設f(x),g(x)在x=x0處連續,則:
1、f(x)±g(x)在x=x0處連續
2、f(x)g(x)在x=x0處連續
3、若g(x)≠0,則f(x)/g(x)在x=x0處連續
二、連續函數運算-複合運算證明:
因為f(x),g(x)在x=x0處連續
所以lim(x-x0)f(x)=f(x0),lim(x->x0)g(x)=g(x0)
(1)
lim(x->x0)[f(x)±g(x)]=lim(x->x0)f(x)±lim(x->x0)g(x)=f(x0)±g(x0)
所以f(x)±g(x)在x=x0處連續
(2)
lim(x->x0)[f(x)g(x)]=lim(x->x0)f(x)lim(x->x0)g(x)=f(x0)g(x0)
所以f(x)g(x)在x=x0處連續
(3)
g(x)≠0
lim(x->x0)[f(x)/g(x)]=lim(x->x0)f(x)/lim(x->x0)g(x)=f(x0)/g(x0)
所以f(x)/g(x)在x=x0處連續
y=f(u), u=g(x), g(x)≠a
若:lim(u->a)f(u)=A, lim(x->x0)g(x)=a, 則lim(x->x0)[f(g(x))]=A
即:lim(x->x0)[f(g(x))]=f[lim(x->x0)g(x)]=f(a)
所以求極限遇到複合函數可以将lim往子函數裡面“鑽”
如:lim(x->0)arctanx((1-x)/(1 x))=arctan[lim(x->0)((1-x)/(1 x))]=arctan1=π/4
三、初等函數連續性1、基本初等函數
(1)x^a
(2)a^x, (a>0且a≠1)
(3)loga(x),(a>0且a≠1)
(4)sinx, cosx, tanx, cotx, secx, cscx
(5)arcsinx, arccosx, arctanx, arccotx
2、基本初等函數在其定義域内連續
3、初等函數(基本初等函數與常數進行四則或複合而成的函數)在其定義域内連續
例1:lim(x->2)[x^3-3x^2 4]
此函數為初等函數,在定義域内連續,由連續的性質的值極限值等于該點函數值
所以:原式=0
例2:lim(x->0)[(1 2x)/(1-x)]^(1/sin2x)
=lim(x->0)[1 3x/(1-x)]^(1/sin2x)
=lim(x->0)[1 3x/(1-x)]^[((1-x)/3x)*(3x/sin2x)*(1/1-x)]
=e^[lim(x->0)[(3x/sin2x)*(1/1-x)]]
=e^[lim(x->0)(3x/sin2x)*lim(x->0)(1/1-x)]
=e^(3/2)
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