By the method of matrix inversion, solve the system.
`[(1,1,1),(2,5,7),(2,1,-1)][(x_(1),y_(1)),(x_(2),y_(2)),(x_(3),y_(3))]=[(9,2),(52,15),(0,-1)]`

Find the coordinates of the centroid fof the triangle whose vertices are (x_(1),y_(1),z_(1)),(x_(2),y_(2),z_(2)) and (x_(3),y_(3),z_(3))

Solve by matrix inversion method the following system of equations. (2)/(x)-(3)/(y)= 10, (1)/(x) + (1)/(y) = 10

If x_(1),x_(2),x_(3) as well as y_(1),y_(2),y_(3) are in A.P. with the same common difference , then show that the points (x_(1),y_(1)),(x_(2),y_(2))and(x_(3),y_(3)) are collinear.

Let A be an mxxn matrix. If there exists a matrix L of type nxxm such that LA=I_(n) , then L is called left inverse of A. Similarly, if there exists a matrix R of type nxxm such that AR=I_(m) , then R is called right inverse of A. For example, to find right inverse of matrix A=[(1,-1),(1,1),(2,3)] , we take R=[(x,y,x),(u,v,w)] and solve AR=I_(3) , i.e., [(1,-1),(1,1),(2,3)][(x,y,z),(u,v,w)]=[(1,0,0),(0,1,0),(0,0,1)] {:(implies,x-u=1,y-v=0,z-w=0),(,x+u=0,y+v=1,z+w=0),(,2x+3u=0,2y+3v=0,2z+3w=1):} As this system of equations is inconsistent, we say there is no right inverse for matrix A. The number of right inverses for the matrix [(1,-1,2),(2,-1,1)] is

Solve the following system of equations by matrix inversion method: (2)/(x) + (3)/(y) - (4)/(z) = -3, (1)/(x) + (2)/(y) + (6)/(z) = 2, (3)/(x)-(1)/(y)+(2)/(z) = 5

Solve by matrix inversion method the following system of equations. x_(1) + x_(2)-3 = 0 , x_(1) - 4x_(2) + 2 = 0

If x_(1),x_(2),x_(3) as well as y_(1),y_(2),y_(3) are in G.P. with the same common ratio , then show that the points (x_(1),y_(1)),(x_(2),y_(2))and(x_(3),y_(3)) lie on a straight line .

Simply (x^(2)y^(2))^(-1/6)div(y^(3))^(1/9)xx(x^(2))^(1/3)

If |x_1y_1 1x_2y_2 1x_3y_3 1|=|a_1b_1 1a_2b_2 1a_3b_3 1| then the two triangles with vertices (x_1, y_1),(x_2,y_2),(x_3,y_3) and (a_1,b_1),(a_2,b_2),(a_3,b_3) are equal to area (b) similar congruent (d) none of these

Let A={3x+sqrt5y:x,yinZZ}. Show that an operation ** on A defined by, (3x_(1)+sqrt5y_(1))**(3x_(2)+sqrt5y_(2))=3(x_(1)+x_(2))+sqrt5(y_(1)+y_(2)) for all x_(1),x_(2),y_(1),y_(2)inZZ is binary operation on A.