Find the values of `m` for which the expression `2x^2+m x y+3y^2-5y-2` can be resolved into two rational linear factors.

Find the value of m for which the expressiion 12x^(2)-10xy+2y^(2)+11x-5y+m can be resolved into two rational linear factors.

The value(s) of m for which the expression 2x^(2)+mxy+3y^(2)-5y-2 can be factorized in to two linear factors are:

The expression x^(2)+2xy+ky^(2)+2x+k=0 can be resolved into two linear factors,then k in

17 Let a, and a, be two values of a for which the expression f(x, y_ 2x2 + 3xy-y2 + ay + 3x + 1 can be factorised into two linear factors then the product (a, a,) is cqual to (A) I (B) 3 (C) s (D) 7

The expression 2x^(2)+4xy-ky^(2)+4x+2y-1 can be resolved into two linear factors,then value of k is

For what value of k can the expression x^3 + kx^2 - 7x + 6 be resolved into three linear factors ?

1.For what values of m will the expression y^(2)+2xy+2x+my-3 in be capable of resolution into two rational factors?

If lambda_(1),lambda_(2)(lambda_(1)>lambda_(2)) are two values of lambda for which the expression f(x,y)=x^(2)+lambda xy+y^(2)-5x-7y+6 can be resolved as a product of two linear factors, then the value of 3 lambda_(1)+2 lambda_(2) is

For what values of m will the expression 5x^(2)+5y^(2)+4mxy-2x+2y+m be capable of resolution into two linear factors with real coefficients?

If the expression 3x^(2)+2pxy+2y+2ax-4y+1 can be resolved into two linear factors then p must be a root of the equation