黎曼函数在[0,1]上的积分为0,考虑除x0以外所有黎曼函数的函数值大于等于ε的点,推论:黎曼函数在(0,1)内的无理点处处连续,黎曼函数的不连续点集合即为有理数集,黎曼函数是什么黎曼猜想是指:黎曼函数定义在[0,1)内的无理数.性质:定理:黎曼函数在区间(0,1)内的极限处处为0,黎曼函数也被称为Thomae’s function此函数在微积分中有着重要应用,因为黎曼函数的正数值都是1/q的形式(q∈N+)。
黎曼函数是什么
黎曼猜想是指:黎曼函数定义在[0,1]上,R(x)=1/q, 当x=p/q(p,q都属于正整数,p/q为既约真分数),R(x)=0,当x=0,1和(0,1)内的无理数。简介:黎曼函数(Riemann function)是一个特殊函数,由德国数学家黎曼发现提出,在高等数学中被广泛应用,在很多情况下可以作为反例来验证某些函数方面的待证命题。在部分英文参考文献中,黎曼函数也被称为Thomae’s function此函数在微积分中有着重要应用。黎曼函数定义在[0,1]上,R(x)=1/q, 当x=p/q(p,q都属于正整数,p/q为既约真分数),R(x)=0,当x=0,1和(0,1)内的无理数.性质:定理:黎曼函数在区间(0,1)内的极限处处为0。证明:对任意x0∈(0,1),任给正数ε,考虑除x0以外所有黎曼函数的函数值大于等于ε的点,因为黎曼函数的正数值都是1/q的形式(q∈N+),且对每个q,函数值等于1/q的点都是有限的,所以除x0以外所有函数值大于等于ε的点也是有限的。设这些点,连同0、1,与x0的最小距离为δ,则x0的半径为δ的去心邻域中所有点函数值均在[0,ε)中,从而黎曼函数在x-》x0时的极限为0。推论:黎曼函数在(0,1)内的无理点处处连续,有理点处处不连续。推论:黎曼函数在区间[0,1]上是黎曼可积的。(实际上,黎曼函数在[0,1]上的积分为0。)证明:函数可积性的勒贝格判据指出,一个有界函数是黎曼可积的,当且仅当它的所有不连续点组成的集合测度为0。黎曼函数的不连续点集合即为有理数集,是可数的,故其测度为0,所以由勒贝格判据,它是黎曼可积的。
三角函数值的数值表
角α 0° 30° 45° 60° 90° 120° 135° 150° 180° 270° 360° 弧度制 o π/6 π/4 π/3 π/2 2π/3 3π/4 5π/6 π 3π/2 2π sinα o 1/2 √2/2 √3/2 1 √3/2 √2/2 1/2 0-10 cosα 1 √3/2 √2/2 1/2 0 -1/2 -√2/2 -√3/2 -101 tanα o √3/3 1 √3 ±∞-√3 -1 -√3/3 0±∞0 sin0=sin0°=0cos0=cos0°=1tan0=tan0°=0sin15=0.650;sin15°=(√6-√2)/4cos15=-0.759;cos15°=(√6+√2)/4tan15=-0.855;tan15°=2-√3sin30=-0.988;sin30°=1/2cos30=0.154;cos30°=√3/2tan30=-6.405;tan30°=√3/3sin45=0.851;sin45°=√2/2cos45=0.525;cos45°=sin45°=√2/2tan45=1.620;tan45°=1sin60=-0.305;sin60°=√3/2cos60=-0.952;cos60°=1/2tan60=0.320;tan60°=√3sin75=-0.388;sin75°=cos15°cos75=0.922;cos75°=sin15°tan75=-0.421;tan75°=sin75°/cos75° =2+√3sin90=0.894;sin90°=cos0°=1cos90=-0.448;cos90°=sin0°=0tan90=-1.995;tan90°不存在sin105=-0.971;sin105°=cos15°cos105=-0.241;cos105°=-sin15°tan105=4.028;tan105°=-cot15°sin120=0.581;sin120°=cos30°cos120=0.814;cos120°=-sin30°tan120=0.713;tan120°=-tan60°sin135=0.088;sin135°=sin45°cos135=-0.996;cos135°=-cos45°tan135=-0.0887;tan135°=-tan45°sin150=-0.7149;sin150°=sin30°cos150=-0.699;cos150°=-cos30°tan150=-1.022;tan150°=-tan30°sin165=0.998;sin165°=sin15°cos165=-0.066;cos165°=-cos15°tan165=-15.041;tan165°=-tan15°sin180=-0.801;sin180°=sin0°=0cos180=-0.598;cos180°=-cos0°=-1tan180=1.339;tan180°=0sin195=0.219;sin195°=-sin15°cos195=0.976;cos195°=-cos15°tan195=0.225;tan195°=tan15°sin360=0.959;sin360°=sin0°=0cos360=-0.284;cos360°=cos0°=1tan360=-3.380;tan360°=tan0°=0cos72=[(√5)-1]/4(利用黄金等腰三角形可得出)sin1=0.01745240643728351 sin2=0.03489949670250097 sin3=0.05233595624294383sin4=0.0697564737441253 sin5=0.08715574274765816 