高考数学总复习 24 定积分与微积分基本定理(理)课后作业 新人教A版
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1.(2010·湖南)⎠⎛241xd x 等于( )A .-2ln2B .2ln2C .-ln2D .ln2[答案] D[解析] ⎠⎛241xd x =ln x |42=ln4-ln2=ln2.2.(2011·汕头模拟)设f (x )=⎩⎪⎨⎪⎧x 2x ∈[0,1]2-x x ∈1,2],则⎠⎛02f (x )d x 等于( )A.34 B.45 C.56 D .不存在[答案] C[解析] ⎠⎛02f (x )d x =⎠⎛01x 2d x +⎠⎛12(2-x )d x=13x 3|10+⎪⎪⎪⎝ ⎛⎭⎪⎫2x -12x 221=56. 3.曲线y =cos x (0≤x ≤2π)与直线y =1所围成的图形面积是( ) A .2π B .3π C.3π2D .π[答案] A [解析] 如下图,S =∫2π0(1-cos x )d x=(x -sin x )|2π0=2π.[点评] 此题可利用余弦函数的对称性①②③④面积相等解决,但若把积分区间改为⎝ ⎛⎭⎪⎫π6,π,则对称性就无能为力了. 4.(2010·德州阶段检测)⎠⎜⎜⎛-π2π2 (sin x +cos x )d x 的值是( )A .0 B.π4C .2D .4[答案] C[解析] ⎠⎜⎜⎛-π2π2 (sin x +cos x )d x =(-cos x +sin x )|⎪⎪⎪⎪π2-π2=2.5.(2010·吉林省调研)已知正方形四个顶点分别为O (0,0),A (1,0),B (1,1),C (0,1),曲线y =x 2(x ≥0)与x 轴,直线x =1构成区域M ,现将一个质点随机地投入正方形中,则质点落在区域M 内的概率是( )A.12B.14 C.13 D.25[答案] C[解析] 如图,正方形面积1,区域M 的面积为S =⎠⎛01x 2d x =13x 3|10=13,故所求概率p =13.6.(2010·马鞍山市质检)设f (x )=⎠⎛0x (1-t )3d t ,则f (x )的展开式中x 的系数是( )A .-1B .1C .-4D .4[答案] B[解析] f (x )=⎠⎛0x (1-t )3d t =-14(1-t )4|x 0=14-14(1-x )4,故展开式中x 的系数为-14×(-C 14)=1,故选B.7.已知函数f (x )=3x 2+2x +1,若⎠⎛-11f (x )d x =2f (a )成立,则a =________.[答案] -1或13.[解析] ⎠⎛-11 (3x 2+2x +1)d x =(x 3+x 2+x )|1-1=4,∴2(3a 2+2a +1)=4即3a 2+2a -1=0,解得a =-1或a =13.8.(2011·潍坊模拟)抛物线y =-x 2+4x -3及其在点A (1,0)和点B (3,0)处的切线所围成图形的面积为________.[答案]23[解析] ∵y ′=-2x +4,∴在点A (1,0)处切线斜率k 1=2,方程为y =2(x -1), 在点B (3,0)处切线斜率k 2=-2,方程为y =-2(x -3).由⎩⎪⎨⎪⎧y =2x -1y =-2x -3得⎩⎪⎨⎪⎧x =2y =2,故所求面积S =⎠⎛12[(2x -2)-(-x 2+4x -3)]d x +⎠⎛23[(-2x +6)-(-x 2+4x -3)]d x =(13x 3-x 2+x )|21+(13x 3-3x 2+9x )|32=13+13=23.1.(2010·福建莆田市质检)如图,D 是边长为4的正方形区域,E 是区域D 内函数y =x 2图象下方的点构成的区域,向区域D 中随机投一点,则该点落入区域E 中的概率为( )A.15B.14 C.13 D.12[答案] C[解析] 阴影部分面积S =2⎠⎛02x 2d x =2×13x 3|20=163,又正方形面积S ′=42=16,∴所求概率P =SS ′=13. 2.(2010·江苏盐城调研)甲、乙两人进行一项游戏比赛,比赛规则如下:甲从区间[0,1]上随机等可能地抽取一个实数记为b ,乙从区间[0,1]上随机等可能地抽取一个实数记为c (b 、c 可以相等),若关于x 的方程x 2+2bx +c =0有实根,则甲获胜,否则乙获胜,则在一场比赛中甲获胜的概率为( )A.13B.23C.12D.34[答案] A[解析] 方程x 2+2bx +c =0有实根的充要条件为Δ=4b 2-4c ≥0,即b 2≥c ,由题意知,每场比赛中甲获胜的概率为p =⎠⎛01b 2db 1×1=13.3.