导数公式:
(tgx)??sec2x(ctgx)???csc2x(secx)??secx?tgx(cscx)???cscx?ctgx(ax)??axlna(logax)??基本积分表:
(arcsinx)??11xlna1?x21(arccosx)???1?x21(arctgx)??1?x21(arcctgx)???1?x2?tgxdx??lncosx?C?ctgxdx?lnsinx?C?secxdx?lnsecx?tgx?C?cscxdx?lncscx?ctgx?Cdx1x?arctg?C?a2?x2aadx1x?a?ln?x2?a22ax?a?Cdx1a?x??a2?x22alna?x?Cdxx?arcsin?C?a2?x2a?2ndx2?cos2x??secxdx?tgx?Cdx2?csc2?sinx?xdx??ctgx?C?secx?tgxdx?secx?C?cscx?ctgxdx??cscx?Cax?adx?lna?Cx?shxdx?chx?C?chxdx?shx?C?dxx2?a2?ln(x?x2?a2)?C?2In??sinxdx??cosnxdx?00n?1In?2n???x2a22x?adx?x?a?ln(x?x2?a2)?C22x2a2222x?adx?x?a?lnx?x2?a2?C22x2a2x222a?xdx?a?x?arcsin?C22a22三角函数的有理式积分:
2u1?u2x2dusinx?, cosx?, u?tg, dx? 22221?u1?u1?uDOC文档.
一些初等函数: 两个重要极限:
ex?e?x双曲正弦:shx?2ex?e?x双曲余弦:chx?2shxex?e?x双曲正切:thx??chxex?e?xarshx?ln(x?x2?1)archx??ln(x?x2?1)11?xarthx?ln21?x三角函数公式: ·诱导公式:
函数 角A -α 90°-α 90°+α sin
sinx lim?1x?0 x1
lim(1?)x?e?2.718281828459045...x?? x
cos tg -tgα ctgα ctg -ctgα tgα -ctgα ctgα tgα -ctgα ctgα -sinα cosα cosα cosα sinα -sinα -ctgα -tgα -cosα -tgα 180°-α sinα 180°+α -sinα -cosα tgα 270°-α -cosα -sinα ctgα 270°+α -cosα sinα 360°-α -sinα cosα 360°+α sinα cosα -tgα tgα -ctgα -tgα
·和差角公式: ·和差化积公式:
sin(???)?sin?cos??cos?sin?cos(???)?cos?cos??sin?sin?tg??tg?tg(???)?1?tg??tg?ctg??ctg??1ctg(???)?ctg??ctg?
sin??sin??2sin???22??????sin??sin??2cossin22??????cos??cos??2coscos22??????cos??cos??2sinsin22cos???DOC文档.
·倍角公式:
sin2??2sin?cos?cos2??2cos2??1?1?2sin2??cos2??sin2?ctg2??1ctg2??2ctg?2tg?tg2??1?tg2?
·半角公式:
sin3??3sin??4sin3?cos3??4cos3??3cos?3tg??tg3?tg3??1?3tg2?sintg?2????1?cos??1?cos? cos??2221?cos?1?cos?sin??1?cos?1?cos?sin??? ctg????1?cos?sin?1?cos?21?cos?sin?1?cos?abc???2R ·余弦定理:c2?a2?b2?2abcosC sinAsinBsinC?2
·正弦定理:
·反三角函数性质:arcsinx?中值定理与导数应用:
?2?arccosx arctgx??2?arcctgx
拉格朗日中值定理:f(b)?f(a)?f?(?)(b?a)f(b)?f(a)f?(?)柯西中值定理:?F(b)?F(a)F?(?)曲率:
当F(x)?x时,柯西中值定理就是拉格朗日中值定理。弧微分公式:ds?1?y?2dx,其中y??tg?平均曲率:K???.??:从M点到M?点,切线斜率的倾角变化量;?s:MM?弧长。?sy????d?M点的曲率:K?lim??.
23?s?0?sds(1?y?)直线:K?0;1半径为a的圆:K?.aDOC文档.
