Let P(x) = `a_(0) + a_(1)x^(2) + a_(2)x^(4)` + ..........+ `a_(n) x^(2n)` be a polynomial in a real variable x with `0 lt a_(0) lt a_(1) lt a_(2) lt ……………. lt a_(n)` The function P(x) has :

If (1 - x + x^2)^n = a_0 + a_1 x + a_2x^2 + ..... + a_(2n)x^(2n) then a_0 + a_2 + a_4 + ... + a_(2n) equals

Differentiate |x|+a_(0)x^(n)+a_(1)x^(n-1)+a_(2)x^(n-2)+...+a_(n-1)x+a_(n)

If (1 + x+ 2x^(2))^(20) = a_(0) + a_(1) x + a_(2) x^(2) + …+ a_(40) x^(40) . The value of a_(0) + a_(2) + a_(4) + …+ a_(38) is

Let (1 + x^(2))^(2) (1 + x)^(n) = a_(0) + a_(1) x + a_(2) x^(2) + … if a_(0),a_(1) " and " a_(2) are in A.P , the value of n is

Let g(x)=a_(0)+a_(1)x+a_(2)x^(2)+a_(3)x^(3)andf(x)=sqrt(g(x)),f(x) have its non-zero local minimum and maximum values at -3 and 3 respectively. If a_(3) in the domain of the function h(x)=sin^(-1)((1+x^(2))/(2x)) The value of a_(1)+a_(2) is equal to

Let g(x)=a_(0)+a_(1)x+a_(2)x^(2)+a_(3)x^(3)andf(x)=sqrt(g(x)),f(x) have its non-zero local minimum and maximum values at -3 and 3 respectively. If a_(3) in the domain of the function h(x)=sin^(-1)((1+x^(2))/(2x)) The value of a_(0) is

If the function f(x) is defined as : f(x) =a_(0) +a_(1)x^(2)+…..+ a_(10)x^(20) where 0 lt a_(0) lt …. < a_(10) . Then f(x) has in RR :

Let a_(n) = (1+1/n)^(n) . Then for each n in N

Let us consider the binomial expansion (1 + x)^(n) = sum_(r=0)^(n) a_(r) x^(r) where a_(4) , a_(5) "and " a_(6) are in AP , ( n lt 10 ). Consider another binomial expansion of A = root (3)(2) + (root(4) (3))^(13n) , the expansion of A contains some rational terms T_(a1),T_(a2),T_(a3),...,T_(am) (a_(1) lt a_(2) lt a_(3) lt ...lt a_(m)) The value of a_(m) is

If a_(0),a_(1),a_(2) ,…, a_(2n) are the coefficients in the expansion of (1 + x + x^(2))^(n) in ascending power of x show that a_(0)^(2) - a_(1)^(2) + a_(2)^(2) -…+ a_(2n)^(2) = a_(n) .