$3(\dfrac{y^5(x+z)^3}{x^4z^4}+\dfrac{z^5(x+y)^3}{x^4y^4}+\dfrac{x^5(y+z)^3}{y^4z^4})\leq 4(\dfrac{y^{10}z^5}{x^5}+\dfrac{z^{10}x^5}{y^5}+\dfrac{x^{10}y^5}{z^5})-24$
Edited by Hero Math, 17-07-2009 - 12:48.
Edited by Hero Math, 17-07-2009 - 12:48.
Dấu bằng khi nào ấy nhể????Xem lại chút đi Hiếucho $ x,y,z>0$ và $x^5y^5+y^5z^5+x^5z^5=x^{5}y^{5}z^{5}$. CMR:
$3(\dfrac{y^5(x+z)^3}{x^4z^4}+\dfrac{z^5(x+y)^3}{x^4y^4}+\dfrac{x^5(y+z)^3}{y^4z^4})\leq 4(\dfrac{y^{10}z^5}{x^5}+\dfrac{z^{10}x^5}{y^5}+\dfrac{x^{10}y^5}{z^5})-24$
Nếu mà sửa như trên thì:that's easy to prove problem! ^^cho $ x,y,z>0$ và $x^5y^5+y^5z^5+x^5z^5=x^{5}y^{5}z^{5}$. CMR:
$3(\dfrac{y^5(x+z)^3}{x^4z^4}+\dfrac{z^5(x+y)^3}{x^4y^4}+\dfrac{x^5(y+z)^3}{y^4z^4})\leq 4(\dfrac{y^{10}z^5}{x^5}+\dfrac{z^{10}x^5}{y^5}+\dfrac{x^{10}y^5}{z^5})-36$
Edited by cvp, 20-07-2009 - 17:12.
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