Let `y` be an element of the set `A={1,2,3,4,5,6,10,15,30}` and `x_(1)`, `x_(2)`, `x_(3)` be integers such that `x_(1)x_(2)x_(3)=y`, then the number of positive integral solutions of `x_(1)x_(2)x_(3)=y` is

Find the number of positive integral solutions satisfying the equation (x_1+x_2+x_3)(y_1+y_2)=77.

If x_(1), x_(2), x_(3) and y_(1),y_(2), y_(3) are in arithmetic progression with the same common difference then the points (x_(1),y_(1)) (x_(2),y_(2)) (x_(3), y_(3)) are:

If x_(1),x_(2),x(3) as well as y_(1),y_(2),y_(3) are in geometric progression with the same common ratio,then the points (x_(1),y_(1)),(x_(2),y_(2)),(x_(3),y_(3))

The number of solutions of the system of equations 2x+y=4, x-2y=2, 3x+5y=6 is

The number of positive integral solutions of the equation |(x^3+1,x^2y,x^2z),(xy^2,y^3+1,y^2z),(xz^2,z^2y,z^3+1)|=11 is

The solution of the differential equation x(x^2+1)((dy)/(dx))=y(1-x^2)+x^3logx is

A(6,1), B(8,2) and C(9,4) are three vertices of a parallelograam ABCd taken in order. Find the fourth vertex D. IF (x_(1),y_(1)), (x_(2),y_(2)), (x_(3),y_(3)) and (x_(4),y_(4)) are the four vertices of the parallelgraam then using the given points, find the value of (x_(1)+x_(3)-x_(2),y_(1)+y_(3)+y_(2)) and state the reason for your result.

Find the area bounded by the curves y=sqrt(1-x^(2)) and y=x^(3)-x without using integration.

The x , y , z are positive real numbers such that (log)_(2x)z=3,(log)_(5y)z=6,a n d(log)_(x y)z=2/3, then the value of (1/(2z)) is ............