sin6=0.10452846326765346sin7=0.12186934340514747 sin8=0.13917310096006544 sin9=0.15643446504023087sin10=0.17364817766693033 sin11=0.1908089953765448 sin12=0.20791169081775931sin13=0.22495105434386497 sin14=0.24192189559966773 sin15=0.25881904510252074sin16=0.27563735581699916 sin17=0.2923717047227367 sin18=0.3090169943749474sin19=0.3255681544571567 sin20=0.3420201433256687 sin21=0.35836794954530027sin22=0.374606593415912 sin23=0.3907311284892737 sin24=0.40673664307580015sin25=0.42261826174069944 sin26=0.4383711467890774 sin27=0.45399049973954675sin28=0.4694715627858908 sin29=0.48480962024633706 sin30=0.49999999999999994sin31=0.5150380749100542 sin32=0.5299192642332049 sin33=0.544639035015027sin34=0.5591929034707468 sin35=0.573576436351046 sin36=0.5877852522924731sin37=0.6018150231520483 sin38=0.6156614753256583 sin39=0.6293203910498375sin40=0.6427876096865392 sin41=0.6560590289905073 sin42=0.6691306063588582sin43=0.6819983600624985 sin44=0.6946583704589972 sin45=0.7071067811865475sin46=0.7193398003386511 sin47=0.7313537016191705 sin48=0.7431448254773941sin49=0.7547095802227719 sin50=0.766044443118978 sin51=0.7771459614569708sin52=0.7880107536067219 sin53=0.7986355100472928 sin54=0.8090169943749474sin55=0.8191520442889918 sin56=0.8290375725550417 sin57=0.8386705679454239sin58=0.848048096156426 sin59=0.8571673007021122 sin60=0.8660254037844386sin61=0.8746197071393957 sin62=0.8829475928589269 sin63=0.8910065241883678sin64=0.898794046299167 sin65=0.9063077870366499 sin66=0.9135454576426009sin67=0.9205048534524404 sin68=0.9271838545667873 sin69=0.9335804264972017sin70=0.9396926207859083 sin71=0.9455185755993167 sin72=0.9510565162951535sin73=0.9563047559630354 sin74=0.9612616959383189 sin75=0.9659258262890683sin76=0.9702957262759965 sin77=0.9743700647852352 sin78=0.9781476007338057sin79=0.981627183447664 sin80=0.984807753012208 sin81=0.9876883405951378sin82=0.9902680687415704 sin83=0.992546151641322 sin84=0.9945218953682733sin85=0.9961946980917455 sin86=0.9975640502598242 sin87=0.9986295347545738sin88=0.9993908270190958 sin89=0.9998476951563913sin90=1cos1=0.9998476951563913 cos2=0.9993908270190958 cos3=0.9986295347545738cos4=0.9975640502598242 cos5=0.9961946980917455 cos6=0.9945218953682733cos7=0.992546151641322 cos8=0.9902680687415704 cos9=0.9876883405951378cos10=0.984807753012208 cos11=0.981627183447664 cos12=0.9781476007338057cos13=0.9743700647852352 cos14=0.9702957262759965 cos15=0.9659258262890683cos16=0.9612616959383189 