第1个回答 2015-03-17
设f(x)=arctanx
由题目已知条件可知f(x)在区间[c,d]内满足拉格朗日中值定理
根据定理,有f(d)-f(c)=f '(a)·(d-c) (c<=a<=d)
而f '(a)=1/1+a^2
所以f(d)-f(c)=arctand-arctanc=(d-c)/1+a^2
又因为1/1+d^2<=1/1+a^2<=1/1+c^2
所以 (d-c)/1+d^2<=(d-c)/1+a^2<=(d-c)/1+c^2
即 (d-c)/1+d^2<=arctand-arctanc<=(d-c)/1+c^2
(证明过程中<=为小于等于号)
由题目已知条件可知f(x)在区间[c,d]内满足拉格朗日中值定理
根据定理,有f(d)-f(c)=f '(a)·(d-c) (c<=a<=d)
而f '(a)=1/1+a^2
所以f(d)-f(c)=arctand-arctanc=(d-c)/1+a^2
又因为1/1+d^2<=1/1+a^2<=1/1+c^2
所以 (d-c)/1+d^2<=(d-c)/1+a^2<=(d-c)/1+c^2
即 (d-c)/1+d^2<=arctand-arctanc<=(d-c)/1+c^2
(证明过程中<=为小于等于号)
第2个回答 2015-03-17
令f(x)=arctanx
f'(x)=1/(1+x²),x>0时,f'(x)为减函数
拉格朗日定理:存在c<ξ<d,满足f'(ξ)=f(d)-f(c)/(d-c)=arctand-arctanc/(d-c)
减函数性质:f'(d)<f'(ξ)<f'(c),
f'(d)=1/(1+d²),f'(c)=1/(1+c²)
所以有1/(1+d²)<arctand-arctanc/(d-c)<1/(1+c²)
d-c>0,同乘d-c就证明出来了本回答被提问者和网友采纳
f'(x)=1/(1+x²),x>0时,f'(x)为减函数
拉格朗日定理:存在c<ξ<d,满足f'(ξ)=f(d)-f(c)/(d-c)=arctand-arctanc/(d-c)
减函数性质:f'(d)<f'(ξ)<f'(c),
f'(d)=1/(1+d²),f'(c)=1/(1+c²)
所以有1/(1+d²)<arctand-arctanc/(d-c)<1/(1+c²)
d-c>0,同乘d-c就证明出来了本回答被提问者和网友采纳
第3个回答 2015-03-17
设:arctan(x)=f(x)
当0<c<d
存在t,使(d-c)f'(t)=f(d)-f(c) tE[d,c]
f'(x)=1/(1+x^2)
即:
[d-c][1/(1+t^2)]=arctand-arctanc
等式左边,d-c>0 1/(1+c^2)>=1/(1+t^2)>=1/(1+d^2) (因为c=<t=<d)
所以:(d-c)/(1+d^2)<=arctand-arctanc<=(d-c)/(1+c^2)
当0<c<d
存在t,使(d-c)f'(t)=f(d)-f(c) tE[d,c]
f'(x)=1/(1+x^2)
即:
[d-c][1/(1+t^2)]=arctand-arctanc
等式左边,d-c>0 1/(1+c^2)>=1/(1+t^2)>=1/(1+d^2) (因为c=<t=<d)
所以:(d-c)/(1+d^2)<=arctand-arctanc<=(d-c)/(1+c^2)
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