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(C) The equation of a plane passing through the intersection of two planes $P_1: x+2y-z+1=0$ and $P_2: 3x-y-4z+3=0$ is given by $P_1 + \lambda P_2 = 0

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$8x-5y-11z+8=0$

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(C) The equation of a plane passing through the intersection of two planes $P_1: x+2y-z+1=0$ and $P_2: 3x-y-4z+3=0$ is given by $P_1 + \lambda P_2 = 0$. $(x+2y-z+1) + \lambda(3x-y-4z+3) = 0$. Since the plane passes through the point $(1,1,1)$,we substitute $x=1, y=1, z=1$ into the equation: $(1+2(1)-1+1) + \lambda(3(1)-1-4(1)+3) = 0$. $(1+2-1+1) + \lambda(3-1-4+3) = 0$. $3 + \lambda(1) = 0 \implies \lambda = -3$. Substituting $\lambda = -3$ back into the equation: $(x+2y-z+1) - 3(3x-y-4z+3) = 0$. $x+2y-z+1 - 9x+3y+12z-9 = 0$. $-8x + 5y + 11z - 8 = 0$. Multiplying by $-1$,we get $8x - 5y - 11z + 8 = 0$.

The equation of the plane passing through the point $(1,1,1)$ and through the line of intersection of $x+2y-z+1=0$ and $3x-y-4z+3=0$ is

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