If the general solution of some differential equation is `y=a_(1)(a_(2)+a_(3)).cos(x+a_(4))-a_(5)e^(x+a_(6))` then oder of differential equation is .....

Find the relation between acceleration of blocks a_(1), a_(2) and a_(3) .

What does a_(1) + a_(2) + a_(3) + …..+ a_(n) represent

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

Answer each question by selecting the proper alternative from those given below each question so as to make the statement true: The solution of the pair of linear equations a_(1)x+b_(1)y+c_(1)=0 and a_(2)x+b_(2)y+c_(2)=0 by corss-multiplication method is given by .................. x=(b_(2)c_(1)-b_(1)c_(2))/(a_(1)b_(2)-a_(2)b_(1)), y=(a_(1)c_(2)-a_(2)c_(1))/(a_(1)b_(2)-a_(2)b_(1)) x=(b_(1)c_(2)-b_(2)c_(1))/(a_(1)b_(2)-a_(2)b_(1)), y=(a_(1)c_(2)-a_(2)c_(1))/(a_(1)b_(2)-a_(2)b_(1)) x=(b_(2)c_(1)-b_(1)c_(2))/(a_(1)b_(2)-a_(2)b_(1)), y=(a_(2)c_(1)-a_(1)c_(2))/(a_(1)b_(2)-a_(2)b_(1)) x=(b_(1)c_(2)-b_(2)c_(1))/(a_(1)b_(2)-a_(2)b_(1)), y=(a_(2)c_(1)-a_(1)c_(2))/(a_(1)b_(2)-a_(2)b_(1))

Let f(x) denotes the determinant f(x) = |{:(x^(2),2x,1+x^(2)),(x^(2)+1,x+1,1),(x,-1,x-1):}| On expansion g(x) is seen to be a 4th degree polynomial given by f(X) = a_(0)x^(4)+a_(1)x^(3)+a_(2)x^(2)+a_(3)x+a_(4) . Using differentiation of determinant or otherwise match the entries in Column I with one or more entries of the elements of Column II.

Show that all the roots of the equation a_(1)z^(3)+a_(2)z^(2)+a_(3)z+a_(4)=3, (where|a_(i)|le1,i=1,2,3,4,) lie outside the circle with centre at origin and radius 2//3.

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.

Statement-1: If f:{a_(1),a_(2),a_(3),a_(4),a_(5)}to{a_(1),a_(2),a_(3),a_(4),a_(5)} , f is onto and f(x)nex for each xin {a_(1),a_(2),a_(3),a_(4),a_(5)} , is equal to 44. Statement-2: The number of derangement for n objects is n! sum_(r=0)^(n)((-1)^(r))/(r!) .

The displacement of a particle is given by x=a_(0)+(a_(1)t)/(3)-(a_(2)t^(2))/(2) where a_(0),a_(1) and a_(2) are constants. What is its acceleration ?

If a_(1),a_(2),a_(3),"........" is an arithmetic progression with common difference 1 and a_(1)+a_(2)+a_(3)+"..."+a_(98)=137 , then find the value of a_(2)+a_(4)+a_(6)+"..."+a_(98) .