53 Cards in the Deck with the Joker (1)54 Cards in the Deck with the Jokers (2)
53 Countries in the Commonwealth
There are many organic acids that are soluble though solid crystals:citric acid (Mp. 153 °C),tartaric acid (three Mp.: 171-174 °C (L-tartaric), 206 °C (DL, racemic), 146-148 °C (meso))malic acid (Mp. 130 °C),lactic (two different Mp.: L-lactic acid 53 °C, D: 53 °C and D/L, racemic: 16.8 °C).
Regular Math Addition: 432+53=485 Vector Addition: if u=<a,b> and v=<c,d> then u+v=<a+c,b+d>
D D# E C E C E C C D D# E C D E BD C D D# E C E C E C AG F# A C E D C A D D D# E C E C E C C D D# E C D E B D C C D C E C D E C D C E C D E C D C E C D E E B D C #=sharp
d2/(d - c) + c2/(c - d) = d2/(d - c) - c2/(d - c) = (d2 - c2)/(d - c) = (d + c)(d - c)/(d - c) = d + c
C C D C A F A C D D C A G C C C C D C A G F A C D D D C C A G C F Bb Bb D C D D A G G BbA C C F A C C D C A F A C D D D C A A G C F. (:
C c c d | e d | c e d d | c c c c d | e d | c e d d | c d d d d | a a | d c b a | g c c c d | e d | c e d d | c These are the letters of the notes as I don't know which instrument you intend to play this on. This can also be transposed.
E d c d e e e d d d e g g e d c d e e e d d e d c
I learned how to play circles a while back but the notes are as follows... C D# G D# C D# G D# C D# G# D# C D# G# D Bb D# G D# Bb D# G D# B D G D B D B D G D. thats was the intro. background music is this.. C G G# G D# D G... then the first verse... D# D C BC Bb Bb Bb D# D C B D# D C C D# Bb Bb Bb D# D C B... THEN THE CHORUS.... C C C C C D# C C D# D# D# D# D# F D# D C C C C C C D# C C D# D# D# D# Bb D# D# F D# D C. THE SECOND VERSE.... C D# D C B C C Bb Bb Bb D# D C B D# D C C D# F G G G# G F G. that was all i got but thats pretty much almost the whole song. hope this was helpful
Suggested layouts . . . Just play ! ( Not sure if images will show . . . If not, here they are written out . . . Layout 01 - A, B, C, D, C, B, A D, C, A, B, A, C, D A, B, C, D, C, B, A D, C, A, B, A, C, D A, B, C, D, C, B, A D, C, A, B, A, C, D A, B, C, D, C, B, A D, C, A, B, A, C, D A, B, C, D, C, B, A Layout 02 - C, D, B, A, B, D, C D, B, A, D, A, B, D B, A, D, C, D, A, B A, D, C, B, C, D, A D, C, B, A, B, C, D A, D, C, B, C, D, A B, A, D, C, D, A, B D, B, A, D, A, B, D C, D, B, A, B, D, C Layout 03 - D, B, C, B, C, B, D A, D, B, C, B, D, A D, A, D, B, D, A, D C, D, A, D, A, D, C B, C, D, A, D, C, B C, D, A, D, A, D, C D, A, D, B, D, A, D A, D, B, C, B, D, A D, B, C, B, C, B, D Layout 04 - A, B, C, D, C, B, A B, A, B, C, B, A, B D, B, A, B, A, B, D C, D, B, A, B, D, C A, C, D, B, D, C, A C, D, B, A, B, D, C D, B, A, B, A, B, D B, A, B, C, B, A, B A, B, C, D, C, B, A
The answer is 4! (4 factorial), the same as 4x3x2x1, which equals 24 combinations. The answer is 24 and this is how: A b c d A b d c A c d b A c b d A d c b A d b c B c d a B c a d B d a c B d c a B a c d B a d c C d a b C d b a C a b d C a d b C b d a C b a d D a b c D a c b D b c a D b a c D c a b D c b a