Binomial Theorem

The Binomial Theorem provides a formula for the expansion of powers of a binomial, expressed as (a + b)^n = Σ (n choose k) * a^(n-k) * b^k, where k ranges from 0 to n.

(n choose k), denoted as C(n, k) or nCk, represents the number of ways to choose k elements from a set of n elements without regard to the order of selection.

The third term can be found using the formula: T(k+1) = C(n, k) * a^(n-k) * b^k. For (x + 4)^5, T(3) = C(5, 2) * x^(5-2) * 4^2 = 10 * x^3 * 16 = 160x^3.

The general form is (a + b)^n = Σ (n choose k) * a^(n-k) * b^k, where k = 0 to n.

The coefficient of x^2 in the expansion is 9, derived from the term C(3, 1) * x^2 * 3^1 = 3 * x^2 * 3 = 9x^2.

Using the Binomial Theorem, (2x + 5)^4 = Σ (4 choose k) * (2x)^(4-k) * 5^k for k = 0 to 4, resulting in 16x^4 + 160x^3 + 600x^2 + 1000x + 625.

Pascal's Triangle is a triangular array of binomial coefficients, where each number is the sum of the two directly above it, used to find coefficients in binomial expansions.

Row 7 of Pascal's Triangle is 1, 7, 21, 35, 35, 21, 7, 1.

To find the coefficient of x, expand (3x - 4)^2 = 9x^2 - 24x + 16. The coefficient of x is -24.

The coefficients in the Binomial Theorem correspond to the values in Pascal's Triangle and represent the number of ways to choose terms in the expansion.