Elections

In elections candidate 10 political parties. Calculate how many possible ways can the elections finish, if any two parties will not get the same number of votes.

Result

n =  3628800

Solution:

n=P(10)=10!=3628800n = P(10) = 10! = 3628800



Our examples were largely sent or created by pupils and students themselves. Therefore, we would be pleased if you could send us any errors you found, spelling mistakes, or rephasing the example. Thank you!





Leave us a comment of this math problem and its solution (i.e. if it is still somewhat unclear...):

Showing 0 comments:
1st comment
Be the first to comment!
avatar




Tips to related online calculators
See also our variations calculator.
Would you like to compute count of combinations?

Following knowledge from mathematics are needed to solve this word math problem:

Next similar math problems:

  1. Chords
    chords How many 4-tones chords (chord = at the same time sounding different tones) is possible to play within 7 tones?
  2. Olympics metals
    olympics In how many ways can be win six athletes medal positions in the Olympics? Metal color matters.
  3. Medals
    medails In how many ways can be divided gold, silver and bronze medal among 21 contestant?
  4. Examination
    examination The class is 21 students. How many ways can choose two to examination?
  5. Football league
    football_3 In the football league is 16 teams. How many different sequence of results may occur at the end of the competition?
  6. PIN - codes
    pin How many five-digit PIN - code can we create using the even numbers?
  7. Numbers
    numbers_3 How many different 3 digit natural numbers in which no digit is repeated, can be composed from digits 0,1,2?
  8. Theorem prove
    thales_1 We want to prove the sentence: If the natural number n is divisible by six, then n is divisible by three. From what assumption we started?
  9. Variations
    pantagram Determine the number of items when the count of variations of fourth class without repeating is 42 times larger than the count of variations of third class without repetition.
  10. Value
    5times_1 Find the value of the expression: 6!·10^-3
  11. Line
    skew_lines It is true that the lines that do not intersect are parallel?
  12. Reference angle
    anglemeter Find the reference angle of each angle:
  13. Today in school
    skola There are 9 girls and 11 boys in the class today. What is the probability that Suzan will go to the board today?
  14. Variations 4/2
    pantagram_1 Determine the number of items when the count of variations of fourth class without repeating is 600 times larger than the count of variations of second class without repetition.
  15. Sequence
    seq_1 Write the first 6 members of these sequence: a1 = 5 a2 = 7 an+2 = an+1 +2 an
  16. Elimination method
    rovnice_1 Solve system of linear equations by elimination method: 5/2x + 3/5y= 4/15 1/2x + 2/5y= 2/15
  17. Legs
    rak Cancer has 5 pairs of legs. The insect has 6 legs. 60 animals have a total of 500 legs. How much more are cancers than insects?