(2010·安徽巢湖市质检)设a =⎠⎛0πsin x d x ,则二项式(a x -1x)6展开式的常数项是( )A .160B .20C .-20D .-160[答案] D[解析] a =⎠⎛0πsin x d x =-cos x |π=2,T r +1=C r 6(2x )6-r⎝ ⎛⎭⎪⎫-1x r =(-1)r 26-r C r 6x 3-r,∵T r +1为常数项,∴3-r =0,∴r =3, ∴(-1)3×23×C 36=-160,故选D.4.(2010·湖南师大附中)设点P 在曲线y =x 2上从原点到A (2,4)移动,如果把由直线OP ,直线y =x 2及直线x =2所围成的面积分别记作S 1,S 2.如图所示,当S 1=S 2时,点P 的坐标是( )A.⎝ ⎛⎭⎪⎫43,169B.⎝ ⎛⎭⎪⎫45,169C.⎝ ⎛⎭⎪⎫43,157 D.⎝ ⎛⎭⎪⎫45,137 [答案] A[解析] 设P (t ,t 2)(0≤t ≤2),则直线OP :y =tx ,∴S 1=⎠⎛0t (tx -x 2)d x =t 36;S 2=⎠⎛t2(x 2-tx )d x =83-2t +t 36,若S 1=S 2,则t =43,∴P ⎝ ⎛⎭⎪⎫43,169.5.(2010·上海大同中学模拟)在函数y =|x |(x ∈[-1,1])的图象上有一点P (t ,|t |),此函数与x 轴,直线x =-1及x =t 围成图形(如图阴影部分)的面积为S ,则S 与t 的函数关系图可表示为( )[答案] B[解析] 当t ≤0时,S =⎠⎛-1t -x d x =-12x 2|t -1=12-12t 2;当t >0时,S =12+⎠⎛0t x d x =12+12x 2|t 0=12+12t 2,故选B.6.(2011·龙岩质检)已知函数f (x )=sin 5x +1,根据函数的性质、积分的性质和积分的几何意义,探求∫π2-π2f (x )d x 的值,结果是( )A.16+π2 B .π C .1 D .0[答案] B[解析] ⎠⎜⎜⎛-π2π2f (x)d x =⎠⎜⎜⎛-π2π2sin 5x d x +⎠⎜⎜⎛-π2π21d x ,由于函数y =sin 5x 是奇函数,所以⎠⎜⎜⎛-π2π2sin 5x d x =0,而⎠⎜⎜⎛-π2π21d x =x⎪⎪⎪⎪π2-π2=π,故选B.7.(2010·广东佛山顺德区质检)对任意非零实数a 、b ,若a ⊗b 的运算原理如图所示,则2⊗⎠⎛0πsin x d x =________.[答案]22[解析] ∵⎠⎛0πsin x d x =-cos x |π0=2>2,∴2⊗⎠⎛0πsin x d x =2⊗2=2-12=22.8.(2011·福州月考)已知函数f (x )=-x 3+ax 2+bx (a ,b ∈R)的图象如图所示,它与x 轴在原点处相切,且x 轴与函数图象所围区域(图中阴影部分)的面积为112,求a 的值.[解析] f ′(x )=-3x 2+2ax +b ,∵f ′(0)=0,∴b =0, ∴f (x )=-x 3+ax 2,令f (x )=0,得x =0或x =a (a <0). ∴S 阴影=⎠⎛a0[0-(-x 3+ax 2)]d x=(14x 4-13ax 3)|0a =112a 4=112, ∵a <0,∴a =-1.1.⎠⎜⎛0 π2(sin x +a cos x )d x =2,则实数a 等于( ) A .-1 B .1 C .- 3 D. 3[答案] B[解析] ⎠⎜⎛0 π2 (sin x +a cos x )d x =(-cos x +a sin x ) ⎪⎪⎪⎪π2=⎝⎛⎭⎪⎫-cos π2+a sin π2-(-cos0+a sin0)=a +1=2, ∴a =1,故选B.2.(2011·潍坊二模)曲线y =sin x ,y =cos x 与直线x =0,x =π2所围成的平面区域的面积为( )A .⎠⎜⎛0 π2(sin x -cos x )d x B .2⎠⎜⎛0 π4(sin x -cos x )d xC .⎠⎜⎛0 π2(cos x -sin x )d x D .2⎠⎜⎛0 π4(cos x -sin x )d x[答案] D[解析] 在同一坐标系中作出函数y =sin x (0≤x ≤π2)与y =cos x (0≤x ≤π2)的图象,可以发现两图象交于点P (π4,22),两图象与直线x =0,x =π2所围成的平面区域关于直线x =π4对称,在[0,π4)上,cos x >sin x ,由x =0,y =cos x ,y =sin x 在[0,π4]上围成的平面区域面积为⎠⎜⎛0π4 (cos x -sin x )d x ,故选D.。