"has another second passed?"
The probability of getting both answers correct is one chance in nine (0.1111+). There are three possible answers for each question, so there is a 1/3 chance of getting the correct answer to one question. To get the correct answer for both questions, the chances are 1/3 x 1/3 or 1/9.
Just getting the answers to any test set doesn't make much sense. The question and answers has to be posted because the answers changes. Example someone posts (A) as an answer and it may be wrong. The questions come different in the test. So please and one copy all the exams question and paste along with the correct answers.
If you can recognize one or more of the possible answers on the SAT multiple choice as clearly NOT being correct, but you are unsure of the correct answer, it is better to guess than to skip the question.
The probability of getting at least 1 answer correct = 1 - Probability of getting all answers correct.So in your case it for be P(at least 1 answer correct) = 1 - 1/256where 256 is your sample space, |S| = 2^8.
If you sent an incorrect question, you can try asking again. You have a better chance of getting a correct answer if the question is correct.
Please answer my question. I have been asking this question and not getting answers
you'd have a 50% chance of getting the 3rd and 4th question correct because you said the first 2 questions are already anwsered correctly :)
because they are answered by regular people, not wiki answers. it is up to the people who answer the question to proofread and revise if they want to, but its not like we are getting graded on grammar. <3
Because your getting diffrent answers 1+1=2 1/1=1 see 2 different answers dividign your getting smaller adding getting bigger
That depends on how many questions there are, how many choices are listed for each question, and whether any obviously-stupid answers are included among the choices. If any of those factors changes, then the probability changes. One thing we can guarantee, however, even without knowing any of these factors: If you have studied the subject and know the material, then your probability of getting correct answers increases dramatically.
Try rephrasing the question. By the way, I think this is an answer
Well they are independent events so it is the probability of getting a correct answer multiplied by the probability of getting a correct answer on the second question. Short Answer: 1/5 times 1/5=1/25