Let Q1 be the minimum, Q2 the first quartile, Q3 the median, Q4 the third quartile,
and Q5 the maximum of the list below.
152, 689, 608, 717, 688, 857, 469, 318, 127, 559, 610, 661, 850, 633, 322, 469, 391, 447,
559, 828, 782, 160, 424
Let Q = ln(3 + |Q1|+ 2|Q2|+ 3|Q3|+ 4|Q4|+ 5|Q5|). Then T = 5 sin2(100Q) satisfies:—
(A) 0 ≤T < 1. — (B) 1 ≤T < 2. — (C) 2 ≤T < 3. — (D) 3 ≤T < 4. — (E) 4 ≤T ≤5.