lf `(1 + x + x^2 + x^3)^5 = a_0+a_1x +a_2x^2+.....+a_(15)x^15`, then `a_(10)` equals to

if (1+ax+bx^(2))^(4)=a_(0) +a_(1)x+a_(2)x^(2)+…..+a_(8)x^(8), where a,b,a_(0) ,a_(1)…….,a_(8) in R such that a_(0)+a_(1) +a_(2) ne 0 and |{:(a_(0),,a_(1),,a_(2)),(a_(1),,a_(2),,a_(0)),(a_(2),,a_(0),,a_(1)):}|=0 then the value of 5.(a)/(b) " is " "____"

If f(x)=|1x x+1 2x x(x-1)(x+1) x3 x(x-1) x(x-1)(x-2) (x+1)x(x-1)| then f(500) is equal to 0 b. 1 c. 500 d. -500

Statement-1 f(x) = |{:((1+x)^(11),(1+x)^(12),(1+x)^(13)),((1+x)^(21),(1+x)^(22),(1+x)^(23)),((1+x)^(31),(1+x)^(32),(1+x)^(33)):}| the cofferent of x in f(x)=0 Statement -2 If P(x)= a_(0)+a_(1)x+a_(2)x^(2)+a_(2)x_(3) +cdots+a_(n)s^(n) then a_(1)=P'(0) , where dash denotes the differential coefficient.

If f''(x)=-f(x) and g(x)=f^(prime)(x) and F(x)=(f(x/2))^2+(g(x/2))^2 and given that F(5)=5, then F(10) is equal to 5 (b) 10 (c) 0 (d) 15

Show that two lines a_(1) x + b_(14) y + c_(1) = 0 and a_(2) x + b_(2) y + c_(2) = 0 , where b_(1) , b_(2) ne 0 are Perpendicular if a_(1) a_(2) + b_(1) b_(2) =0 .

Show that two lines a_(1) x + b_(14) y + c_(1) = 0 and a_(2) x + b_(2) y + c_(2) = 0 , where b_(1) , b_(2) ne 0 are (i) Parallel if (a_1)/( b_1) = (a_2)/( b_2) and

(1+x)^(10)=a_(0)+a_(1)x+a_(2)x^(2)+……..+a_(10)x^(10) then the value of (a_(0)-a_(2)+a_(4)-a_(6)+a_(8)-a_(10))^(2)+(a_(1)-a_(3)+a_(5)-a_(7)+a_(9))^(2) is ……

p(x)=a_(0)+a_(1)x^(2)+a_(2)x^(4)+…………+a_(n)x^(2n) is a polynomial with real variable x. If 0 lt a_(0)lt a_(1)lt a_(2)lt ……….lt a_(n) then p(x) has …………

(1+x-2x^(2))^(6)=1+a_(1),x+a_(2)x^(2)+….+a_(12)^(12) then the value of a_(2) +a_(4)+a_(6)+….+a_(12)=………