Mathdictionary,radiusradius definition$Mathdictionary,radius_of_convergence#/radius of convergence definition"Mathdictionary,radius_of_curvature!Kradius of curvature definition!Mathdictionary,radius_of_gyration hradius of gyration definition)Mathdictionary,radius_of_normal_curvature(~radius of normal curvature definition Mathdictionary,radius_of_torsionradius of torsion definitionMathdictionary,radius_vector/radius vector definition"Mathdictionary,radiusofconvergence#/radius of convergence definition Mathdictionary,radiusofcurvature!Kradius of curvature definition"mathdictionary,Radius_Of_Curvature!Kradius of curvature definition!mathdictionary,Radius_Of_Gyration hradius of gyration definition)mathdictionary,Radius_Of_Normal_Curvature(~radius of normal curvature definition mathdictionary,Radius_Of_Torsionradius of torsion definitionmathdictionary,Radius_Vector/radius vector definition$mathdictionary,Radius_of_convergence#/radius of convergence definition"mathdictionary,Radius_of_curvature!Kradius of curvature definition!mathdictionary,Radius_of_gyration hradius of gyration definition"dictionary,radiusofnormalcurvature(~radius of normal curvature definitiondictionary,radiusoftorsionradius of torsion definitiondictionary,radiusvector/radius vector definitiondictionary,radixradix definitiondictionary,radix_fractionVradix fraction definitiondictionary,radix_point0radix point definitiondictionary,radixfractionVradix fraction definitiondictionary,radixpoint0radix point definition#dictionary,radon-nikodym_derivative&Radon-Nikodym derivative definition dictionary,radon-nikodym_theorem##Radon-Nikodym theorem definition"dictionary,radon-nikodymderivative&Radon-Nikodym derivative definitiondictionary,radon-nikodymtheorem##Radon-Nikodym theorem definitiondictionary,radon_measureBbbRadon measure definition*Riemann-Stieltjes measure definition#dictionary,radon_nikodym_derivative&Radon-Nikodym derivative definitionDictionary,Radius_Of_Gyration hradius of gyration definition%Dictionary,Radius_Of_Normal_Curvature(~radius of normal curvature definitionDictionary,Radius_Of_Torsionradius of torsion definitionDictionary,Radius_Vector/radius vector definition Dictionary,Radius_of_convergence#/radius of convergence definitionDictionary,Radius_of_curvature!Kradius of curvature definitionDictionary,Radius_of_gyration hradius of gyration definition%Dictionary,Radius_of_normal_curvature(~radius of normal curvature definitiondefinition,Pure_Surddefinition,PurelyDiscontinuousdefinition,PurelyatomicȜdefinition,PythagorasTheoremSdefinition,Pythagorean_means)definition,Q_Binomialdefinition,Qr_Algorithmidefinition,QuadraticCongruenceƝdefinition,Quadratic_Congruence definition,Quadratic_convergencedefinition,Quadraticconvergenceٜdefinition,Quadrilateraldefinition,Quality_controldefinition,Quasi-ConcaveXdefinition,Quasi-Newton_Methoddefinition,QuasiConcaveAdictionary,Rational_Form0rational form definitiondictionary,Rational_Functionmrational function definitiondictionary,Rational_Number.+rational number definitiondictionary,Rational_Polynomial!#jrational polynomial definition dictionary,Rational_Root_Theorem#4rational root theorem definitiondictionary,Rational_element8rational element definitiondictionary,Rational_form0rational form definitiondictionary,Rational_functionmrational function definitiondictionary,Rational_number.+rational number definitionMathDictionary,radiusradius definition$MathDictionary,radius_of_convergence#/radius of convergence definition"MathDictionary,radius_of_curvature!Kradius of curvature definition!MathDictionary,radius_of_gyration hradius of gyration definition)MathDictionary,radius_of_normal_curvature(~radius of normal curvature definition MathDictionary,radius_of_torsionradius of torsion definitionMathDictionary,radius_vector/radius vector definition"MathDictionary,radiusofconvergence#/radius of convergence definition 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definitionDictionary,real_variable|real variable definitionDictionary,realanalysis!real analysis definitionDictionary,realanalytic\real analytic definitiondefinition,Radixradix definitiondefinition,RadixFractionVradix fraction definitiondefinition,RadixPoint0radix point definitiondefinition,Radix_FractionVradix fraction definitiondefinition,Radix_Point0radix point definitiondefinition,Radix_fractionVradix fraction definitiondefinition,Radix_point0radix point definitiondefinition,RadixfractionVradix fraction definitiondefinition,Radixpoint0radix point definition"definition,Radon-NikodymDerivative&Radon-Nikodym derivative definitionmathdictionary,Radicalsign radical sign definitionmathdictionary,Radicand radicand definitionmathdictionary,Radices radices definitionmathdictionary,Radiusradius definition"mathdictionary,RadiusOfConvergence#/radius of convergence definition mathdictionary,RadiusOfCurvature!Kradius of curvature definitionmathdictionary,RadiusOfGyration hradius of gyration definition&mathdictionary,RadiusOfNormalCurvature(~radius of normal curvature definitionmathdictionary,RadiusOfTorsionradius of torsion definitionmathdictionary,RadiusVector/radius vector definition$mathdictionary,Radius_Of_Convergence#/radius of convergence definitiondictionary,Radixradix definitiondictionary,RadixFractionVradix fraction definitiondictionary,RadixPoint0radix point definitiondictionary,Radix_FractionVradix fraction definitiondictionary,Radix_Point0radix point