If ` a ne bne c ` one value of x which satisfies thte equation :
`|(0,x-a,x-b),(x+a,0,x-c),(x+b,x+c,0)|=0` is given by :

A root of the equation |(0, x-a,x-b),(x+a,0,x-c),(x+b,x+c,0)|=0 is

The root of the equation : |(a-x,b,c),(0,b-x,0),(0,b,c-x)|=0 are :

If a, b, c are different, then value of x satisfying the equation |{:( 0 , x^(2) - a , x^(3) - b) , (x^(2) + a , 0 , x^(2) + c), (x^(4) + b , x- c , 0):}|=0 is

If a le b le c le d then the equation (x-a)(x-c)+2(x-b)(x-d)=0 has

|(x,a,x+a),(y,b,y+b),(z,c,z+c)| = 0

The values of x, satisfying the equation for AA a > 0, 2log_(x) a + log_(ax) a +3log_(a^2 x)a=0 are

Both the roots of the equation : (x - b) (x -c) + (x - c) (x - a) + (x - a) (x - b) = 0 are always :

If f(x)=|(x^(3)-x,a+x,b+x),(x-a,x^(2)-x,c+x),(x-b,x-c,0)| then

If a, b and c are distinct real numbers, prove that the equation (x-a)(x-b)+(x-b)(x-c)+(x-c)(x-a)=0 has real and distinct roots.

A value of b for which the equations : x^(2) + bx - 1= 0, x^(2) + x + b = 0 Have one root in common is :