已知y=f(x √x^2 1),f(x)=arctan(1-x^2),则dy
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![已知y=f(x √x^2 1),f(x)=arctan(1-x^2),则dy](/uploads/image/f/4231097-17-7.jpg?t=%E5%B7%B2%E7%9F%A5y%3Df%28x+%E2%88%9Ax%5E2+1%29%2Cf%28x%29%3Darctan%281-x%5E2%29%2C%E5%88%99dy)
令x=y=0得2f(0)=2f^2(0),于是f(0)=0.(因为f(0)不为1).再令x=0得f(y)+f(-y)=2f(0)f(y)=0,因此f(-y)=-f(y),f是奇函数.显然有F(-x)=
(1)令x=y=0f(x+y)=f(x)f(y)-f(x)-f(y)+2变为f(0)=f(0)^2-2f(0)+2f(0)^2-3f(0)+2=0(f(0)-1)(f(0)-2)=0f(0)=1或f(
f(-3)=f(-3/2-3/2)=f(-3/2)+f(-3/2)=af(-3/2)=a/2
令y=2,根据f(2)=1/2,2f(x)f(y)=f(x+y)+f(x-y)有f(x)=f(x+2)+f(x-2)x=2010f(2010)=f(2012)+f(2008)x=2008f(2008)
令y=-xf(x-x)=f(0)=f(x)+f(-x)f(0+0)=f(0)+f(0)=0故f(x)+f(-x)=0从而f(x)=-f(-x)奇函数得证f(3)=-f(-3)=-af(6)=f(3)+
y'=f'(ln(x+√(a+x²)))·ln(x+√(a+x²))‘=f'(ln(x+√(a+x²)))·1/(x+√(a+x²))·(x+√(a+x
令y=xx+y=2x所以f(2x)=f(x)+f(x)=2f(x)令x=0则f(2*0)=2*f(0)即f(0)=2f(0)f(0)=0令y=-x则f(0)=f(x)+f(-x)所以f(-x)=-f(
1.令x=y=0f(0)=f(0)+f(0)=2f(0),f(0)=0令y=-xf(0)=f(x)+f(-x)=0f(-x)=-f(x)得证2.令x>yf(x-y)
1,令y=-xf(0)=f(x)+f(-x)2,f(x)+f(-x)=0f(x)=-f(-x)f(3)=-af(6)=f(3)+f(3)=-2af(12)=2f(6)=-4a3,f(x)=-f(-x)
令x=y=0,则f(0)=0.令y=-x,则f(0)=f(x)+f(-x),则f(x)在R上为奇函数.f(x+y)=f(x)+f(y),有f(x-y)=f(x)+f(-y)=f(x)-f(y).
这道题实际就是要把x^2+y^2变换成只由x+y和y组成的多项式x^2+y^2=x^2-y^2+2y^2=(x+y)(x-y)+2y^2=(x+y)[(x+y)-2y]+2y^2将式中(x+y)替换为
证明令x=x/y,y=y∵f(xy)=f(x)+f(y)∴f(x/y*y)=f(x/y)+f(y)f(x)=f(x/y)+f(y)∴f(x/y)=f(x)-f(y)
f(x)=2f(1/x)+x(1)令x=1/xf(1/x)=2f(x)+1/x(2)(1)+2*(2)f(x)+2f(1/x)=2f(1/x)+x+4f(x)+2/x-3f(x)=x+2/x=(x^2
1.f(0)+f(0)=f(0+0)推出f(0)=0故f(x)+f(-x)=f(0)=0∴f(-x)=-f(x)2.设x1>x2∈R,f(x1)+f(-x2)=f(x1-x2)由1的结论,f(x1)-
(1)令XY为0,则f(x+y)=f(x)+f(y)f(0)=f(0)+f(0)所以f(0)=0再令Y=-X所以f(x-x)=f(x)+f(-x)所以f(x)=-f(-x)即f(x)是奇函数(2)因f
依题意有f(0+0)+f(0-0)=2f(0)*f(0)又f(0)不等于0所以f(0)=1当x=0,y取任何实数时f(0+y)+f(0-y)=2f(0)*f(y)=2f(y)所以f(-y)=f(y)所
f(x)=f(x+1)+f(x-1)f(x+1)=f(x)+f(x+2)上面两个式子联立,f(x+2)=-f(x-1)即f(x)=f(x+6)f(2010)=f(0)4f(1)f(0)=f(1-0)+
由F(X*Y)=F(X)+F(Y),取Y=1得F(X*1)=F(X)+F(1),得F(1)=0F(1)=F(X/X)=F(X)+F(1/X)=0即F(1/X)=-F(X)因此F(X/Y)=F(X)+F
这个性质是从实际对数抽象出来的性质,可称为对数性质,与其相对应的有指数性质,线性性质,三角函数性质.证明:已知f(xy)=f(x)+f(y)且f(a)=1.f(1)=f(1)+f(1)可知f(1)=0
(1)已知f(x+y)=f(x)+f(y),当x=0且y=0时有f(0+0)=f(0)+f(0),即f(0)=2f(0),所以f(0)=0当y=-x时有f(x-x)=f(x)+f(-x),即f(0)=