I have finished elementary probability and I know the sum of all probabilites in a data set is 1.But

shelohz0

shelohz0

Answered question

2022-05-21

I have finished elementary probability and I know the sum of all probabilites in a data set is 1.But while reading Binomial Distribution,I encountered the formula for the Probability mass distribution :
f ( k ; n , p ) = Pr ( K = k ) = ( n k ) p k ( 1 p ) n k
Well, I know that probability is a fraction less than 1, and fractions multiplied with fractions will still yield a lesser fraction as the product. But what I am confused about is that the " ( n k ) " that we multiply at the start of the formula is a positive integer, and I am confused that why shouldn't the net product be more than one?
I mean, the fraction that we get after multiplying the probabilities, wouldn't that turn greater than 1 if we multiply (which is repeated addition by itself) that fraction by the positive integer we get as a result of " ( n k ) " ?
Sorry about my roundabout way of talking. You are only requested to prove that the whole thing is a value less than 1. I tried and just couldn't see why it shouldn't be greater than 1. I am in learner's stage (I could have learnt the forumla by rote, but my video instructor says if I proceed like that without understanding things and asking questions, then I will be like a monkey on a type-writer.

Answer & Explanation

coquinarq1

coquinarq1

Beginner2022-05-22Added 14 answers

According to the binomial theorem:
1 = 1 n = ( p + 1 p ) n = k = 0 n ( n k ) p k ( 1 p ) n k

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