100 coins in a row or
100 cents in a rand or
100 cubits in a rood.
R. C. K. Ginn has written: 'Tyger! Tyger!'
100 legs on a centipead
ray charles
Pirates like the letter R, while sailors in general love the C.
R. C. Mowat has written: 'Four papers on contemporary history' 'Ruin and resurgence, 1939-1965' -- subject(s): History
100 Runs in a Century
There are two equivalent way. Suppose the item costs C units (of whatever currency), and suppose the tax rate is R %. You calculate the total tax = C*R/100 currency units so total costs = C + C*R/100 Alternatively, you calculate the tax multiplier, = (1 + R/100) and then the total cost is C*(1 + R/100). It is simple to show the two arrive at the same answer.
100 Kopeks in a Ruble
100 C in a R stands for 100 Centimeters in a Meter. This is a common conversion in the metric system where there are 100 centimeters in 1 meter. This conversion is used in everyday measurements of length and distance.
In the context of puzzles or riddles, "100 R in a C" typically refers to "100 Red Roses in a Carton." This is a common type of puzzle where numbers and letters are used to represent words or phrases, requiring the solver to decipher the code.
If you mean 25 and 100 they are XXV and C respectively If you mean 25,100 it is (XXV)C which means 1000*25+100 = 25,100
Cxc = c + (c-x) = 100+ (100-10) = 190
The amount of interest earned on an investment of C, for y years at r per cent is C*y*r/100.
100
The Roman numeral C represents 100
Rs 2000. The amount a after n years of an amount c with interest rate r % is: a = c(1 + r/100)^n After 3 & 6 years of the question there is: Rs 4000 = c(1 + r/100)^3 Rs 8000 = c(1 + r/100)^6 Dividing the second by the first gives: Rs 8000 ÷ Rs 4000 = (c(1 + r/100)^6) ÷ (c(1 + r/100)^3) → 2 = (1 + r/100)^3 Using the first equation and substituting for (1 + r/100)^3 found above: Rs 4000 = c(1 + r/100)^3 = 2c → c = Rs 2000 Alternatively: As it is compound interest, the saved interest also attracts interest; the amount doubles in the 3 years from year 3 to year 6, so it doubles every 3 years. Therefore initially it must be half the value at 3 years → it is ½ × Rs 4000 = Rs 2000.
choose the right