cos17=0.9563047559630355 cos18=0.9510565162951535cos19=0.9455185755993168 cos20=0.9396926207859084 cos21=0.9335804264972017cos22=0.9271838545667874 cos23=0.9205048534524404 cos24=0.9135454576426009cos25=0.9063077870366499 cos26=0.898794046299167 cos27=0.8910065241883679cos28=0.882947592858927 cos29=0.8746197071393957 cos30=0.8660254037844387cos31=0.8571673007021123 cos32=0.848048096156426 cos33=0.838670567945424cos34=0.8290375725550417 cos35=0.8191520442889918 cos36=0.8090169943749474cos37=0.7986355100472928 cos38=0.7880107536067219 cos39=0.7771459614569709cos40=0.766044443118978 cos41=0.754709580222772 cos42=0.7431448254773942cos43=0.7313537016191705 cos44=0.7193398003386512 cos45=0.7071067811865476cos46=0.6946583704589974 cos47=0.6819983600624985 cos48=0.6691306063588582cos49=0.6560590289905074 cos50=0.6427876096865394 cos51=0.6293203910498375cos52=0.6156614753256583 cos53=0.6018150231520484 cos54=0.5877852522924731cos55=0.5735764363510462 cos56=0.5591929034707468 cos57=0.5446390350150272cos58=0.5299192642332049 cos59=0.5150380749100544 cos60=0.5000000000000001cos61=0.4848096202463371 cos62=0.46947156278589086 cos63=0.4539904997395468cos64=0.43837114678907746 cos65=0.42261826174069944 cos66=0.4067366430758004cos67=0.3907311284892737 cos68=0.3746065934159122 cos69=0.35836794954530015cos70=0.3420201433256688 cos71=0.32556815445715675 cos72=0.30901699437494745cos73=0.29237170472273677 cos74=0.27563735581699916 cos75=0.25881904510252074cos76=0.24192189559966767 cos77=0.22495105434386514 cos78=0.20791169081775923cos79=0.19080899537654491 cos80=0.17364817766693041 cos81=0.15643446504023092cos82=0.13917310096006546 cos83=0.12186934340514749 cos84=0.10452846326765346cos85=0.08715574274765836 cos86=0.06975647374412523 cos87=0.052335956242943966cos88=0.03489949670250108 cos89=0.0174524064372836cos90=0tan1=0.017455064928217585 tan2=0.03492076949174773 tan3=0.052407779283041196tan4=0.06992681194351041 tan5=0.08748866352592401 tan6=0.10510423526567646tan7=0.1227845609029046 tan8=0.14054083470239145 tan9=0.15838444032453627tan10=0.17632698070846497 tan11=0.19438030913771848 tan12=0.2125565616700221tan13=0.2308681911255631 tan14=0.24932800284318068 tan15=0.2679491924311227tan16=0.2867453857588079 tan17=0.30573068145866033 tan18=0.3249196962329063tan19=0.34432761328966527 tan20=0.36397023426620234 tan21=0.3838640350354158tan22=0.4040262258351568 tan23=0.4244748162096047 tan24=0.4452286853085361tan25=0.4663076581549986 