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Psychic analysis of AOL users
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abs_a_abs_b_iff_a2b2
AltaVista user #25285264 searched for:
Keyword
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abs a <= abs b iff a2<=b2
"abs a <= abs b iff a2<=b2"
"abs a <= abs b iff a2 <= b2"
"the geametric mean is less than or equal to the arithmetic mean"
"the geometric mean is less than or equal to the arithmetic mean"
the geometric mean is less than or equal to the arithmetic mean
show that (a+b)2 = a2 + 2ab +b2
"(a+b)2 = a2 + 2ab +b2"
a2b<ab2+(a3-b3)/3
a2b < ab2 + (a3-b3)/3
a2b < ab2 . (a3-b3)/3
a2b < ab2 + (a3-b3)/3
a2b < ab2 (a3-b3)/3
"a2b < ab2 + (a3-b3)/3"
a2b < ab2 + (a3 - b3) / 3"
geometric mean is less than or equal to the arithmetic mean
prove geometric mean is less than or equal to the arithmetic mean
+arithmetic+geometric+mean
+proof+arithmetic+geometric+mean+inequality
proof+arithmetic+geometric+mean+inequality
prove+arithmetic+geometric+mean+inequality
arithmetic+geometric+mean+inequality
arithmetic+geometric+mean+inequality+proof
arithmetic+geometric+mean+inequality+prove\
arithmetic+geometric+mean+inequality+prove
"density of irrationals"
density of irrationals
density of the irrationals
density of irrational
density of irrational numbers
between two real numbers is an irrational number
"between any two real numbers is an irrational number"
between any two real numbers is an irrational number
"density of the irrational numbers"
"density of irrational numbers"
"density of the irrationals"
"density of irrationals"
density of irrationals
irrationals are dense in the reals
"irrationals are dense in the reals"
"irrational numbers are dense in the reals"
irrational numbers are dense in the reals"
between any two irrationals there is another irrational
irrationals dense
properties of the supremum
+properties+supremum
supremum
"densiry on the rationals"
"density on the rationals"
"density of the rationals"
"between any two rationals, there is another rational"
"density of the rational numbers'
"density of rational numbers'
"both sup e and inf e exist and belong to e"
both sup e and inf e exist and belong to e
+"sup e"+"inf e"
"sup(a+b)=sup(a)+sup(b)"
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