definitiondictionary,Radix_fractionVradix fraction definitiondictionary,Radix_point0radix point definitiondictionary,RadixfractionVradix fraction definitiondictionary,Radixpoint0radix point definition"dictionary,Radon-NikodymDerivative&Radon-Nikodym derivative definition!Radius_of_gyration,mathdictionaryh%Radius_of_normal_curvature,Definition~%Radius_of_normal_curvature,Dictionary~)Radius_of_normal_curvature,MathDictionary~)Radius_of_normal_curvature,Mathdictionary~%Radius_of_normal_curvature,definition~%Radius_of_normal_curvature,dictionary~)Radius_of_normal_curvature,mathdictionary~Radius_of_torsion,DefinitionRadius_of_torsion,Dictionary 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Definition,quoderatdemonstrandum(Definition,quoderatfaciendumVDefinition,quotientFDefinition,quotientgroupKDefinition,quotientringDefinition,quotientrule-Definition,quotientspacea^Definition,quotienttopology Definition,ryDefinition,racecourseparadoxϿDefinition,radm< {VERSION 4 0 "HELP" "4.0"} {USTYLETAB {PSTYLE "Normal" -1 0 1 {CSTYLE "" -1 -1 "" 0 1 0 0 0 0 0 0 0 0 0 0 0 0 0 }0 0 0 -1 -1 10 0 0 0 0 0 0 -1 0 }} {SECT 0 {PARA 3 "> " 0 "" {TEXT -1 12 "random walk," } } {PARA 0 "> " 0 "" {TEXT 22 2 "n." } {TEXT -1 2 " (" } {TEXT 22 10 "Statistics" } {TEXT -1 147 ") a route consisting of successive and unconnected steps in which each step is chosen by a random mechanism uninfluenced by any previous step. See " } {HYPERLNK 45 "gambler's ruin" 5 "Definition/gamblersruin" "" }{TEXT -1 2 ". " } } } %rankcorrelationcoefficient,dictionary~)rankcorrelationcoefficient,mathdictionary~ rao_blackwell_theorem,Definition6 rao_blackwell_theorem,Dictionary6$rao_blackwell_theorem,MathDictionary6$rao_blackwell_theorem,Mathdictionary6 rao_blackwell_theorem,definition6 rao_blackwell_theorem,dictionary6$rao_blackwell_theorem,mathdictionary6raoblackwelltheorem,Definition6raoblackwelltheorem,Dictionary6"raoblackwelltheorem,MathDictionary6"raoblackwelltheorem,Mathdictionary6raoblackwelltheorem,definition6raoblackwelltheorem,dictionary6dictionary,pseudo-inversexdictionary,pseudo_spheredictionary,psi_functiondictionary,purely_atomicdictionary,puresurdSdictionary,pythagoreannumbers@dictionary,qefzdictionary,quadratic_congruencedictionary,quadraticformdictionary,qualitative_identitydictionary,quartileBdictionary,quasi-metricdictionary,quasiconcavedictionary,quasitautology"dictionary,quod_erat_demonstrandumdictionary,quotientspaceV$MathDictionary,Recursivelyenumerable$recursively enumerable definition#MathDictionary,Recursivelygenerated#Qrecursively generated definition'MathDictionary,Recursivepartialfunction(recursive partial function definition!MathDictionary,Recursivepredicate!Irecursive predicate definitionMathDictionary,Reduce4reduce definition&MathDictionary,ReducedComplexityMethod'wreduced complexity method definition!MathDictionary,ReducedEchelonForm"Greduced echelon form definition/^{VERSION 4 0 "HELP" "4.0"} {USTYLETAB {PSTYLE "Normal" -1 0 1 {CSTYLE "" -1 -1 "" 0 1 0 0 0 0 0 0 0 0 0 0 0 0 0 }0 0 0 -1 -1 10 0 0 0 0 0 0 -1 0 }} {SECT 0 {PARA 3 "> " 0 "" {TEXT -1 22 "radius of convergence," } } {PARA 0 "> " 0 "" {TEXT 22 2 "n." } {TEXT -1 5 " the " } {HYPERLNK 45 "radius" 5 "Definition/radius" "" }{TEXT -1 93 " of the largest circle (or interval in the real case) around a given point such that a given " } {HYPERLNK 45 "power series" 5 "Definition/powerseries" "" }{TEXT -1 175 " converges (absolutely) at all points strictly inside the circle. The series diverges at all points strictly outside the circle and may do either at points on the circle. See " } {HYPERLNK 45 "circle of convergence" 5 "Definition/circleofconvergence" "" }{TEXT -1 11 ". See also " } {HYPERLNK 45 "root test" 5 "Definition/roottest" "" }{TEXT -1 2 ". " } } } 9Mathdictionary,Quotient_rule։Mathdictionary,QuotienttopologyMathdictionary,Raabes_testa"Mathdictionary,RademacherFunctions Mathdictionary,RademachertheoremڟMathdictionary,RadicalCenterӟMathdictionary,Radical_fraction,"Mathdictionary,RadiusOfConvergence)Mathdictionary,Radius_Of_Normal_Curvature Mathdictionary,Radius_of_torsion7Mathdictionary,Radixf&Mathdictionary,Radon-NikodymDerivative#Mathdictionary,Radon-nikodymtheoremʧ'Mathdictionary,Radon_Nikodym_Derivative regionmethodJregres +/]EregressDe/T=regroupregula B* regulafalsi +regulafalsiruleoffalsepositregularpdC <")#$66@G]lfhkmmWrtFcبZ,T?Iregularapproximatingsequenc)# regularit 0rregularityconditrregularperturbat6 regularpointkregularsingularpointI rehabilitatJreign reimpos| reinvestH!reject;)(5<7[==*=Q)MathDictionary,real_valuedreal-valued definitionMathDictionary,real_variable|real variable definitionMathDictionary,realanalysis!real analysis definitionMathDictionary,realanalytic\real analytic 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definitionMathdictionary,radix_fractionVradix fraction definitionMathdictionary,radix_point0radix point definitionMathdictionary,radixfractionVradix fraction definitionmathdictionary,Radiusoftorsionradius of torsion definitionmathdictionary,Radiusvector/radius vector definitionmathdictionary,Radixradix definitionmathdictionary,RadixFractionVradix fraction definitionmathdictionary,RadixPoint0radix point definitionmathdictionary,Radix_FractionVradix fraction definitionmathdictionary,Radix_Point0radix point definitionmathdictionary,Radix_fractionVradix fraction definitionmathdictionary,Radix_point0radix point 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radius_of_torsion,MathDictionary