There are 43 combinations of various quantities of quarters (0, 1 or 2), dimes (0 to 5), nickels (0 to 10) and pennies (2 to 52) that make 52 cents.
-51
In mathematics, addition is a binary operation that combines two numbers to produce a sum. To find a pair of numbers that equals 52 in addition, you can choose any two numbers that add up to 52. For example, 25 + 27 = 52, or 30 + 22 = 52. There are many possible combinations of numbers that can be added to equal 52.
52 cents
Well, let's think about this in a happy little way. If you have 52 quarters, each worth 25 cents, you can multiply 52 by 25 to find the total amount. That would give you 1,300 cents, which is $13. So, you have $13 in 52 quarters. Just imagine all the beautiful things you could do with that!
52
To make 52 cents using coins, you can use 2 quarters (25 cents each) and 2 pennies (1 cent each), totaling 52 cents. Another combination could be 1 half-dollar coin (50 cents) and 2 pennies (1 cent each). These are the two most common ways to make 52 cents using a combination of coins.
100 pence in a British pound.
This questions can be rewritten as 52 choose 6 or 52C6. This is the same as (52!)/(6!(52-6)!) (52!)(6!46!) (52*51*50*49*48*47)/(6*5*4*3*2*1) 14658134400/720 20358520 There are 20,358,520 combinations of 6 numbers in 52 numbers. This treats 1,2,3,4,5,6 and 6,5,4,3,2,1 as the same combination since they are the same set of numbers.
This is a combinations question. There are (52 C 13) possible hands. This is 52!/((13!)((52-13)!)) = 635013559600
just intrested in the number combinations * * * * * Number of combinations = 56C6 = 56*55*54*53*52*51/(6*5*4*3*2*1) = 32,468,436
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.
A standard deck of 52 playing cards has a total of 52 factorial combinations, denoted as 52!. This number is approximately 8.06 x 10^67, which reflects the vast number of possible arrangements of the cards. To put it in perspective, this is far greater than the number of atoms in the observable universe.
There are several combinations, but this is one: 23 + 29 = 52.
Simple... 25+10+10+5+1+1 = 52 cents !
-51
1 Canadian Stamp Approx. .52 cents canadian.
1 × 52 2 × 26 4 × 13 2 × 2 × 13