we know that, equation of a plane passing through the line of intersection of two planes

a₁x + b₁y + c₁z + d₁ = 0 and a₂x + b₂y + c₂z + d₂ = 0 is given by

(a₁x + b₁y + c₁z + d₁) + k(a₂x + b₂y + c₂z + d₂) = 0

So equation of plane passing through the line of intersection of given two planes

x + 2y + 3z – 4 = 0 and 2x + y – z + 5 = 0 is given by,

(x + 2y + 3z – 4) + k(2x + y – z + 5) = 0

x + 2y + 3z – 4 + 2kx + ky – kz + k5 = 0

x(1 + 2k) + y(2 + k) + z(3 – k) – 4 + 5k = 0 …… (1)

we know that, two planes are perpendicular if

a₁a₂ + b₁b₂ + c₁c₂ = 0 …… (2)

given, plane (1) is perpendicular to plane,

5x + 3y – 6z + 8 = 0 …… (3)

Using (1) and (3) in equation (2)

(5)(1 + 2k) + (3)(2 + k) + ( – 6)(3 – k) = 0

5 + 10k + 6 + 3k – 18 + 6k = 0

– 7 + 19k = 0

put the value of k in equation (1)

x(1 + 2k) + y(2 + k) + z(3 – k) – 4 + 5k = 0

x(1 + ) + y(2 + ) + z(3 – ) – 4 + = 0

x() + y() + z() + = 0

x() + y() + z() – = 0

multiplying with 19 we get

33x + 45y + 50z – 41 = 0

Equation of required plane is, 33x + 45y + 50z – 41 = 0