10.56% The probability that he misses his first shot is 12%. The probability that he makes the second shot is 88%. The probability of missing the first shot and making the second shot is 12% * 88%, or 0.12*0.88*100.
You want the probability of miss and miss and miss which is .67 * .67 * .67 = 0.301.
We'll if they are 89% it's pretty high
There is a 10 percent chance that you are gonna throw a 1.
should be 1/6 chance for one. So 1/192 .5 percent
The probability the shooter makes both shots is .7 * .7 = .49, and the probability of making neither is .3 * .3 = .09. So the probability of making exactly 1 out of 2 is 1 - .49 - .9 = .42, or 42 percent.
10.56% The probability that he misses his first shot is 12%. The probability that he makes the second shot is 88%. The probability of missing the first shot and making the second shot is 12% * 88%, or 0.12*0.88*100.
Convert to a fraction, then convert to a decimal by dividing the numerator by the denominator. 0.00875 of per shots
With a single throw of a normal die, the probability is 0.With a single throw of a normal die, the probability is 0.With a single throw of a normal die, the probability is 0.With a single throw of a normal die, the probability is 0.
You want the probability of miss and miss and miss which is .67 * .67 * .67 = 0.301.
We'll if they are 89% it's pretty high
There is a 10 percent chance that you are gonna throw a 1.
should be 1/6 chance for one. So 1/192 .5 percent
If using a normal cube, the probability is 0.
At the Olympics, the probability is 1 At a kindergarten, the probability is 0!
The probability of getting an odd number in a single throw of a fair die (not dice!) is 1/2.The probability of getting an odd number in a single throw of a fair die (not dice!) is 1/2.The probability of getting an odd number in a single throw of a fair die (not dice!) is 1/2.The probability of getting an odd number in a single throw of a fair die (not dice!) is 1/2.
When you throw a die, there are six possibilities. The probability of a number from 1 to 6 is 1/6. This is classical probability. Compare this with empirical probability. If you throw a die 100 times and obtain 30 sixes, the probability of obtaining a 6 is 30/100 or 0.3. Empirical probabilities change whereas classical probability doesn't.