Roll a D900 die

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D900 Dice Roller

  • D900 Dice Roller
  • Rolls a D900 die
  • Lets you roll multiple dice like 2 D900s, or 3 D900s. Add, remove or set numbers of dice to roll

Statistics of this Dice Roller

  • RollD900
  • Total Kinds of Dice1
  • Total Dice1
  • Minimum Sum1
  • Maximum Sum900
  • Lowest Dice Face1
  • Highest Dice Face900
  • Highest Dice Face of the Smallest Die900
  • D900
    Total Possible Combinations 900

    Number of combinations are calculated using the formula [ (900+1-1) choose (1) ]

    You can try generating all the combinations using the following combination generator
    All possible combinations of 1D900
  • D900
    Total Possible Permutations 900

    Number of permutations are calculated using the formula [ 900^1 ]

    You can try generating all the permutations using the following permutations generator
    All possible permutations of 1D900

Probabilities of this Dice Roller

D900

Probability of getting a 1

In technical terms this is equivalent of getting atleast one 1. This is close to 0.0011, about 0.11% percent.

This is calculated by multiplying all the probabilities of not getting a 1 for each dice and then subtracting the answer from 1.

1 - (899/900)

Probability of not getting a 1

Probability of not getting any 1 is close to 1., about 99.89% percent.

This is calculated by multiplying all the probabilities of not getting a 1 for each dice.

899/900

Probability of getting all 1's

Probability of getting all 1's is close to 0.0011, about 0.11% percent.

This is calculated by multiplying together all the probabilities of getting a 1 for each dice.

1/900

Probability of getting 1 1s

Probability of getting 1 1's is close to 0.0011, about 0.11% percent.

This is calculated by multiplying together all the probabilities of getting a 1 for each dice that has a 1.

1/900

Probability of getting a 900

In technical terms this is equivalent of getting atleast one 900. This is close to 0.0011, about 0.11% percent.

This is calculated by multiplying all the probabilities of not getting a 900 for each dice and then subtracting the answer from 1.

1 - (899/900)

Probability of not getting a 900

Probability of not getting any 900 is close to 1., about 99.89% percent.

This is calculated by multiplying all the probabilities of not getting a 900 for each dice.

899/900

Probability of getting all 900's

Probability of getting all 900's is close to 0.0011, about 0.11% percent.

This is calculated by multiplying together all the probabilities of getting a 900 for each dice.

1/900

Probability of getting 1 900s

Probability of getting 1 900's is close to 0.0011, about 0.11% percent.

This is calculated by multiplying together all the probabilities of getting a 900 for each dice that has a 900.

1/900

Javascript code to create this dice roller


    // code to create a D900 dice roller

    
                   
        // define the range of numbers to pick from
        var lowest = 1;             // lowest possible side of the dice
        var highest = 900;           // highest possible side of the dice
        var numbers_of_dice = 1;    // how many dice to roll     
        
        var this_roll = []; // array to store the results of this roll

        for (var j = 1; j <= numbers_of_dice; j++) {

            // loop for the number of dice

            // for each dice, generate a number between lowest and highest
            var dice_face = Math.floor(Math.random() * (highest-lowest+1) + lowest);
            this_roll.push(dice_face); //store this in the array
        }
            
        
        // print all the generated rolls
            
        for (j = 0; j < this_roll.length; j++) {

            // loop through the dice array 

            //print each dice roll value followed by a space
            document.write(this_roll[j]);
            document.write(" ");

        }
            
        
    

    /* 

    Sample output 

    

    */
    


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