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1、1 大学数学基础教程(微积分 1-4 章)习题答案 习题 11 解答 1设,求 y x xyyxf+=),( ),( 1 ),(), 1 , 1 (),( yxfy x xyf yx fyxf 解; y x xyyxf+=),( xxy y yxf yx y x xyf x y xyyx f + =+=+= 2 22 ),( 1 ;),(; 1 ) 1 , 1 ( 2设,证明:yxyxflnln),(=),(),(),(),(),(vyfuyfvxfuxfuvxyf+= ),(),(),(),( lnlnlnlnlnlnlnln )ln)(lnln(ln)ln()ln(),( vyfuyfvx
2、fuxf vyuyvxux vuyxuvxyuvxyf += += += 3求下列函数的定义域,并画出定义域的图形: (1);11),( 22 +=yxyxf (2); )1ln( 4 ),( 22 2 yx yx yxf = (3);1),( 2 2 2 2 2 2 c z b y a x yxf= (4). 1 ),( 222 zyx zyx zyxf + = 解(1)1, 1),(=yxyxD y x 1 1-1 -1 O 2 (2)xyyxyxD4, 10),( 222 =xx306 )6,5( )6,5( 2 2 = x x f 在点(5,6)取得极小值),(yxf88)6 , 5(
3、=f 又()0243612)6(26 )6,1 ( )6,1( 2 )6,1( =+= xxxf 当时,有极小值,从而该极小值就是所求的最小值(唯一驻点) 2 1 =x)(xf = 2 1 2 2 1 2 2 = xx d 8 27 故抛物线和直线之间的最短距离为 2 xy=02 =yx 8 27 5、求抛物线被平面截成一椭圆,求原点到此椭圆的最长与 22 yxz+=1=+zyx 最短距离。 解:设椭圆上任意一点为(x,y,z),它到原点的距离为 222 zyxd+= 此问题即是求在条件下的最大值和最小值。 222 zyxd+= =+ += 1 22 zyx yxz 令) 1()( 22222
4、 +=zyxzyxzyxL 由 += += += += += 令 令 令 令 令 01 0 02 022 022 22 zyxL zyxL zL yyL xxL z y x 由-得0)(2(1=+yx 若代入,得,1=0= 再代入,=r (4)设+= 432 2 1 2 1 2 1 2 1 s += 3 3 2 2 3 2 3 2 3 2 1 因为为的几何级数,为 的几何级数,故,均为收敛s 2 1 =rr 3 2 s 级数, 故原级数收敛。 习题 42 1(1)因为,而级数发散,故该级数发散。 2 1 1 12 1 lim= n n n =1 1 n n (2) 因为,而发散,故原级数发散。
5、 nnn n n n un 11 1 1 22 = + + + + = =1 1 n n =1n n u (3)因为,而且收敛,故原级数收敛 。 ()() 1 45 lim 1 41 1 lim 2 2 2 = + = + nn n n nn nn =1 2 1 n n (4)因为,而且收敛,故原级数收敛。 = n n n n n n 2 2 sin lim 2 1 2 sin lim =12 1 n n 2 (1),因为, n n n n u 2 3 =1 2 3 ) 12 3 (lim 2 3 2)1( 3 limlim 1 1 1 = + = + = + + + n n n n u u
6、n n n n n n n n n 故级数发散。 52 (2)因为,故级数收敛。1 3 1 ) 1 ( 3 1 lim 3 3 )1( limlim 2 2 1 2 1 a b 当时,无法判断。ab=1= a b 4 (1),而, n n nu) 4 3 (=1 4 3 4 31 lim ) 4 3 ( ) 4 3 )(1( limlim 1 1 = + = + = + + n n n n u u n n n n n n n 故级数收敛 53 (2),而,故级数收敛。 ! 4 n n un=10 1 1 ) 1 (lim ! )!1( )1( limlim 4 4 4 1 = + + = +
7、+ = + nn n n n n n u u nn n n n (3)因为,而级数发散,故级数发散。1 2 1 lim 1 )2( 1 lim 1 lim 1 = + + = + + = + n n n nn n n u nn n n =1 1 n n (4)因为,1 2 ) 1 1( 1 lim2) 1 (2lim !2 )1( )!1(2 limlim 1 1 1 + = =1 1 n n = 1 11 n na 5(1 ),显 然为一 交错级数,且 满足, 2 1 1 1 )1( n u n n = =1n n u 1+ nn uu ,0lim= n n u 因而该级数收敛。又是的级数,