radius_of_torsion,Mathdictionaryradius_of_torsion,definitionradius_of_torsion,dictionary radius_of_torsion,mathdictionaryradius_vector,Definition/radius_vector,Dictionary/radius_vector,MathDictionary/radius_vector,Mathdictionary/radius_vector,definition/radius_vector,dictionary/radius_vector,mathdictionary/radiusofconvergence,Definition/radiusofconvergence,Dictionary/"radiusofconvergence,MathDictionary/"radiusofconvergence,Mathdictionary/radiusofconvergence,definition/Mathdictionary,RamseyNumbersRamsey numbers definitionMathdictionary,RamseyTheoremG Ramsey theorem definitionMathdictionary,Ramsey_NumbersRamsey numbers definitionMathdictionary,Ramsey_TheoremG Ramsey theorem definitionMathdictionary,Ramsey_numbersRamsey numbers definitionMathdictionary,Ramsey_theoremG Ramsey theorem definitionMathdictionary,RamseynumbersRamsey numbers definitionMathdictionary,RamseytheoremG Ramsey theorem definition~EDefinition,radiusofnormalcurvaturedefinition,radiusofnormalcurvatureDefinition,radius_of_normal_curvaturedefinition,radius_of_normal_curvatureDefinition,RadiusOfNormalCurvaturedefinition,RadiusOfNormalCurvatureDefinition,Radius_Of_Normal_Curvaturedefinition,Radius_Of_Normal_CurvatureDefinition,Radiusofnormalcurvaturedefinition,RadiusofnormalcurvatureDefinition,Radius_of_normal_curvaturedefinition,Radius_of_normal_curvatureDictionary,radiusofnormalcurvaturedictionary,radiusofnormalcurvatureDictionary,radius_of_normal_curvaturedictionary,radius_of_normal_curvatureDictionary,RadiusOfNormalCurvaturedictionary,RadiusOfNormalCurvatureDictionary,Radius_Of_Normal_Curvaturedictionary,Radius_Of_Normal_CurvatureDictionary,Radiusofnormalcurvaturedictionary,RadiusofnormalcurvatureDictionary,Radius_of_normal_curvaturedictionary,Radius_of_normal_curvatureMathDictionary,radiusofnormalcurvatureMathdictionary,radiusofnormalcurvaturemathdictionary,radiusofnormalcurvatureMathDictionary,raRateOfChange,dictionary 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4 0 "HELP" "4.0"} {USTYLETAB {PSTYLE "Normal" -1 0 1 {CSTYLE "" -1 -1 "" 0 1 0 0 0 0 0 0 0 0 0 0 0 0 0 }0 0 0 -1 -1 10 0 0 0 0 0 0 -1 0 }} {SECT 0 {PARA 3 "> " 0 "" {TEXT -1 20 "radius of curvature," } } {PARA 0 "> " 0 "" {TEXT 22 2 "n." } {TEXT -1 45 " the absolute value of the reciprocal of the " } {HYPERLNK 45 "curvature" 5 "Definition/curvature" "" }{TEXT -1 118 " of a curve at a given point, taken as the rate of change of the tangent to the curve with respect to arc length. For " } {TEXT 22 1 "y" } {TEXT -1 3 " = " } {TEXT 22 1 "f" } {TEXT -1 1 "(" } {TEXT 22 1 "x" } {TEXT -1 182 "), it is d(df/dy)/ds. In particular, the radius of curvature of a plane curve at a point is the radius of a circle with curvature equal to that of the given curve at that point. See " } {HYPERLNK 45 "center of curvature" 5 "Definition/centerofcurvature" "" }{TEXT -1 1 " " } } } Dictionary,Rational_Form0rational form definitionDictionary,Rational_Functionmrational function definitionDictionary,Rational_Number.+rational number definitionDictionary,Rational_Polynomial!#jrational polynomial definition Dictionary,Rational_Root_Theorem#4rational root theorem definitionDictionary,Rational_element8rational element definitionDictionary,Rational_form0rational form definitionDictionary,Rational_functionmrational function definitionDictionary,Rational_number.+rational number definitionDefinition,Rangeofsignificance#range of significance definitionDefinition,Rankִrank definition%Definition,RankCorrelationCoefficient*~rank correlation coefficient definition'Definition,Rank_Correlation_Coefficient*~rank correlation coefficient definition'Definition,Rank_correlation_coefficient*~rank correlation coefficient definition%Definition,Rankcorrelationcoefficient*~rank correlation coefficient definitionDefinition,RaoBlackwellTheorem#6Rao Blackwell theorem definitionMathdictionary,Radius_vector/radius vector definition"Mathdictionary,Radiusofconvergence#/radius of convergence definition Mathdictionary,Radiusofcurvature!Kradius of curvature definitionMathdictionary,Radiusofgyration hradius of gyration definition&Mathdictionary,Radiusofnormalcurvature(~radius of normal curvature definitionMathdictionary,Radiusoftorsionradius of torsion definitionMathdictionary,Radiusvector/radius vector definitionMathdictionary,Radixradix definitionUDefinition,underdetermineddefinition,underdeterminedDefinition,Underdetermineddefinition,UnderdeterminedDictionary,underdetermineddictionary,underdeterminedDictionary,Underdetermineddictionary,UnderdeterminedMathDictionary,underdeterminedMathdictionary,underdeterminedmathdictionary,underdeterminedMathDictionary,UnderdeterminedMathdictionary,Underdeterminedmathdictionary,Underdeterminedradiusofconvergence,dictionary/"radiusofconvergence,mathdictionary/radiusofcurvature,DefinitionKradiusofcurvature,DictionaryK radiusofcurvature,MathDictionaryK radiusofcurvature,MathdictionaryKradiusofcurvature,definitionKradiusofcurvature,dictionaryK