【答案】(1)m = 2 ��;(2)f (x)的極小值為
���,無極大值���;(3)證明見解析.
【解析】
(Ⅰ)求出f′(x)=ex﹣m,(m∈R)�����,f′(0)=1﹣m���,利用導(dǎo)數(shù)的幾何意義能求出m�;(Ⅱ)由f′(x)=ex﹣m�����,(m∈R),函數(shù)f(x)定義域?yàn)椋ī?/span>∞����,+∞),利用導(dǎo)數(shù)性質(zhì)能求出f(x)的極值����;(Ⅲ)設(shè)函數(shù)g(x)=ex﹣x2,則g′(x)=ex﹣2x�����,當(dāng)m=2時(shí)���,g′(x)=f(x)≥f(ln2)����,由g′(x)>0恒成立�����,能證明ex>x2.
(Ⅰ)∵函數(shù)f(x)=ex﹣mx(m為常數(shù))����,
∴f′(x)=ex﹣m�,(m∈R)�����,∴f′(0)=1﹣m�,
∵曲線y=f(x)在點(diǎn)(0�����,f(0))的切線斜率為﹣1�����,
∴f′(0)=1﹣m=﹣1���,
解得m=2.
(Ⅱ)∵f′(x)=ex﹣m����,(m∈R)�,
函數(shù)f(x)定義域?yàn)椋ī?/span>∞,+∞)���,
當(dāng)m≤0時(shí)���,f′(x)>0��,函數(shù)f(x)在(﹣∞����,+∞)上單調(diào)遞增�����,
此時(shí)沒有極值��;
當(dāng)m>0時(shí)��,令f′(x)=0��,解得x=lnm����,
則隨著x的變化,f′(x)���,f(x)變化如下表:
x | (﹣∞�,lnm) | lnm | (lnm,+∞) |
f′(x) | ﹣ | 0 | + |
f(x) | ↓ | 極小值 | ↑ |
由上表知函數(shù)f(x)在(lnm���,+∞)上單調(diào)遞增���,在(﹣∞,lnm)上單調(diào)遞減��,
則在x=lnm處取得極小值f(lnm)=elnm﹣mlnm=m(1﹣lnm)�,
無極大值.
證明:(Ⅲ)設(shè)函數(shù)g(x)=ex﹣x2,
則g′(x)=ex﹣2x���,
由(Ⅱ)知m=2時(shí),g′(x)=f(x)≥f(ln2)��,
∵f(ln2)=2(1﹣ln2)>0��,∴g′(x)>0恒成立���,
即函數(shù)g(x)在R上遞增��,
∵g(0)=1����,∴當(dāng)x>0時(shí),g(x)>g(0)>0���,
∴ex>x2.
( m 為常數(shù)).
