N < O ? R > T; R < A; B ? T
Check for I:
N < O ? R > T
? No definite relation can be found between N and A.
Check for II:
C ? D = E ? F, Y < D ? W
Check for I:
C ? D > Y
It means C > Y. Thus, I does stand true. check for II:
Y < D ? F
It means F > Y. Thus, II also does not stand true.
S ? T < U ? W; T ? R, G > U
Check for I:
S ? T ? R
? R ? S follows
Check for II:
G > U ? W
? W < G follows
Hence, both I and II follows
H ? G < I; F ? G > Z
Check for I:
F ? G ? H is definitely follows
Check for II:
Z < G < I
? Z < I also follows
Hence, both I and II follows
H ? T ...(i) T < L ...(ii) L = F ...(iii)
Combining these we get H ? T < L = F.
Hence F > H and I follows.
But H < L and Hence II (H ? L ) does not follow.
V > I ...(i) I ? M ...(ii) M ? Q ...(iii)
From (ii) and (iii) I and Q, can't be compared. But I and II make a complementary pair. Hence either I (I ? Q) or II (I ? Q) follows.
R < F ...(i) F ? D ...(ii) D ? M ...(iii)
From (i) and (ii) R and D can't be compared. Hence neight I nor III follows.
From (ii) and (iii) M and F can't be compared. Hence II does not follows.
M ? W ...(i) W = N ...(ii) N > B ...(iii)
Combining these we get M ? W = N > B.
Hence M ? N or N ? M,
Which means either I (N = M) or II (N < M) follows.
Also M > B and II (M ? D) Hence III definitely true.
M ? W ...(i) W = N ...(ii) N > B ...(iii)
Combining these we get M ? W = N > B.
Hence M ? N or N ? M,
Which means either I (N = M) or II (N < M) follows.
Also M > B and II (M ? D) Hence III deficitely true.
W ? F ...(i) F > M ...(ii) M < D ...(iii)
From (i) and (ii) W and M can't be compared. Hence II does not follow.
From (ii) and (iii) F and D can't be compared. Hence neither I or III follows.
B = H ...(i) H > E ...(ii) E ? K ...(iii)
From (i) and (ii) B = H > E or E < B
Hence III follows.
From (ii) and (iii) H and K can't be compared.
Hence I does not follow. Nor can II follow.
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