radiusofcurvature,mathdictionaryKradiusofgyration,Definitionhradiusofgyration,Dictionaryhradiusofgyration,MathDictionaryhradiusofgyration,Mathdictionaryhradiusofgyration,definitionhsOfCurvatureMathDictionary,Radius_Of_CurvatureMathdictionary,Radius_Of_Curvaturemathdictionary,Radius_Of_CurvatureMathDictionary,RadiusofcurvatureMathdictionary,Radiusofcurvaturemathdictionary,RadiusofcurvatureMathDictionary,Radius_of_curvatureMathdictionary,Radius_of_curvaturemathdictionary,Radius_of_curvatureius_of_curvaturedefinition,Radius_of_curvatureDictionary,radiusofcurvaturedictionary,radiusofcurvatureDictionary,radius_of_curvaturedictionary,radius_of_curvatureDictionary,RadiusOfCurvaturedictionary,RadiusOfCurvatureDictionary,Radius_Of_Curvaturedictionary,Radius_Of_CurvatureDictionary,Radiusofcurvaturedictionary,RadiusofcurvatureDictionary,Radius_of_curvaturedictionary,Radius_of_curvatureMathDictionary,radiusofcurvatureMathdictionary,radiusofcurvaturemathdictionary,radiusofcurvatureMathDictionary,radius_of_curvatureMathdictionary,radius_of_curvaturemathdictionary,radius_of_curvatureMathDictionary,RadiusOfCurvatureMathdictionary,RadiusOfCurvaturemathdictionary,Radiu:h1{VERSION 4 0 "HELP" "4.0"} {USTYLETAB {PSTYLE "Normal" -1 0 1 {CSTYLE "" -1 -1 "" 0 1 0 0 0 0 0 0 0 0 0 0 0 0 0 }0 0 0 -1 -1 10 0 0 0 0 0 0 -1 0 }} {SECT 0 {PARA 3 "> " 0 "" {TEXT -1 19 "radius of gyration," } } {PARA 0 "> " 0 "" {TEXT 22 2 "n." } {TEXT -1 2 " (" } {TEXT 22 9 "Mechanics" } {TEXT -1 40 ") the distance from a given axis that a " } {HYPERLNK 45 "particle" 5 "Definition/particle" "" }{TEXT -1 13 " of the same " } {HYPERLNK 45 "mass" 5 "Definition/mass" "" }{TEXT -1 6 " as a " } {HYPERLNK 45 "rigid body" 5 "Definition/rigidbody" "" }{TEXT -1 33 " must be placed to have the same " } {HYPERLNK 45 "moment of inertia" 5 "Definition/momentofinertia" "" }{TEXT -1 125 "; the square root of the quotient of the moment of inertia of the rigid body about the axis divided by the mass of the body. " } } } definition,RayleighQuotientċRayleigh quotient definitiondefinition,RayleighRitzMethod"8Rayleigh-Ritz method definitiondefinition,Rayleigh_QuotientċRayleigh quotient definitiondefinition,Rayleigh_Ritz_Method"8Rayleigh-Ritz method definitiondefinition,Rayleigh_quotientċRayleigh quotient definitiondefinition,Rayleigh_ritz_method"8Rayleigh-Ritz method definitiondefinition,RayleighquotientċRayleigh quotient definitiondefinition,Rayleighritzmethod"8Rayleigh-Ritz method definitionDictionary,Radixradix definitionDictionary,RadixFractionVradix fraction definitionDictionary,RadixPoint0radix point definitionDictionary,Radix_FractionVradix fraction definitionDictionary,Radix_Point0radix point definitionDictionary,Radix_fractionVradix fraction definitionDictionary,Radix_point0radix point definitionDictionary,RadixfractionVradix fraction definitionDictionary,Radixpoint0radix point definition"Dictionary,Radon-NikodymDerivative&Radon-Nikodym derivative definition&RadiusOfNormalCurvature,mathdictionary~RadiusOfTorsion,DefinitionRadiusOfTorsion,DictionaryRadiusOfTorsion,MathDictionaryRadiusOfTorsion,MathdictionaryRadiusOfTorsion,definitionRadiusOfTorsion,dictionaryRadiusOfTorsion,mathdictionaryRadiusVector,Definition/RadiusVector,Dictionary/RadiusVector,MathDictionary/RadiusVector,Mathdictionary/RadiusVector,definition/RadiusVector,dictionary/RadiusVector,mathdictionary/ Radius_Of_Convergence,Definition/ Radius_Of_Convergence,Dictionary/$Radius_Of_Convergence,MathDictionary/$Radius_Of_Convergence,Mathdictionary/ Radius_Of_Convergence,definition/ Radius_Of_Convergence,dictionary/definition,radon_theorem}Radon's theorem definitiondefinition,radonmeasureBbbRadon measure definition*Riemann-Stieltjes measure definition!definition,radonnikodymderivative&Radon-Nikodym derivative definitiondefinition,radonnikodymtheorem##Radon-Nikodym theorem definitiondefinition,radons_theorem}Radon's theorem definitiondefinition,radonstheorem}Radon's theorem definitiondefinition,radontheorem}Radon's theorem definitiondefinition,raiseraise definitiondefinition,ramanujan_srinivasa"Ramanujan, Srinivasa definitionmathdictionary,radixpoint0radix point definition'mathdictionary,radon-nikodym_derivative&Radon-Nikodym derivative definition$mathdictionary,radon-nikodym_theorem##Radon-Nikodym theorem definition&mathdictionary,radon-nikodymderivative&Radon-Nikodym derivative definition#mathdictionary,radon-nikodymtheorem##Radon-Nikodym theorem definitionmathdictionary,radon_measureBbbRadon measure definition*Riemann-Stieltjes measure definition'mathdictionary,radon_nikodym_derivative&Radon-Nikodym derivative definition$mathdictionary,radon_nikodym_theorem##Radon-Nikodym theorem definitionmathdictionary,radon_theorem}Radon's theorem definitionmathdictionary,radonmeasureBbbRadon measure definition*Riemann-Stieltjes measure definition%mathdictionary,radonnikodymderivative&Radon-Nikodym derivative definitionracecourseparadoxϿradm<rademach 0 brademacherfunctbrademachertheorem radial ,] radialcomponradian_+ !=5XB|F0L`t1vb{".Bb>radiat M\radic radical; 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If it is the vector O:P, where the coordinates of P are (" } {TEXT 22 1 "x" } {TEXT -1 2 ", " } {TEXT 22 1 "f" } {TEXT -1 1 "(" } {TEXT 22 1 "x" } {TEXT -1 35 ")), it can also be represented as <" } {TEXT 22 1 "x" } {TEXT -1 2 ", " } {TEXT 22 1 "f" } {TEXT -1 1 "(" } {TEXT 22 1 "x" } {TEXT -1 20 ")>, that is, as the " } {TEXT 22 1 "n" } {TEXT -1 98 "-tuple of its components in the directions of, or projections onto, the coordinate axes. See also " } {HYPERLNK 45 "position vector" 5 "Definition/positionvector" "" }{TEXT -1 1 "." } } } MathDictionary,Randomizerandomize definition$MathDictionary,Randomnumbergenerator%random number generator definitionMathDictionary,Randomnumbersrandom numbers definitionMathDictionary,RandomsampleӦrandom sample definitionMathDictionary,Randomvariablerandom