad situation. jAnother exa=le:
S2t shell 90% irdl; b2 !a2 = 0.o0
1 1 2.4~ g=--c= 7 0.155
T- 251.6 9=-czn2 c/a 2.68
- .8a 0.77
D 3 -ms/e:-ý
h42.4,.4A "'2.7 =18.3
I3i I l
!A
Page 41
and instability criteria becoes:
-3-9". O9 < 2.7
d a-2j + 2R B
0 2.68 - - -
i .893 .; .2633 n1.6
2 .536 -145 .0523 -2.11
3 .383 .26 .0305 33
S.2033 .0,3 .0365 -126•
5
The sl-_l th-ere-.re, is slble if ome uses Stewa'-tson's -ts of'-
but is vnstable fbr j = 2, if oe unses l=--its -3.9 a=-d + 2.7.
!
-
Page 42
APS~IM]X Z
MTABIS OF -loi?-S MW~ RMsfas
Ti!- tabo'-es -::,0 b1a o., 0.01 ed0.03 were -nt eifteended, and
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Page 43
12 3
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.00 .9C5 .000 .478 .0000 .3; .OCS3
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1.066 .181 .516 .0223 .336 .0CS,2z 1.091 .246 .530 .0307 .345 .00o8.3 1.117 .313 .544 .0396 .355 .01,1
1.1A .3S2 .559 .0491 .364 .0o391.2 .4-54 .574 .0591 .375 .01,3
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" 1.565 1.392 .7-4 .2169 .523 .06491.612 1.491 .820 .2369 .541 .0714
= 1.662 1.593 .82.8 .2581 .561 .0783
1.715 1.698 .878 .2805 .582 .08p3I. 1.771 1.805 .910 .3043 .603 .09=.,,
1.831 1.914 .944 .3296 .626 .102-,.-.-8 1.895 2.026 .980 .3566 .651 .1118.50 1.963 2.142 1.019 .3853 .678 .1220
b2/•a2= 0.00
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Page 44
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0.30 1.443 1.105 0.727 o.i6o5 0.477 o.o4a
0.32 1.4+85 1. 196 0.751 0.1765 0.1+93 0.053-3
0.34 1.529 1.289 Q.776 0.1955 0.510 0. o59z6
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0.38 1.626 1.1+81 0.852 0.25Ol 0.5-.9 0.0721.
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Page 45
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Page 47
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Page 52
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Page 53
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Page 60
Unziassified
U U&M 1 UMMU D&TA. K 4k
0 9PRT 9COfrTV CLAlClO¢CTOW
U.S. Ar-r 1ifli-stic Research Laboratories L •Aberdeen Proving Ground, .Wrjland
IK9`OWV TSTL9
DYNAIU(S OF IIQL -FILED1 SLTELL: AIDS FOAI ISIGMERS
a- o~icm.avvgv .0135 erempmwe h.wha. in*.jivia"
S* John T. Frasier
SP? 0TAIL~ TOTAL U4O. OFP 0*63Decemer 1967 67
OW COTU*CT ON 6880? SO SOL OIONATOWS ZO?
FiRm lTG0%50IA33D Memoranda Rep-ort No. 1892
_ Supplement to BRL Merwdum
__________________________ Report NO. 114T
Ibis documnt has been amoroved for public release and sale; its distribution is %
_-S _-W MaAjt.teriel Cimd
'>Ballistic Researoch eaboratories Msmorandum Repoirt 17 [.,7.-•, D. 1963)".iicludes
a discassicn of Ste-wartsox's stability analysis of liquid-filled projectiles, andI - e• of Poles azd Besidnes" needed for •qamtitative cesign use of the analyis.
i ricus design prcb•ezs show that an extended tabulattic is needed, and the presentreport provide-s this extensicn. 7enew tabulatiai (Appendix B)eo-vers; a nca-di- sical frecruen-cy range of 0.00 to 013in increments of 0.02 and a range ofcavity fill ratics of 20 to 100 percent in imaXLde incremnts of ten .•ercent.
A brief descripticz of Stewartson's analysis is also given in thi report. Ephasisis plarceed ca the t~sclsit-ifiScance ef the ass~tias and r-esul2ts of. the terrather than its matbenatical detail. Mbe intent is to zrG--ide the novice designer ofliquid-filled shell vith an appreciaticc and first vortdng knowledge of the analysis.Additicnaaly, the smry of the theory is used to roint cut the significant advancesthat have been =de in understanding liquid-filled shell prblems since thepublicaticu of Ballistic Research laboratories Hearandm Report lo. ITT.
OunSaW i a we v IMW6 a new m WD = 1473 -. |.'. r - wsc
i |A;
Page 61
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Uiqui&.-Fi22ed ProQ7ectiIesProjectile F-ligbt StabilityPlight Mlechanics I
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