∫dx sin(π 4-2x)^2

答案见附图

是这样的：x^5+x^4=x^3(x^2+x)=(x^2+x)[(x^3-1)+1]=(x^2+x)(x^3-1)+x^2+x=[x(x+1)(x-1)](x^2+x+1)+x^2+x=(x^3-x)

∫tan(x)dx=∫sin(x)/cos(x)dx=-∫1/cos(x)d(cosx)=-ln|cosx||(0,1/4π)=ln1-ln√2/2=-ln√2/2∫(cos(x)ln(x)-sin(

|x-1|+|x-10|表示数轴上x到1的距离+x到10的距离.显然最小值是9,此时x只要在1到10之间就好.类似的,|x-2|+|x-9|的最小值是7,此时x在2到9之间就好.|x-3|+|x-8|

因为2π+1=7.28.所以|x-1|+|x-2|+|x-3|+|x-4|+|x-5|+|x-6|+|x-7|+|x-8|+|x-9|+|x-10|=x-1+x-2+x-3+x-4+x-5+x-6+x

=∫x^2dx+∫1/x^4dx=1/3x^3-1/3*1/x^3+C=1/3(x^3-1/*x^3)+C

∫dx/√(4x-x^2)=∫dx/√([4-（x-2）^2]=arcsin[(x-2)/2]+C

∫x/[(x^2+1)(x^2+4)]dx=1/3∫x[1/(x^2+1)-1/(x^2+4)]dx=1/3[∫x/(x^2+1)dx-∫x/(x^2+4)dx]=1/3[1/2∫1/[(x^2+1)

∫(0~π)根号(cos^2x-cos^4x)dx=2∫(0~π/2)根号(cos^2x(1-cos^2x))dx=2∫(0~π/2)cosxsinxdx=2∫(0~π/2)sinxdsinx=(si

每个绝对值里都是正数所以原式=x+1+x+3+x+5+……+x+13-x-2-x-4-x-6-……-x-12=x-1*6+13=x+7=π/2+7

∫2^x*3^x/(9^x-4^x)dx=∫(2/3)^xdx/[1-(4/9)^x]=[ln(2/3)]^(-1)∫d[(2/3)^x]/{1-[(2/3)^x]^2}={[ln(2/3)]^(-1

设x1=4-√3,x2=4+√3,是方程X^2-8X+13=0的两根所以X1^2-8X1+15=2X^4-6X^3-2X^2+18X+23=(X+1)^2*(X^2-8X+13)+10=10所以原式=

原式=∫[(1/2)/(x-1)-(1/2)/(x+1)-1/x²]dx=(1/2)ln│x-1│-ln│x+1│+1/x+C(C是积分常数)=(1/2)ln│(x-1)/(x+1)│+1/

∵(x^4-4x^2+5x-15)/[(x^2+1)(x-2)]=[(x^4+x²-5x²-5)+(5x-10)]/[(x²+1)(x-2)]=[x²(x&su

[(x^3-2x^2+x+1)/(x^4+5x^2+4)]=1/(x^2+1)+(x-3)/(x^2+4).原式=∫1/(x^2+1)dx+∫(x-3)/(x^2+4)dx=arctanx+(1/2)

不知道你^这个符号什么意思暂且当成平方做吧x^2+4x+3=(x+1)(x+3)(2x-x)^2=x^2x^2+x=x(x+1)x^2+x-6=(x+3)(x-2)约分：得x/(x-2)再问：题目炒错

原式=∫(3x^4+3x^2-2x^2-2+2)/(x^2+1)dx=∫[3x^2-2+2/(x^2+1)]dx=x^3-2x+2arctanx+C

/>(x+2)/(x+1)-(x+3)/(x+2)-(x+4)/(x+3)+(x+5)/(x+4)=1+1/(x+1)-1-1/(x+2)-1-1/(x+3)+1+1/(x+4)=1/(x+1)-1/

不太明白你的意思,是二个多项式通分同分母吗?(x+4)/(x^2+4x)=(x+4)/[x(x+4)]=1/x=(x-2)/[x(x-2)(x-5)/[x(x-5)-2(x-5)]=(x-5)/[(x