variable definitionMathDictionary,Randomvectorrandom vector definitionMathDictionary,Randomwalk random walk definitionMathDictionary,Rangerange definition"MathDictionary,RangeOfSignificance#range of significance definitionmathdictionary,radiusofgyration hradius of gyration definition&mathdictionary,radiusofnormalcurvature(~radius of normal curvature definitionmathdictionary,radiusoftorsionradius of torsion definitionmathdictionary,radiusvector/radius vector definitionmathdictionary,radixradix definitionmathdictionary,radix_fractionVradix fraction definitionmathdictionary,radix_point0radix point definitionmathdictionary,radixfractionVradix fraction definition"Definition,relativeangularmomentum'relative angular momentum definitionDefinition,relativeautomorphism#relative automorphism definitionDefinition,relativecompactness"relative compactness definitionDefinition,relativecomplement!2relative complement definition"Definition,relativeconditionnumber'relative condition number definitionDefinition,relativeconsistency"relative consistency definitionDefinition,relativedisplacement#2relative displacement definitionradons_theorem,dictionary}radons_theorem,mathdictionary}radonstheorem,Definition}radonstheorem,Dictionary}radonstheorem,MathDictionary}radonstheorem,Mathdictionary}radonstheorem,definition}radonstheorem,dictionary}radonstheorem,mathdictionary}radontheorem,Definition}radontheorem,Dictionary}radontheorem,MathDictionary}radontheorem,Mathdictionary}radontheorem,definition}em,definition}radix_fraction,DefinitionVradix_fraction,DictionaryVradix_fraction,MathDictionaryVradix_fraction,MathdictionaryVradix_fraction,definitionVradix_fraction,dictionaryVradix_fraction,mathdictionaryVradix_point,Definition0radix_point,Dictionary0radix_point,MathDictionary0radix_point,Mathdictionary0radix_point,definition0radix_point,dictionary0radix_point,mathdictionary0radixfraction,DefinitionVradixfraction,DictionaryVradixfraction,MathDictionaryVradixfraction,MathdictionaryVradixfraction,definitionVradixfraction,dictionaryVradixfraction,mathdictionaryVMathDictionary,Radiusoftorsionradius of torsion definitionMathDictionary,Radiusvector/radius vector definitionMathDictionary,Radixradix definitionMathDictionary,RadixFractionVradix fraction definitionMathDictionary,RadixPoint0radix point definitionMathDictionary,Radix_FractionVradix fraction definitionMathDictionary,Radix_Point0radix point definitionMathDictionary,Radix_fractionVradix fraction definitionMathDictionary,Radix_point0radix point definition Radius_of_torsion,MathdictionaryRadius_of_torsion,definitionRadius_of_torsion,dictionary Radius_of_torsion,mathdictionaryRadius_vector,Definition/Radius_vector,Dictionary/Radius_vector,MathDictionary/Radius_vector,Mathdictionary/Radius_vector,definition/Radius_vector,dictionary/Radius_vector,mathdictionary/Radiusofconvergence,Definition/Radiusofconvergence,Dictionary/"Radiusofconvergence,MathDictionary/"Radiusofconvergence,Mathdictionary/Radiusofconvergence,definition/RademacherFunctions,Dictionary>#Rademacher_Functions,mathdictionaryRademacher_theorem,definition Rademachertheorem,MathdictionaryƟRadialComponent,definitionRadial_component,MathdictionaryݟRadian,definitionRadicalAxis,mathdictionaryRadical_Axis,dictionaryRadical_axis,MathdictionaryhRadical_fraction,MathdictionaryjRadicalaxis,MathDictionaryRadicalfraction,MathdictionaryٛRadicand,definitionRadiusOfConvergence,Definitionb RadiusOfCurvature,mathdictionaryRadontheorem,Dictionary}Radontheorem,MathDictionary}Radontheorem,Mathdictionary}Radontheorem,definition}Radontheorem,dictionary}Radontheorem,mathdictionary}Raise,DefinitionRaise,DictionaryRaise,MathDictionaryRaise,MathdictionaryRaise,definitionRaise,dictionaryRaise,mathdictionaryRamanujan,DefinitionRamanujanSrinivasa,DefinitionRamanujanSrinivasa,Dictionary!RamanujanSrinivasa,MathDictionary!RamanujanSrinivasa,MathdictionaryRamanujanSrinivasa,definitionI{VERSION 4 0 "HELP" "4.0"} {USTYLETAB {PSTYLE "Normal" -1 0 1 {CSTYLE "" -1 -1 "" 0 1 0 0 0 0 0 0 0 0 0 0 0 0 0 }0 0 0 -1 -1 10 0 0 0 0 0 0 -1 0 }} {SECT 0 {PARA 3 "> " 0 "" {TEXT -1 5 "radix" } } {PARA 0 "> " 0 "" {TEXT -1 9 "(abbrev. " } {TEXT 39 3 "rad" } {TEXT -1 3 "), " } {TEXT 22 2 "n." } {TEXT -1 22 " another word for the " } {HYPERLNK 45 "base" 5 "Definition/base" "" }{TEXT -1 6 " of a " } {HYPERLNK 45 "place-value notation" 5 "Definition/place-valuenotation" "" }{TEXT -1 14 " or system of " } {HYPERLNK 45 "logarithms" 5 "Definition/logarithm" "" }{TEXT -1 2 ". " } } } {VERSION 4 0 "HELP" "4.0"} {USTYLETAB {PSTYLE "Normal" -1 0 1 {CSTYLE "" -1 -1 "" 0 1 0 0 0 0 0 0 0 0 0 0 0 0 0 }0 0 0 -1 -1 10 0 0 0 0 0 0 -1 0 }} {SECT 0 {PARA 3 "> " 0 "" {TEXT -1 16 "neutral element," } } {PARA 0 "> " 0 "" {TEXT 22 2 "n." } {TEXT -1 18 " another word for " } {HYPERLNK 45 "identity element" 5 "Definition/identityelement" "" }{TEXT -1 42 ", especially a multiplicative identity or " } {HYPERLNK 45 "unity" 5 "Definition/unity" "" }{TEXT -1 2 ". " } } } {VERSION 4 0 "HELP" "4.0"} {USTYLETAB {PSTYLE "Normal" -1 0 1 {CSTYLE "" -1 -1 "" 0 1 0 0 0 0 0 0 0 0 0 0 0 0 0 }0 0 0 -1 -1 10 0 0 0 0 0 0 -1 0 }} {SECT 0 {PARA 3 "> " 0 "" {TEXT -1 7 "reflex," } } {PARA 0 "> " 0 "" {TEXT 22 4 "adj." } {TEXT -1 124 " (of an angle) between 180 and 360 degrees; the larger of the two angles between two line segments that meet at the vertex. " } } } #definition,Ramified_Theory_Of_Types&ramified theory of types