+ - ÷ NOT EQUAL = X X = (-B ± SQUARE ROOT (B2 - 4AC))/2A, SIN2(T) + COS2(T) = 1 A2 + B2 = C2 (X + A)N = SIGNMA(K = 0)^N (N¿K) XKAN-K A = 2PIR2 + 2PIRH (LIM N--INFINITY)(1 + 1/N)N

Welcome to the Brand page for “+ - ÷ NOT EQUAL = X X = (-B ± SQUARE ROOT (B2 - 4AC))/2A, SIN2(T) + COS2(T) = 1 A2 + B2 = C2 (X + A)N = SIGNMA(K = 0)^N (N¿K) XKAN-K A = 2PIR2 + 2PIRH (LIM N--INFINITY)(1 + 1/N)N”, which is offered here for Academic enrichment programs in the field(s) of mathematics;the mark consists of three concentric hexagons; the corners of the outer hexagon contain, in clockwise order, a plus, minus, division, not equal, equal, and multiplication symbol. the middle hexagon contains the following mathematical formulas in clockwise order: x = (-b ± square root (b2 - 4ac))/2a, sin2(t) + cos2(t) = 1, a2 + b2 = c2, (x + a)n = signma(k = 0)^n (n¿k) xkan-k, a = 2pir2 + 2pirh, (lim n---infinity)(1 + 1/n)n.;color is not claimed as a feature of the mark.;.

Its status is currently believed to be active. Its class is unavailable. “+ - ÷ NOT EQUAL = X X = (-B ± SQUARE ROOT (B2 - 4AC))/2A, SIN2(T) + COS2(T) = 1 A2 + B2 = C2 (X + A)N = SIGNMA(K = 0)^N (N¿K) XKAN-K A = 2PIR2 + 2PIRH (LIM N--INFINITY)(1 + 1/N)N” is believed to be currently owned by “Ji, Lauren Y.”