8、所以发散, = = = 1 2 1 1 1 nn n n u1pp =1n n u 即原级数是条件收敛。 (2)对于,故收敛,1 3 11 3 1 lim 3 3 1 limlim 1 1 nn uu 1 1 + n un 发散,故原级数是条件收敛。 =1n n u (5)因为,故级数发散。= = = 123)1( 22222 lim ! 2 lim 2 1 nnn u nnnnn n n n n n 6 (1)因为为几何级数,且, = = = = 0 1 11 1 1 ) 4 1 () 4 1 ( 4 )1( n n n nn n n 4 1 =r 其和为。 5 4 ) 4 1 (1 1 1
9、 1 = = r (2)因为 = = = = = = +=+=+= + 100111 ) 3 1 ( 3 1 ) 2 1 ( 2 1 ) 3 1 () 2 1 () 3 1 () 2 1 ( 6 23 nn n n nn n n n nn n n nn 而由知,其和为 =0 ) 2 1 ( n n 2 1 =r2 2 1 1 1 1 1 = = r 由知,其和为 =0 ) 3 1 ( n n 3 1 =r 2 3 3 1 1 1 1 1 = = r 故 2 3 2 3 3 1 2 2 1 6 23 1 =+= + =n n nn 7设排球每一次下落后的高度依次为: , hhh hhh hhh
10、hhh hh n nn )43(43 ,)43(43 ,)43(43 ,)43(43 ,43 1 4 34 3 23 2 12 1 = = = = = 55 反弹的总距离hhhhhs n n nn n n 3 431 1 4 3 )43( 4 3 )43( 011 = = = = = 8由已知可得: ,)(sinsin)90cos( ,)(sinsin ,)(sinsin)90cos( ,sin 4 3 2 bEFEFFG bDEEF bCDCDDE bCD o o = = = = L=|CD|+|DE|+|EF|+|FG|+ = sin1 sin sin1 1 sin)(sinsin)(si
11、n 10 = = = = b bbb nn nn 习题 4-3 1 (1) 2 1 )1)1(2 )1(2 limlim 21 2 1 = + + = + + n n a a R n n n n n n 当时,级数收敛,所以该级数的收敛域为 2 1 x= 2 1 , 2 1 (2)1 11 1 limlim 1 = + = + n n a a R n n n n 当时,级数收敛,当时,级数发散,4x=6x= 所以该级数的收敛域为)6 , 4 (3)该幂级数只含有奇次幂项,记,则有 nn n n nx u )3(2 12 + = 2 12 1112 1 3 1 )3(2( )3(2()1( li
12、mlimx nx xn u u nnn nnn n n n n = + + = + + 当时,级数收敛,当时,级数发散,于是收敛半径3x3R= 当时,级数发散,所以该级数的收敛域为3x=)3,3( (4)该幂级数只含有偶次幂项,记,则有 nn n axu 2 )(2+= 56 2 2 221 1 2 )(2 )(2 limlimax ax ax u u nn nn n n n n += + + = + + 当时,级数收敛,当时,级数发散,于是收敛半径 2 2 ax+ 2 2 R= 当时,级数发散,所以收敛域为 2 2 ax=) 2 2 a, 2 2 a(+ 2 (1)设)11()( 1 1 =
13、 = xnxxs n n )11( 1 )()( 1 0 1 1 0 = = = x x x xdxnxdxxs n n x n n x 故)1x1( )x1( 1 x1 x )x(s 2 = = (2)设)1x1( 1n2 x )x(s 1n 1n2 = = )1x1( x1 1 x)x(s 2 1n 2n2 = = )11( 1 1 ln 2 1 )1ln()1ln( 2 1 1 1 1 1 2 1 1 1 1 1 2 1 )1)(1( 1 1 1 1 1 1 1 )0()( 00 00 0 2 0 2 0 2 + = += + + = + = + = = = += x x x xxdx
14、x dx x dx xx dx xx dx x dx x dx x sxs xx xx xxx (3)设)1x1(x)1n2()x(s 1n n += = 则)1x1(xx)1n(2)x(s 1n nn 1n += = = 令)1x1(x)1n()x(u n 1n += = 57 )1x1( x1 x xdx)x(u 2 1n 1n x 0 = = + )1x1( )x1( xx2 x1 x )x(u 2 22 = = 故)1x1( )x1( xx3 x1 x )x1( xx2 2)x(s 2 2 2 2 = = (4)设)1x1( )1n(n x )x(s 2n n = = )1x1( 1n x )x(s 2n 1n = = )1x1( x1 1 x)x(s 2n 2n = = )1x1()x1ln(dx x1 1 )0(s)x