definition#definition,Ramified_theory_of_types&ramified theory of types definition definition,Ramifiedtheoryoftypes&ramified theory of types definitiondefinition,RamseyNumbersRamsey numbers definitiondefinition,RamseyTheoremG Ramsey theorem definitiondefinition,Ramsey_NumbersRamsey numbers definitiondefinition,Ramsey_TheoremG Ramsey theorem definitiondefinition,Ramsey_numbersRamsey numbers definitionDefinition,radon-nikodymtheorem##Radon-Nikodym theorem definitionDefinition,radon_measureBbbRadon measure definition*Riemann-Stieltjes measure definition#Definition,radon_nikodym_derivative&Radon-Nikodym derivative definition Definition,radon_nikodym_theorem##Radon-Nikodym theorem definitionDefinition,radon_theorem}Radon's theorem definitionDefinition,radonmeasureBbbRadon measure definition*Riemann-Stieltjes measure definition!Definition,radonnikodymderivative&Radon-Nikodym derivative definitionDefinition,radonnikodymtheorem##Radon-Nikodym theorem definition Definition,Radon_nikodym_theorem##Radon-Nikodym theorem definitionDefinition,Radon_theorem}Radon's theorem definitionDefinition,RadonmeasureBbbRadon measure definition*Riemann-Stieltjes measure definition!Definition,Radonnikodymderivative&Radon-Nikodym derivative definitionDefinition,Radonnikodymtheorem##Radon-Nikodym theorem definitionDefinition,RadonsTheorem}Radon's theorem definitionDefinition,Radons_Theorem}Radon's theorem definitionDefinition,Radons_theorem}Radon's theorem definitiondefinition,Radon-NikodymTheorem##Radon-Nikodym theorem definition#definition,Radon-Nikodym_Derivative&Radon-Nikodym derivative definition definition,Radon-Nikodym_Theorem##Radon-Nikodym theorem definition#definition,Radon-nikodym_derivative&Radon-Nikodym derivative definition definition,Radon-nikodym_theorem##Radon-Nikodym theorem definition"definition,Radon-nikodymderivative&Radon-Nikodym derivative definitiondefinition,Radon-nikodymtheorem##Radon-Nikodym theorem definitiondefinition,RadonMeasureBbbRadon measure definition*Riemann-Stieltjes measure definition!definition,RadonNikodymDerivative&Radon-Nikodym derivative definition'radon-nikodym_derivative,mathdictionary radon-nikodym_theorem,Definition# radon-nikodym_theorem,Dictionary#$radon-nikodym_theorem,MathDictionary#$radon-nikodym_theorem,Mathdictionary# radon-nikodym_theorem,definition# radon-nikodym_theorem,dictionary#$radon-nikodym_theorem,mathdictionary#"radon-nikodymderivative,Definition"radon-nikodymderivative,Dictionary&radon-nikodymderivative,MathDictionary&radon-nikodymderivative,Mathdictionary"radon-nikodymderivative,definition"radon-nikodymderivative,dictionaryVc{VERSION 4 0 "HELP" "4.0"} {USTYLETAB {PSTYLE "Normal" -1 0 1 {CSTYLE "" -1 -1 "" 0 1 0 0 0 0 0 0 0 0 0 0 0 0 0 }0 0 0 -1 -1 10 0 0 0 0 0 0 -1 0 }} {SECT 0 {PARA 3 "> " 0 "" {TEXT -1 14 "radix fraction" } } {PARA 0 "> " 0 "" {TEXT -1 3 "or " } {TEXT 39 16 "radical fraction" } {TEXT -1 2 ", " } {TEXT 22 2 "n." } {TEXT -1 23 " the generalization of " } {HYPERLNK 45 "decimal fractions" 5 "Definition/decimalfraction" "" }{TEXT -1 10 " to other " } {HYPERLNK 45 "bases" 5 "Definition/base" "" }{TEXT -1 4 " of " } {HYPERLNK 45 "place-value notation" 5 "Definition/place-valuenotation" "" }{TEXT -1 2 ". " } } } definition,RadonNikodymTheorem##Radon-Nikodym theorem definitiondefinition,RadonTheorem}Radon's theorem definitiondefinition,Radon_MeasureBbbRadon measure definition*Riemann-Stieltjes measure definition#definition,Radon_Nikodym_Derivative&Radon-Nikodym derivative definition definition,Radon_Nikodym_Theorem##Radon-Nikodym theorem definitiondefinition,Radon_Theorem}Radon's theorem definitiondefinition,Radon_measureBbbRadon measure definition*Riemann-Stieltjes measure definition#definition,Radon_nikodym_derivative&Radon-Nikodym derivative definition definition,Radon_nikodym_theorem##Radon-Nikodym theorem definitiondefinition,Radon_theorem}Radon's theorem definitiondefinition,RadonmeasureBbbRadon measure definition*Riemann-Stieltjes measure definition!definition,Radonnikodymderivative&Radon-Nikodym derivative definitiondefinition,Radonnikodymtheorem##Radon-Nikodym theorem definitiondefinition,RadonsTheorem}Radon's theorem definitiondefinition,Radons_Theorem}Radon's theorem definitiondefinition,Radons_theorem}Radon's theorem definition$MathDictionary,Radon-nikodym_theorem##Radon-Nikodym theorem definition&MathDictionary,Radon-nikodymderivative&Radon-Nikodym derivative definition#MathDictionary,Radon-nikodymtheorem##Radon-Nikodym theorem definitionMathDictionary,RadonMeasureBbbRadon measure definition*Riemann-Stieltjes measure definition%MathDictionary,RadonNikodymDerivative&Radon-Nikodym derivative definition"MathDictionary,RadonNikodymTheorem##Radon-Nikodym theorem definitionMathDictionary,RadonTheorem}Radon's theorem definitionMathDictionary,Radon_MeasureBbbRadon measure definition*Riemann-Stieltjes measure definition'MathDictionary,Radon_Nikodym_Derivative&Radon-Nikodym derivative definition$MathDictionary,Quasi-linear_equationMathDictionary,Quasi_Concave MathDictionary,Quasi_concaveОMathDictionary,Quasiconcave͞MathDictionary,QuasiquotationϞMathDictionary,Queueingtheory̞&MathDictionary,Quod_erat_demonstrandumMathDictionary,QuotientRule{MathDictionary,Quotient_group&DMathDictionary,QuotientruleGMathDictionary,Raabe_testt!MathDictionary,Racecourse_paradoxv!MathDictionary,Rademacher_theoremMathDictionary,Radianratio_test,DefinitionWratio_test,DictionaryWratio_test,MathDictionaryWratio_test,MathdictionaryWratio_test,definitionWratio_test,dictionaryWratio_test,mathdictionaryWratio_theorem,Definition Xratio_theorem,Dictionary Xratio_theorem,MathDictionary Xratio_theorem,Mathdictionary Xratio_theorem,definition Xratio_theorem,dictionary Xratio_theorem,mathdictionary Xrational,Definition.