proof of the binomial theorem

Alternative Proof of Binomial Theorem for Positive Integral Index (Combinatorial Method). We have, (a + b) n = (a + b) (a + b) ....... n times. The terms on the RHS are obtained by taking one letter from each factor and multiplying them together. Choosing 'a' fr..

Since |x|<1, we have by binomial theorem, Comparing, the coefficients of y in (1) and (2), we get ..

For any rational number n, We accept this expansion without proof..

1. A sentence is called a statement if it can be adjudged as true or false. Every statement is a sentence, but a sentence may or may not be a statement. 2. A statement involving natural number n is generally denoted by P(n). 3. A binomial is an algebraic expression o..

If P coincides with O then AO = OB or AP = PB. . If P does not coincides O, then compare triangles AOP and BOP. PA=PB ( given) AO=OB ( O is the mid point of AB) OP=OP ( common side) But ( Linear pair) ..

If Q coincides with O, then AO = BO. i.e., AQ=BQ If Q is distinct i.e., Q does not coincides with O, then compare triangles AOQ and BOQ. AO=BO ( O is the mid point of AB) (given) OQ=OQ ( common side) AQ=BQ ( CP..

x + 1 = 1 (Theorem 2a) In particular for x = 0, we have 0 + 1 = 1 (1) x.0 = 0 (Theorem 2b) In particular, for x =1 1.0 = 0 0.1 = 0 (3a) (2) From (1) and (2), we have For 0 B, 0 + 1 = 1 0.1 = 0 1 is the complement of 0. 0' = 1 ..

Let n > 0. When n = 0, tan (0 p + x) = tan x which is true. The theorem is proved by mathematical induction when n=1, tan ( p +x)=tan p =RHS. Let the theorem be true for n = m > 0 then tan(m p + x) = tan p Since the theorem is true for all n = 1, n = m,..

x + 1 = 1 (Theorem 2a) In particular, for x = 0 0 + 1 =1 1 + 0 = 1 (1) (Axiom 3a) x . 0 = 0 In particular for 1 B, we have 1 . 0 = 0 (2) From (1) and (2), we have 0 is the complement of 1. (Axiom ..

From the above theorem, we have = 1 \ Using Sandwich theorem, we ge..