The number of real values of t such that...

The number of real values of t such that the system of homogeneous equations `tx+(t+1)y+(t-1)z=0, (t+1)x+ty+(t+2)z=0,(t-1)x+(t-2)y+tz=0` has non trivial solutions is

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The system of homogenous equations tx+(t+1)y+(t-1)z=0 , (t+1)x+ty+(t+2)z=0 , (t-1)x+(t+2)y+tz=0 has a non trivial solution for

The system of homogenous equations tx+(t+1)y+(t-1)z=0 , (t+1)x+ty+(t+2)z=0 , (t-1)x+(t+2)y+tz=0 has a non trivial solution for

The system of homogenous equations tx+(t+1)y+(t-1)z=0 , (t+1)x+ty+(t+2)z=0 , (t-1)x+(t+2)y+tz=0 has a non trivial solution for

The system of homogenous equations tx+(t+1)y+(t-1)z=0 , (t+1)x+ty+(t+2)z=0 , (t-1)x+(t+2)y+tz=0 has a non trivial solution for

If the system of homogeneous equations tx+(t+1)y+(t-1)z=0 (t+1)x+ty+(t+2)z=0 (t-1)x+(t+2)y+tz=0 in x,y,z has a non-trivial solution, then t is a root of the equation

if the system of equations (a-t)x+by +cz=0 bx+(c-t) y+az=0 cx+ay+(b-t)z=0 has non-trivial solutions then product of all possible values of t is

The equations x=(1)/(2)(t+(1)/(t)), y=(1)/(2)(t-(1)/(t)), t ne 0 , represent

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