+ϳrational,Dictionary.+ϳureMathDictionary,Radon_measureMathdictionary,Radon_measuremathdictionary,Radon_measuren,radon_measuredefinition,radon_measureDefinition,RadonMeasuredefinition,RadonMeasureDefinition,Radon_Measuredefinition,Radon_Measuredefinition,RadonmeasureDefinition,Radon_measuredefinition,Radon_measureDictionary,radonmeasuredictionary,radonmeasureDictionary,radon_measuredictionary,radon_measureDictionary,RadonMeasuredictionary,RadonMeasureDictionary,Radon_Measuredictionary,Radon_MeasureDictionary,Radonmeasuredictionary,RadonmeasureDictionary,Radon_measuredictionary,Radon_measureMathDictionary,radonmeasureMathdictionary,radonmeasuremathdictionary,radonmeasureMathDictionary,radon_measureMathdictionary,radon_measuremathdictionary,radon_measureMathDictionary,RadonMeasureMathdictionary,RadonMeasuremathdictionary,RadonMeasureMathDictionary,Radon_MeasureMathdictionary,Radon_Measuremathdictionary,Radon_MeasureMathDictionary,RadonmeasureMathdictionary,Radonmeasuremathdictionary,Radonmeas`} {VERSION 4 0 "HELP" "4.0"} {USTYLETAB {PSTYLE "Normal" -1 0 1 {CSTYLE "" -1 -1 "" 0 1 0 0 0 0 0 0 0 0 0 0 0 0 0 }0 0 0 -1 -1 10 0 0 0 0 0 0 -1 0 }} {SECT 0 {PARA 3 "> " 0 "" {TEXT -1 16 "Radon's theorem," } } {PARA 0 "> " 0 "" {TEXT 22 3 "n. " } {TEXT -1 21 "the theorem that any " } {TEXT 22 2 "n " } {TEXT -1 17 "+ 2 points in an " } {TEXT 22 2 "n-" } {TEXT -1 74 "dimensional vector space can be partitioned into two non-empty sets whose " } {HYPERLNK 45 "convex hulls" 5 "Definition/convexhull" "" }{TEXT -1 37 " are disjoint. This is equivalent to " } {HYPERLNK 45 "Helly's theorem" 5 "Definition/Hellystheorem" "" }{TEXT -1 63 ". (Named after the Austrian algebraist, analyst, and geometer, " } {TEXT 22 24 "Johann Karl August Radon" } {TEXT -1 15 " (1887-1956).) " } } } MWDefinition,reciprocalvectorsDefinition,ReciprocalVectorsdefinition,reciprocalvectors"Rectangular_coordinates,definition{&"Rectangular_coordinates,dictionary{&&Rectangular_coordinates,mathdictionary{& Rectangular_hyperbola,Definition Rectangular_hyperbola,Dictionary$Rectangular_hyperbola,MathDictionary$Rectangular_hyperbola,Mathdictionary Rectangular_hyperbola,definition Rectangular_hyperbola,dictionary$Rectangular_hyperbola,mathdictionaryRectangular_number,DefinitionnURectangular_number,DictionarynU!Rectangular_number,MathDictionarynU!Rectangular_number,MathdictionarynURectangular_number,definitionnURectangular_number,dictionarynU!Rectangular_number,mathdictionarynU!Rectangularcoordinates,Definition{&!Rectangularcoordinates,Dictionary{&%Rectangularcoordinates,MathDictionary{&%Rectangularcoordinates,Mathdictionary{&"MathDictionary,ramanujan_srinivasa"Ramanujan, Srinivasa definition!MathDictionary,ramanujansrinivasa"Ramanujan, Srinivasa 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definitionRadical_axis,definition8Radical_axis,dictionary8Radical_axis,mathdictionary8Radical_center,DefinitionRadical_center,DictionaryRadical_center,MathDictionaryRadical_center,MathdictionaryRadical_center,definitionRadical_center,dictionaryRadical_center,mathdictionaryRadical_fraction,DefinitiondVRadical_fraction,DictionarydVRadical_fraction,MathDictionarydVRadical_fraction,MathdictionarydV0Definition,radixpointdefinition,radixpointDefinition,radix_pointdefinition,radix_pointDefinition,RadixPointdefinition,RadixPointDefinition,Radix_Pointdefinition,Radix_PointDefinition,Radixpointdefinition,RadixpointDefinition,Radix_pointdefinition,Radix_pointDictionary,radixpointdictionary,radixpointDictionary,radix_pointdictionary,radix_pointDictionary,RadixPointdictionary,RadixPointDictionary,Radix_Pointdictionary,Radix_PointDictionary,Radixpointdictionary,RadixpointDictionary,Radix_pointdictionary,Radix_pointMathDictionary,radixpointMathdictionary,radixpointmathdictionary,radixpointMathDictionary,radix_pointMathdictionary,radix_pointmathdictionary,radix_pointMathDictionary,RadixPointMathdictionary,RadixPointmathdictionary,RadixPointMathDictionary,Radix_PointMathdictionary,Radix_Pointmathdictionary,Radix_PointMathDictionary,RadixpointMathdictionary,Radixpointmathdictionary,RadixpointMathDictionary,Radix_pointMathdictionary,Radix_pointmathdictionary,RadixrRadical_fraction,definitiondVRadical_fraction,dictionarydVRadical_fraction,mathdictionarydVRadical_sign,Definition Radical_sign,Dictionary Radical_sign,MathDictionary Radical_sign,Mathdictionary Radical_sign,definition Radical_sign,dictionary Radical_sign,mathdictionary 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definition#Dictionary,Radon_Nikodym_Derivative&Radon-Nikodym derivative definition Dictionary,Radon_Nikodym_Theorem##Radon-Nikodym theorem definitionDictionary,Radon_Theorem}Radon's theorem definitionDictionary,Radon_measureBbbRadon measure definition*Riemann-Stieltjes measure definition#Dictionary,Radon_nikodym_derivative&Radon-Nikodym derivative 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$%*protectedGI(_syslibG6"6%I"xG6"I"yG6"Q!6" Compare both graphs and describe the effects of using grid. LUklbXJvd0c2Iy9JK21vZHVsZW5hbWVHNiJJLFR5cGVzZXR0aW5nR0koX3N5c2xpYkdGJzYjLUkjbWlHRiQ2JVEhRicvJSdpdGFsaWNHUSV0cnVlRicvJSxtYXRodmFyaWFudEdRJ2l0YWxpY0Yn LUklbXJvd0c2Iy9JK21vZHVsZW5hbWVHNiJJLFR5cGVzZXR0aW5nR0koX3N5c2xpYkdGJzYjLUkjbWlHRiQ2JVEhRicvJSdpdGFsaWNHUSV0cnVlRicvJSxtYXRodmFyaWFudEdRJ2l0YWxpY0Yn