tan26=0.4877325885658614 tan27=0.5095254494944288tan28=0.5317094316614788 tan29=0.554309051452769 tan30=0.5773502691896257tan31=0.6008606190275604 tan32=0.6248693519093275 tan33=0.6494075931975104tan34=0.6745085168424265 tan35=0.7002075382097097 tan36=0.7265425280053609tan37=0.7535540501027942 tan38=0.7812856265067174 tan39=0.8097840331950072tan40=0.8390996311772799 tan41=0.8692867378162267 tan42=0.9004040442978399tan43=0.9325150861376618 tan44=0.9656887748070739 tan45=0.9999999999999999tan46=1.0355303137905693 tan47=1.0723687100246826 tan48=1.1106125148291927tan49=1.1503684072210092 tan50=1.19175359259421 tan51=1.234897156535051tan52=1.2799416321930785 tan53=1.3270448216204098 tan54=1.3763819204711733tan55=1.4281480067421144 tan56=1.4825609685127403 tan57=1.5398649638145827tan58=1.6003345290410506 tan59=1.6642794823505173 tan60=1.7320508075688767tan61=1.8040477552714235 tan62=1.8807264653463318 tan63=1.9626105055051503tan64=2.050303841579296 tan65=2.1445069205095586 tan66=2.246036773904215tan67=2.355852365823753 tan68=2.4750868534162946 tan69=2.6050890646938023tan70=2.7474774194546216 tan71=2.904210877675822 tan72=3.0776835371752526tan73=3.2708526184841404 tan74=3.4874144438409087 tan75=3.7320508075688776tan76=4.0107809335358455 tan77=4.331475874284153 tan78=4.704630109478456tan79=5.144554015970307 tan80=5.671281819617707 tan81=6.313751514675041tan82=7.115369722384207 tan83=8.144346427974593 tan84=9.514364454222587tan85=11.43005230276132 tan86=14.300666256711942 tan87=19.08113668772816tan88=28.636253282915515 tan89=57.289961630759144tan90=无取值
幂函数指的是什么呢
一般地,y=xα(α为有理数)的函数,即以底数为自变量,幂为因变量,指数为常数的函数称为幂函数。例如函数y=x0 、y=x1、y=x2、y=x-1(注:y=x-1=1/x、y=x0时x≠0)等都是幂函数。
零值性质
当α=0时,幂函数y=xa有下列性质:
a、y=x0的图像是直线y=1去掉一点(0,1)。它的图像不是直线。
正值性质
当α》0时,幂函数y=xα有下列性质:
a、图像都经过点(1,1)(0,0)。
b、函数的图像在区间[0,+∞)上是增函数。
c、在第一象限内,α》1时,导数值逐渐增大;α=1时,导数为常数;0《α《1时,导数值逐渐减小,趋近于0(函数值递增)。
高斯函数的积分怎么积
用极坐标化简即可。
任何高斯函数的积分均可简化为含高斯积分的项。
常数a可以被提出积分。使用y=x-b来取代x-b获得
使用z=y/c取得
扩展资料:
首先我们说明一下这里使用积分的符号:
表示f(x,y)在曲线L上的第一型曲线积分。
首先看第一型曲线积分形式的高斯积分:
设L是一条曲线,r是这曲线一点到L外一点A(e,m)的连接向量,n是曲线这一点的法向量,(r,n)表示r与n向量的夹角,则积分为:d
高斯积分的几何意义就是:g是从点A所能看到曲线L的角的度量。
设(x,n)是x轴正方向与n的夹角,(x,r)是x轴正方向与r的夹角,则(r,n) = (x,n) - (x,r)
所以:cos(r,n) = cos(x,n)cos(x,r)+sin(x,n)sin(x,r)
=((x-e)cos(x,n)/|r| + (y-m)sin(x,n)/|r|
代入高斯积分:g = ∫[L] ((y-m)sin(x,n)/(|r|2) + (x-e)cos(x,n)/(|r|2)) ds
化成第二型曲线积分:g = ±∫[L] ((y-m)/(|r|2) dx - (x-e)/(|r|2) dy)±表示法线n的两个方向。
此方程满足积分路径无关的条件,假如L是一条闭曲线,A在L外部,那么g=0,如果A在内部,根据挖奇点法,积分结果为2π。
参考资料:百度百科——高斯积分