binomial theorem

Useful fax in the result statement of a binary theorem for any positive integer and which is true for any action a the number of terms in the expansion of the general term in the expansion of Coefficient fennisible the only middle term in town if any is all the two middle term in the pencil terms working rule for finding the term in the payment of a late the term the general term is the general term is the binomial Coefficient are also written as note cannot be reach him as foreign being negative fractional oneplus x oneplus 8 x + 24 x find a n find the sum of all Coefficient expansion of find the coefficient of X in the expansion of X / 2 - 3 / 8 find the term independent of a prove that in the middle term the expansion is 1120 find the value of x find the relation between the coefficient of X and X in the expansion of forward value of are the coefficient of two hour and R + R terms are equal which term in the expansion of the first negative term calculate correct 3 places or decimal by Binomial expansion prove that coefficient of inexpension of disable the coefficient of Y is equals to then Express ascending power supply in 21st in the 22nd terms in expansion of are equal find the value of determine the larger of the following through find the value of number of terms in expansion of after simplification is 505101 to 10 to the sum of the coefficient expansion of aware and its positive integer is the expression is expanded in ascending power surface the total number of terms is 138920 that's pension of will you valid for then equals in is the number of towns in expansion is 1378 9211 the coefficient of X in the expansion of find the term independent of x so that the copies in a middle term in expansion of is equals to the sum of the popular middle term in the expansion of find the term independent of x square p and if you are positive integer is so that the coefficient the middle term the expansion of 1 - X 1352 and -1 - 2 injection is independent and is equal to 1120 find n and PQ the coefficient of X in expansion is equal so that PQ is equals to 1 expensive is 1024 find n and the coefficient of so that is divisible by 64 then be the positive integer the coefficient of the 5th 6 7th term in the expansion of rhinit find and it PB the positive integer than so that the expression age divisible by prove that in any positive integer so that prove that at the subsetting term so that they know the product appoint copies in the expansion so that value appear the expansion will be valid valve what will be the four term of the pension find the sum of 12 13 24 14 135 to 4640 abc of the proposal any four consecutive term the expansion being positive prove that find the sum of in are the coefficient expansion of heat then show that some of all the products quantity taken toward the time