等比数列(an)的各项均为正数,且a5*a6+a4*a7=18,则log3a1+log3a2+.+log3a9+log3a10=?
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![等比数列(an)的各项均为正数,且a5*a6+a4*a7=18,则log3a1+log3a2+.+log3a9+log3a10=?](/uploads/image/z/10280418-42-8.jpg?t=%E7%AD%89%E6%AF%94%E6%95%B0%E5%88%97%EF%BC%88an%EF%BC%89%E7%9A%84%E5%90%84%E9%A1%B9%E5%9D%87%E4%B8%BA%E6%AD%A3%E6%95%B0%2C%E4%B8%94a5%2Aa6%2Ba4%2Aa7%3D18%2C%E5%88%99log3a1%2Blog3a2%2B.%2Blog3a9%2Blog3a10%3D%3F)
等比数列(an)的各项均为正数,且a5*a6+a4*a7=18,则log3a1+log3a2+.+log3a9+log3a10=?
等比数列(an)的各项均为正数,且a5*a6+a4*a7=18,则log3a1+log3a2+.+log3a9+log3a10=?
等比数列(an)的各项均为正数,且a5*a6+a4*a7=18,则log3a1+log3a2+.+log3a9+log3a10=?
由于{an}为等比数列
则:a5a6=a4a7=a3a8=a2a9=a1a10
又a5a6+a4a7=18
则:
2a5a6=18
a5a6=9
则:
log3(a1)+log3(a2)+...+log3(a9)+log3(a10)
=log3[a1*a2*a3*...*a10]
=log3[(a1a10)*(a2a9)*...*(a5a6)]
=log3[9*9*...*9]
=log3[9^5]
=log3[3^10]
=10log3[3]
=10
a5*a6+a5/q*a6*q=2a5*a6=18,所以a5*a6=9 log3a1+log3a2+。。。。。+log3a9+log3a10=log3a1a2...a9 =log3a1*a1q*a1q^2*a1q^8 =log3a1^10...
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a5*a6+a5/q*a6*q=2a5*a6=18,所以a5*a6=9 log3a1+log3a2+。。。。。+log3a9+log3a10=log3a1a2...a9 =log3a1*a1q*a1q^2*a1q^8 =log3a1^10*q^45 =5log3a1^2*q^9 =5log3a5a6=5log3 9=10
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aq^4*aq^5+aq^3*aq^6=18
2a^2q^9=18
a^2q^9=9
3底log a1+3底log a2+...+3底log a10=
=3底log(a1*a2*……*a10)
=3底loga^10*q^(1+2+……+9)
=3底loga^10q^45
=3底log(a2q^9)^5
=5*3底log9
=5*2
=10