If a linear equation has solutions (-2,2)(0,0) and (2,-2), then it is of the form

If a in R and the equation (a-2) (x-[x])^(2) + 2(x-[x]) + a^(2) = 0 (where [x] denotes the greatest integer function) has no integral solution and has exactly one solution in (2, 3), then a lies in the interval

A pair of linear equations which has a unique solution x = 2 and y = -3 is

Any solution of the linear equation 2x+0y+9=0 in the two variables is of the form

Find the real values of lambda for which the following system of linear equations has non-trivial solutions. Also, find the non-trivial solutions. 2lambdax-2y+3z=0 x+lambday+2z=0 2x+lambdaz=0

Find the real values of lambda for which the following system of linear equations has non-trivial solutions. Also, find the non-trivial solutions. 2lambdax-2y+3z=0 x+lambday+2z=0 2x+lambdaz=0

Let the system of linear equations A[x y z]=[0 1 0] where A is a matrix of set X If the system of linear equation has infinite solution then number of value of alpha is infinite If the system of linear equation has infinite solution then number of matrices is infinite If the system of linear equation has infinite solution then number of value of alpha is only 4 If the system of linear equation has infinite solution then number of matrices is 4

Comprehension 2 Consider the system of linear equations alphax+y+z=m x+alphay+z=n x+y+alphaz=p If alpha=-2\ 7\ m+n+p!=0 then system of linear equations has- a. no solution b. infinite solutions c. unique solution d. finitely many solution

If the equation 2cos^(2)x+cosx-a=0 has solutions, then a can be