To find numbers ( ab \times CD = efgh ), we need specific values for ( ab ), ( CD ), and ( efgh ). Typically, ( ab ) and ( CD ) would represent two-digit numbers, and ( efgh ) a four-digit number. Without specific values provided, it's impossible to determine the exact numbers that satisfy this equation. If you have particular digits in mind, please provide them for a more precise answer.
In Roman numerals, CD represents the number 400 and XX represents the number 20. When you divide 400 by 20, you get 20. Therefore, CD divided by XX equals XX in Roman numerals.
It is: CD = 500-100 = 400
5.3 = 2x so x = 5.3/2 = 2.65
The existence of the additive inverse (of ab).
CDXXXIV represents the number 434 in Roman numerals. It breaks down as follows: CD equals 400 (500 - 100), XXX equals 30 (10 + 10 + 10), and IV equals 4 (5 - 1). When combined, these values add up to 434.
4
EC = 9 in. CD = in. Find ED.
It is: CD = 500-100 = 400
5.3 = 2x so x = 5.3/2 = 2.65
The existence of the additive inverse (of ab).
CDXXXIV represents the number 434 in Roman numerals. It breaks down as follows: CD equals 400 (500 - 100), XXX equals 30 (10 + 10 + 10), and IV equals 4 (5 - 1). When combined, these values add up to 434.
990, 000
the numbers are the barcode and cd code
20m
In Roman numerals C = 100 and D = 500. The combination CD literally means 100 before 500, which is 400. I equals 1 and III equals 3. So CDIII equals 403.
CD-R
60