52 spokes on a racing cycle
Remember for circle equations. C = 2 pi r Algebraically rearrange r = C / ( 2 pi) Substitute r = 52 / ( 3.1416 x 2) Cancel down by '2' r = 26/ 3.1416 r = 8.27605... r = 8.28 ( To nearest hundredth).
ther r bout 52 c ats in Australia
There is no US state that contains all of the letters "RCSCSS". Only two states contain three letter S: Massachusetts, which has no R and only one C. Mississippi, which has no R and no C.
R. C. S. Jones has written: 'A guide to Northleach church'
S. R. C. Wanhill has written: 'Making tourism work'
S-C-I-S-S-O-R. You've spelled it correctly.
C. R. S. Pitman has written: 'A game warden among his charges' -- subject(s): Zoology
In a standard deck of 52 playing cards, the number of combinations of 3 cards can be calculated using the combination formula ( C(n, r) = \frac{n!}{r!(n-r)!} ). For 3 cards from 52, it is ( C(52, 3) = \frac{52!}{3!(52-3)!} = \frac{52 \times 51 \times 50}{3 \times 2 \times 1} = 22,100 ). Thus, there are 22,100 different combinations of 3 cards in a deck.
C-A-R-E-S-S.
R-E-S-O-U-R-C-E-S.
r a c i s t s l u r
Paul S. R. Chisholm has written: 'C programming' -- subject(s): C (Computer program language)