Letters: P(3), Q(2), R(2), S(1), T(1), U(1), V(1) — 7 distinct letters.
All distinct: (47)×4!=840.
One pair + 2 distinct: choose repeating letter from {P,Q,R} (3 ways), choose 2 from remaining 6 ((26)=15), arrange =4!/2!=12. Total =3×15×12=540.
Two pairs: choose 2 from {P,Q,R} ((23)=3), arrange =4!/(2!2!)=6. Total =18.
One triple + 1 distinct: only P can repeat 3 times, choose 1 from 6, arrange =4!/3!=4. Total =24.
Answer =840+540+18+24=1422.