空间解析几何和向量代数:
空间2点的距离:d?M1M2?(x2?x1)2?(y2?y1)2?(z2?z1)2????a?b?a?bcos??axbx?ayby?azbz,是一个数量,两向量之间的夹角:cos??i???c?a?b?axbx平面的方程:axbx?ayby?azbzax?ay?az?bx?by?bz222222
jayby??????az,c?a?bsin?.例:线速度:v?w?r.bzk?1、点法式:A(x?x0)?B(y?y0)?C(z?z0)?0,其中n?{A,B,C},M0(x0,y0,z0)2、一般方程:Ax?By?Cz?D?0xyz3、截距世方程:???1abc平面外任意一点到该平面的距离:d?Ax0?By0?Cz0?DA2?B2?C2?x?x0?mtx?x0y?y0z?z0??空间直线的方程:???t,其中s?{m,n,p};参数方程:?y?y0?ntmnp?z?z?pt0?二次曲面:x2y2z21、椭球面:2?2?2?1abc22xy2、抛物面:??z(,p,q同号)2p2q3、双曲面:x2y2z2单叶双曲面:2?2?2?1abc22xyz2双叶双曲面:2?2?2?(马鞍面)1abc
多元函数微分法及应用
全微分:dz??z?z?u?u?udx?dy du?dx?dy?dz?x?y?x?y?z全微分的近似计算:?z?dz?fx(x,y)?x?fy(x,y)?y多元复合函数的求导法:dz?z?u?z?vz?f[u(t),v(t)] ???? dt?u?t?v?t?z?z?u?z?vz?f[u(x,y),v(x,y)] ? ????x?u?x?v?x当u?u(x,y),v?v(x,y)时,?u?u?v?vdu?dx?dy dv?dx?dy ?x?y?x?y隐函数的求导公式:FxFFdydyd2y??隐函数F(x,y)?0, ??, 2?(?x)+(?x)?dxFy?xFy?yFydxdxFyF?z?z隐函数F(x,y,z)?0, ??x, ???xFz?yFz
DOC文档.
微分法在几何上的应用:
?x??(t)x?xy?y0z?z0?空间曲线?y??(t)在点M(x0,y0,z0)处的切线方程:0????(t0)??(t0)??(t0)?z??(t)?在点M处的法平面方程:??(t0)(x?x0)???(t0)(y?y0)???(t0)(z?z0)?0??FyFzFzFxFx?F(x,y,z)?0若空间曲线方程为:,则切向量T?{,,?GGGxGGG(x,y,z)?0?yzzx?曲面F(x,y,z)?0上一点M(x0,y0,z0),则:?1、过此点的法向量:n?{Fx(x0,y0,z0),Fy(x0,y0,z0),Fz(x0,y0,z0)}x?x0y?y0z?z03、过此点的法线方程:??Fx(x0,y0,z0)Fy(x0,y0,z0)Fz(x0,y0,z0)FyGy}
2、过此点的切平面方程:Fx(x0,y0,z0)(x?x0)?Fy(x0,y0,z0)(y?y0)?Fz(x0,y0,z0)(z?z0)?0重积分及其应用:
??f(x,y)dxdy???f(rcos?,rsin?)rdrd?DD?曲面z?f(x,y)的面积A???D??z???z?1????????dxdy??x???y?22
MyM?M平面薄片的重心:x?x?M??x?(x,y)d?D???(x,y)d?D2D, y???y?(x,y)d?D???(x,y)d?DD平面薄片的转动惯量:对于x轴Ix???y?(x,y)d?, 对于y轴Iy???x2?(x,y)d?平面薄片(位于xoy平面)对z轴上质点M(0,0,a),(a?0)的引力:F?{Fx,Fy,Fz},其中:Fx?f??D?(x,y)xd?(x2?y2?a)322, Fy?f??D?(x,y)yd?(x2?y2?a)322, Fz??fa??D?(x,y)xd?3(x2?y2?a2)2常数项级数:
1?qn等比数列:1?q?q???q?1?q(n?1)n
等差数列:1?2?3???n?2111调和级数:1?????是发散的23n2n?1级数审敛法:
1、正项级数的审敛法——根植审敛法(柯西判别法):???1时,级数收敛?设:??limnun,则???1时,级数发散n?????1时,不确定?2、比值审敛法:???1时,级数收敛U?设:??limn?1,则???1时,级数发散n??Un???1时,不确定?3、定义法:sn?u1?u2???un;limsn存在,则收敛;否则发散。n??
DOC文档.
专升本高数公式大全
