5.已知函數(shù)f(x)=alog2x��,g(x)=blog3x(x>1)�,其中常數(shù)a.b≠0.
(1)證明:用定義證明函數(shù)k(x)=f(x)•g(x)的單調(diào)性;
(2)設(shè)函數(shù)φ(x)=m•2x+n•3x��,其中常數(shù)m����,n滿足m.n<0�,求φ(x+1)>φ(x)時(shí)的x的取值范圍.
分析 (1)任取區(qū)間(1,+∞)上兩個(gè)實(shí)數(shù)x1���,x2���,且x1<x2,則k(x1)÷k(x2)=(${log}_{{x}_{2}}{x}_{1}$)2∈(0���,1)����,進(jìn)而分當(dāng)ab>0時(shí)和當(dāng)ab<0時(shí)兩種情況����,可得函數(shù)k(x)=f(x)•g(x)的單調(diào)性��;
(2)由函數(shù)φ(x)=m•2x+n•3x�����,可將φ(x+1)>φ(x)化為m•2x+2n•3x>0����,結(jié)合m•n<0�����,分當(dāng)m>0����,n<0時(shí)和當(dāng)m<0,n>0時(shí)兩種情況���,可得滿足條件的x的取值范圍.
解答 證明:(1)任取區(qū)間(1�,+∞)上兩個(gè)實(shí)數(shù)x1�,x2,且x1<x2���,
則${log}_{{x}_{2}}{x}_{1}$∈(0���,1)���,
∵函數(shù)f(x)=alog2x,g(x)=blog3x(x>1)���,
∴k(x1)÷k(x2)=(ab•log2x1•log3x1)÷(ab•log2x2•log3x2)=(${log}_{{x}_{2}}{x}_{1}$)2∈(0���,1),
當(dāng)ab>0時(shí)�,k(x1)<k(x2),函數(shù)k(x)=f(x)•g(x)在區(qū)間(1����,+∞)上單調(diào)遞增���;
當(dāng)ab<0時(shí)����,k(x1)>k(x2)��,函數(shù)k(x)=f(x)•g(x)在區(qū)間(1,+∞)上單調(diào)遞減����;
(2)∵函數(shù)φ(x)=m•2x+n•3x,φ(x+1)>φ(x)�����,m•n<0��,
∴φ(x+1)-φ(x)=m•2x+2n•3x>0���,
當(dāng)m>0��,n<0時(shí)���,$(\frac{3}{2})^{x}$>$-\frac{m}{2n}$,則x>${log}_{\frac{3}{2}}(-\frac{m}{2n})$���,
當(dāng)m<0��,n>0時(shí)���,$(\frac{3}{2})^{x}$<$-\frac{m}{2n}$��,則x<${log}_{\frac{3}{2}}(-\frac{m}{2n})$����,
點(diǎn)評(píng) 本題考查的知識(shí)點(diǎn)是對(duì)數(shù)函數(shù)的圖象與性質(zhì)�����,函數(shù)單調(diào)性的判斷與證明���,其中熟練掌握函數(shù)單調(diào)性的證明方法定義法(作商法)的方法和步驟是解答本題的關(guān)鍵.