<Text-field style="Heading 1" layout="Heading 1">The view option</Text-field> If you would like to restrict the range of LUklbXJvd0c2Iy9JK21vZHVsZW5hbWVHNiJJLFR5cGVzZXR0aW5nR0koX3N5c2xpYkdGJzYkLUkjbWlHRiQ2JVEiekYnLyUnaXRhbGljR1EldHJ1ZUYnLyUsbWF0aHZhcmlhbnRHUSdpdGFsaWNGJy1JI21vR0YkNjBRIn5GJy9GM1Enbm9ybWFsRicvJSZmZW5jZUdRJmZhbHNlRicvJSpzZXBhcmF0b3JHRj0vJSlzdHJldGNoeUdGPS8lKnN5bW1ldHJpY0dGPS8lKGxhcmdlb3BHRj0vJS5tb3ZhYmxlbGltaXRzR0Y9LyUnYWNjZW50R0Y9LyUlZm9ybUdRIUYnLyUnbHNwYWNlR1EkMGVtRicvJSdyc3BhY2VHRk8vJShtaW5zaXplR1EiMUYnLyUobWF4c2l6ZUdRKWluZmluaXR5Ric=values you wish to view, in general, you have two options, z=a..b and view=a..b. Let's explore both and see if either one has an advantage over the other by plotting L0kiekc2IiokLCYqJClJInhHRiQiIiMiIiJGKyokKUkieUdGJEYqRitGKyEiIg== over the region 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 and LUklbXJvd0c2Iy9JK21vZHVsZW5hbWVHNiJJLFR5cGVzZXR0aW5nR0koX3N5c2xpYkdGJzYoLUkjbW9HRiQ2MFEqJnVtaW51czA7RicvJSxtYXRodmFyaWFudEdRJ25vcm1hbEYnLyUmZmVuY2VHUSZmYWxzZUYnLyUqc2VwYXJhdG9yR0Y0LyUpc3RyZXRjaHlHRjQvJSpzeW1tZXRyaWNHRjQvJShsYXJnZW9wR0Y0LyUubW92YWJsZWxpbWl0c0dGNC8lJ2FjY2VudEdGNC8lJWZvcm1HUSZpbmZpeEYnLyUnbHNwYWNlR1EwbWVkaXVtbWF0aHNwYWNlRicvJSdyc3BhY2VHRkYvJShtaW5zaXplR1EiMUYnLyUobWF4c2l6ZUdRKWluZmluaXR5RictSSNtbkdGJDYkUSIyRidGLy1GLDYwUSYmbGVxO0YnRi9GMkY1RjdGOUY7Rj1GP0ZBL0ZFUS90aGlja21hdGhzcGFjZUYnL0ZIRldGSUZMLUkjbWlHRiQ2JVEieUYnLyUnaXRhbGljR1EldHJ1ZUYnL0YwUSdpdGFsaWNGJ0ZTLUZQNiRRIzIuRidGLw== QyQtSSdwbG90M2RHNiQlKnByb3RlY3RlZEdJKF9zeXNsaWJHNiI2JSokLCYqJEkieEdGKCIiIyIiIiokSSJ5R0YoRi5GLyEiIi9GLTshIiNGLi9GMUY0Ri8= 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As you can see, this is not a very informative graph. Can you explaing what's going on as LUklbXJvd0c2Iy9JK21vZHVsZW5hbWVHNiJJLFR5cGVzZXR0aW5nR0koX3N5c2xpYkdGJzYjLUkjbWlHRiQ2JVEieEYnLyUnaXRhbGljR1EldHJ1ZUYnLyUsbWF0aHZhcmlhbnRHUSdpdGFsaWNGJw== and LUklbXJvd0c2Iy9JK21vZHVsZW5hbWVHNiJJLFR5cGVzZXR0aW5nR0koX3N5c2xpYkdGJzYkLUkjbW9HRiQ2MFEifkYnLyUsbWF0aHZhcmlhbnRHUSdub3JtYWxGJy8lJmZlbmNlR1EmZmFsc2VGJy8lKnNlcGFyYXRvckdGNC8lKXN0cmV0Y2h5R0Y0LyUqc3ltbWV0cmljR0Y0LyUobGFyZ2VvcEdGNC8lLm1vdmFibGVsaW1pdHNHRjQvJSdhY2NlbnRHRjQvJSVmb3JtR1EhRicvJSdsc3BhY2VHUSQwZW1GJy8lJ3JzcGFjZUdGRi8lKG1pbnNpemVHUSIxRicvJShtYXhzaXplR1EpaW5maW5pdHlGJy1JI21pR0YkNiVRInlGJy8lJ2l0YWxpY0dRJXRydWVGJy9GMFEnaXRhbGljRic= both \342\206\222 0? QyQtSSdwbG90M2RHNiQlKnByb3RlY3RlZEdJKF9zeXNsaWJHNiI2JiokLCYqJEkieEdGKCIiIyIiIiokSSJ5R0YoRi5GLyEiIi9GLTshIiNGLi9GMUY0L0kiekdGKDshIiYiIiZGLw== Error, (in plot3d/options3d) unknown or bad optional argument: z = -5 .. 5 The command produces an error. Let's try view. 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Now we see a nice truncated graph.
LUklbXJvd0c2Iy9JK21vZHVsZW5hbWVHNiJJLFR5cGVzZXR0aW5nR0koX3N5c2xpYkdGJzYjLUkjbWlHRiQ2JVEhRicvJSdpdGFsaWNHUSV0cnVlRicvJSxtYXRodmFyaWFudEdRJ2l0YWxpY0Yn
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Example Graph the sombrero 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Be sure to experiment with the graph by rotating and zooming to get the best possible view, or at the very least, the view which best illustrates the features you are interested in exploring.
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<Text-field style="Heading 1" layout="Heading 1">Multiple Graphs on a Single Plot</Text-field> To designate separate colors for different surfaces on the same plot, we must specify different colors for each using the color option. The display command will be used to put them together. Let's plot the surfaces L0kiekc2IiwmIiM1IiIiKiQpSSJ4R0YkIiIjRichIiI= and L0kiekc2IiokKUkieUdGJCIiIyIiIg== on the same plot. 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Note: Before the display command was used, we had to load the plots package.
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<Text-field style="Heading 1" layout="Heading 1">Exercises</Text-field> For each of the following functions produce a 3D plot over the specified domain. If no domain is suggested, come up with a suitable domain. Be sure to use various options in your plot to best illustrate features of the graph. 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, MzEhIiZJInlHNiIxRiUiIiY= (d) L0kiekc2IiooLUkkZXhwR0YkNiMsJC1JJGFic0clKnByb3RlY3RlZEc2I0kieEdGJCEiIiIiIkkkY29zRzYkRixJKF9zeXNsaWJHRiRGMC1JJXNxcnRHRjI2IywmKiRGLiIiI0YwKiRJInlHRiRGOUYwRjA= L0kiekc2IiooLUkkZXhwRzYkJSpwcm90ZWN0ZWRHSShfc3lzbGliR0YkNiMsJC1JJGFic0dGKTYjSSJ4R0YkISIiIiIiSSRjb3NHRihGMiwmKiRGMCIiI0YyKiRJInlHRiRGNkYyI0YyRjY= print(); L0kiekc2IiooLUkkZXhwRzYkJSpwcm90ZWN0ZWRHSShfc3lzbGliR0YkNiMsJC1JJGFic0dGKTYjSSJ4R0YkISIiIiIiSSRjb3NHRihGMiwmKiRGMCIiI0YyKiRJInlHRiRGNkYyI0YyRjY= Plot the following groups of functions on the same plot. (a) 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 and 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 (b) 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, 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and 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 LUklbXJvd0c2Iy9JK21vZHVsZW5hbWVHNiJJLFR5cGVzZXR0aW5nR0koX3N5c2xpYkdGJzYjLUkjbWlHRiQ2JVEhRicvJSdpdGFsaWNHUSV0cnVlRicvJSxtYXRodmFyaWFudEdRJ2l0YWxpY0Yn
LUklbXJvd0c2Iy9JK21vZHVsZW5hbWVHNiJJLFR5cGVzZXR0aW5nR0koX3N5c2xpYkdGJzYjLUkjbWlHRiQ2JVEhRicvJSdpdGFsaWNHUSV0cnVlRicvJSxtYXRodmFyaWFudEdRJ2l0YWxpY0Yn