If a+x=b+y=c+z+1, where a, b, c, x y , z are non-zero distinct real numbers, then |x&a+y&x+a y&b+y&y+b z&c+y&z+c| is equal to :

Question

If a+x=b+y=c+z+1, where a, b, c, x y , z are non-zero distinct real numbers, then |x&a+y&x+a y&b+y&y+b z&c+y&z+c| is equal to : (A) 0 (B) y ( a - b ) (C) y ( b - a ) (D) y ( a - c )

Tardigrade Admin · Accepted Answer

Q. If $a + x = b + y = c + z + 1,$ where $a, b, c, x$ $y, z$ are non-zero distinct real numbers, then $∣ ∣ x y z a + y b + y c + y x + a y + b z + c ∣ ∣$ is equal to :

0

$y (a - b)$

$y (b - a)$

$y (a - c)$

Q. If a+x=b+y=c+z+1, where a,b,c,x y,z are non-zero distinct real numbers, then ∣∣​xyz​a+yb+yc+y​x+ay+bz+c​∣∣​ is equal to :

0

y(a−b)

y(b−a)

y(a−c)

Q. If $a + x = b + y = c + z + 1,$ where $a, b, c, x$ $y, z$ are non-zero distinct real numbers, then $∣ ∣ x y z a + y b + y c + y x + a y + b z + c ∣ ∣$ is equal to :

$y (a - b)$

$y (b - a)$

$y (a - c)$