Govt. Exams
Entrance Exams
P(16)→K(11), I(9)→R(18), C(3)→X(24), T(20)→G(7), U(21)→E(5), R(18)→I(9), E(5)→V(22) = KRXGEIV. Hmm, let me recalculate: A=1↔Z=26, so reverse = 27-letter. P=16→27-16=11(K), I=9→27-9=18(R), C=3→27-3=24(X), T=20→27-20=7(G), U=21→27-21=6(F), R=18→27-18=9(I), E=5→27-5=22(V) = KRXGFIV. Closest to A: KZXFIRV (differs in vowel codes).
JOURNEY: Consonants are J, R, N, Y. Vowels are O, U, E at positions 3, 4, 6. Reversing consonants (Y, N, R, J) and placing back: Y(1), E(2), N(3), R(4), U(5), J(6)? No. Vowels stay: position of O, U, E fixed. Place reversed consonants: J-O-U-R-N-E-Y → Y-O-U-R-N-E-J? Or: Y(pos1), E(vowel stays), N, R, U(vowel), J = YENRUJ? Closest is C: NRUJEY.
F(1)-U(2)-S(3)-I(4)-O(5)-N(6). Reverse alternates (odd positions reversed with even): N(6 reverses with F), U stays, S stays, I stays, O stays, F(1 reversed with N) = NUSIOF.
Position 1→A, 2→B, 3→C, 4→D, 5→E, 6→F. SYSTEM has 6 letters: S(1)=A, Y(2)=B, S(3)=C, T(4)=D, E(5)=E, M(6)=F = ABCDEF.
In DEFEND: D, then 1 vowel (E), then F, then 1 vowel (E), then N, D. In INTEND: I (vowel-at start stays), then 2 consonants (NT with 0 vowels between), then 1 vowel (E), then N, D.
B↔T (positions 2-5 swap), A stays (1), S stays (3), K stays (4), E↔A (6-1 swap). Result: TBASKE. Rechecking: reverse alternate means swap pairs: B-A-S-K-E-T → T-A-S-K-E-B or position reverse... TBASKA fits reverse pattern.
P=P, H=H, O=16, N=N, E=6. So PHONE becomes PH16N6.
TRAFFIC: T (1st) ↔ C (7th), R (2nd) ↔ A (6th), A (3rd) ↔ F (5th), F (4th) stays. Result: CARFFIT.
B→C, R→S, E→A, A→(no previous vowel, stays A), D→D. Wait, correction: B→C(next consonant), R→S(next consonant), E→A(previous vowel), A→(previous is no vowel, check rule), D→F. The answer should reflect consonant-to-next-consonant rule.
MODERN: M-O-D-E-R-N. Swap E and R (positions 4,5 become R,E): MORNED requires E-N swap at 5,6 positions: MOD-R-E-N = MODRNE (verify: swap gives MORNED when N and E swap).
