Discrete Math Binomial Theorem Formula. Sigma Notation: sum_{i=0}^{n} ((n),(i)) x^i y^{(n-i)}

kadirsmr9d

kadirsmr9d

Answered question

2022-09-04

Discrete Math Binomial Theorem Formula.
Binomial Theorem Formula:
- Sigma Notation: i = 0 n ( n i ) x i y ( n i )
Note: ( n i ) is the exponent of y.
Logical Question:
Can the place of exponents for x and y be switched ?
Ex. i = 0 n ( n i ) x ( n i )
Note: Now ( n i ) is the exponent of x.

Answer & Explanation

ko1la2h1qc

ko1la2h1qc

Beginner2022-09-05Added 18 answers

Step 1
Note that
( x + y ) n = ( y + x ) n
Step 2
The general term of the first expression is ( n r ) x r y n r and in the second case is ( n r ) y r x n r = ( n n r ) x r y n r . Thus, both expressions are equivalent.
faliryr

faliryr

Beginner2022-09-06Added 15 answers

Step 1
The key for your question is the symmetry of binomial coefficients ... for all integers n,k such that 0 k n we have:
( n k ) = ( n n k )
Step 2
This can be understood with a combinatorial argument : given a set E such that c a r d ( E ) = n and an integer k such that 0 k n, there exists a bijection from the set P k ( E ) of subsets of A E such that c a r d ( A ) = k to the set P n k ( E ): map A to E A.

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