The probability of blue, when there are 4 blue, 6 yellow, and 3 red, is 4 is 13.
It is 12/47.
There is a probability of 3 that it will be blue.
The probability of randomly choosing 1 blue sock is 7/10. The probability of randomly choosing 2 blue socks in a row is 7/10 x 7/10 = 49/100.
To determine the experimental probability of the spinner landing on blue, you need to conduct a series of spins and record the outcomes. The experimental probability is calculated by dividing the number of times the spinner lands on blue by the total number of spins. For example, if the spinner is spun 100 times and lands on blue 25 times, the experimental probability would be 25/100, or 0.25.
The probability of having a blue-eyed child depends on the genetic makeup of the parents. If both parents carry the recessive allele for blue eyes (Bb), where "B" represents the brown eye allele and "b" represents the blue eye allele, there is a 25% chance of having a blue-eyed child (bb). If one or both parents have brown eyes but carry the blue eye allele, the probability may vary. If neither parent has the blue eye allele, the probability of having a blue-eyed child is 0%.
Probability of not blue is the probability of white. The probability of white is 11/(11+21) or 11/32.
Since blue is the only color named, I'd guess that the probability is 100%.
Type the codes below before your text, such as "^1This text is red, but the word ^4blue ^1is ^4blue." In that quote, all text will be red except the two blues which are blue. ^1 - RED ^2 - GREEN ^3 - YELLOW ^4 - BLUE ^5 - CYAN ^6 - PINK ^7 - WHITE ^8 - DEFAULT MAP COLOR ^9 - GREY OR DEFAULT MAP COLOR ^0 - BLACK
if there is a jar containing 5 red marbles 6green and 4 blue what is the probability off not chossing a blue marble
It is 12/47.
There is a probability of 3 that it will be blue.
If there is 3 blue 2 red and 4 green. What is the probability of getting green?
The probability of randomly choosing 1 blue sock is 7/10. The probability of randomly choosing 2 blue socks in a row is 7/10 x 7/10 = 49/100.
The probability of drawing a Queen of Hearts from a standard deck is 1 in 52, or about 0.01923. The probability of drawing a blue card from a standard deck is zero, because there are no blue cards. Simply add them together 0.01923 + 0 = 0.01923.
To determine the experimental probability of the spinner landing on blue, you need to conduct a series of spins and record the outcomes. The experimental probability is calculated by dividing the number of times the spinner lands on blue by the total number of spins. For example, if the spinner is spun 100 times and lands on blue 25 times, the experimental probability would be 25/100, or 0.25.
The probability of having a blue-eyed child depends on the genetic makeup of the parents. If both parents carry the recessive allele for blue eyes (Bb), where "B" represents the brown eye allele and "b" represents the blue eye allele, there is a 25% chance of having a blue-eyed child (bb). If one or both parents have brown eyes but carry the blue eye allele, the probability may vary. If neither parent has the blue eye allele, the probability of having a blue-eyed child is 0%.
The probability is 0.56