Quay lại câu hỏi

	2	lỗi hiển thị		Sửa 30-05-13 08:49 AM Trúc Anh 1
giup minh bai nay voi $\log_{x}2 . log_{\frac{x}{16}}2 >\frac{1}{\log_{2}x -6}$$\log_{x-1}(x+1) >\log_{x^{2}-1}(x+1)$$\log_{x}[\log_{9}(3^{x}-9)]<1$ Bất phương trình lôgarit giup minh bai nay voi $\log_{x}2 . log_{\frac{x}{16}}2 >\frac{1}{\log_{2}x -6}$$\log_{x-1}(x+1) >\log_{x^{2}-1}(x+1)$$\log_{x}[\log_{9}(3^{x}-9)]<1$ Bất phương trình lôgarit giup minh bai nay voi $\log_{x}2 . log_{\frac{x}{16}}2 >\frac{1}{\log_{2}x -6}$$\log_{x-1}(x+1) >\log_{x^{2}-1}(x+1)$$\log_{x}[\log_{9}(3^{x}-9)]<1$ Bất phương trình lôgarit

	1	tạo mới
giup minh bai nay voi $\log_{x}2 . log_{\frac{x}{16}}2 >\frac{1}{\log_{2}x -6}$$\log_{x-1}(x+1) >\log_{x^{2}-1}(x+1)$$\log_{x}[\log_{9}(3^{x}-9)]<1$

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