tìm x,y,z nguyên sao cho x2+y2+z2+6<xy+3x+4z
Cho (I): 4 x 2 + 4x – 9 y 2 + 1 = (2x + 1 + 3y)(2x + 1 – 3y)
(II): 5 x 2 – 10xy + 5 y 2 – 20 z 2 = 5(x + y + 2z)(x + y – 2z).
A. (I) đúng, (II) sai
B. (I) sai, (II) đúng
C. (I), (II) đều sai
D. (I), (II) đều đúng
tìm x ; y ; z nguyên sao cho : x^2 + y^2 + z^2 -xy -3y - 2z + 4 = 0
phân tích a)(x-y)3+(y-z)3+(z-x)3
b)x.(y2-z2)+y.(z2-x2)+z.(x2-y2)
c)xy.(x-y)-xz.(x+z)-yz.(zx-y+z)
d)x.(y+z)2+y.(z-x)2+z.(x+y)2-4xyz
tìm các số nguyên tố thỏa mãn: x^2+y^2+z^2<xy+3y+2z
tìm các số nguyên x,y,z thoả mãn x2+y2+z2<xy+3y+2z-4
cho x+y+z=4 xy+xz+xt+yz+yt+zt=1 tìm GTNN của x2+y2+z2+t2
c) C = x(y2 +z2)+y(z2 +x2)+z(x2 +y2)+2xyz.
d) D = x3(y−z)+y3(z−x)+z3(x−y).
e) E = (x+y)(x2 −y2)+(y+z)(y2 −z2)+(z+x)(z2 −x2).
b) x2 +2x−24 = 0.
d) 3x(x+4)−x2 −4x = 0.
f) (x−1)(x−3)(x+5)(x+7)−297 = 0.
(2x−1)2 −(x+3)2 = 0.
c) x3 −x2 +x+3 = 0.
e) (x2 +x+1)(x2 +x)−2 = 0.
a) A = x2(y−2z)+y2(z−x)+2z2(x−y)+xyz.
b) B = x(y3 +z3)+y(z3 +x3)+z(x3 +y3)+xyz(x+y+z). c) C = x(y2 −z2)−y(z2 −x2)+z(x2 −y2).