MHT CET · Maths · Three Dimensional Geometry
The equation of the plane, passing through the point \((1,1,1)\) and perpendicular to the planes \(2 x+y-2 z=5\) and \(3 x-6 y-2 z=7\), is
- A \(14 x+2 y-15 z=1\)
- B \(14 x-2 y+15 z=27\)
- C \(14 x+2 y+15 z=31\)
- D \(-14 x+2 y+15 z=3\)
Answer & Solution
Correct Answer
(C) \(14 x+2 y+15 z=31\)
Step-by-step Solution
Detailed explanation
The equation of plane passing through \((1,1,1)\) is
\(a(x-1)+b(y-1)+c(z-1)=0\)
Since plane (i) is perpendicular to the planes
\(2 x+y-2 z=5 \text { and } 3 x-6 y-2 z=7\)
\(\therefore \quad 2 \mathrm{a}+\mathrm{b}-2 \mathrm{c}=5\)...(i)
\(3 a-6 b-2 c=7...(ii)\)
On solving (i), (ii) and (iii), we get
\(a=14, b=2, c=15\)
Substituting the values of \(a, b, c\) in (i), we get
\(\begin{aligned}
& 14(x-1)+2(y-1)+15(z-1)=0 \\
& \Rightarrow 14 x+2 y+15 z=31
\end{aligned}\)
\(a(x-1)+b(y-1)+c(z-1)=0\)
Since plane (i) is perpendicular to the planes
\(2 x+y-2 z=5 \text { and } 3 x-6 y-2 z=7\)
\(\therefore \quad 2 \mathrm{a}+\mathrm{b}-2 \mathrm{c}=5\)...(i)
\(3 a-6 b-2 c=7...(ii)\)
On solving (i), (ii) and (iii), we get
\(a=14, b=2, c=15\)
Substituting the values of \(a, b, c\) in (i), we get
\(\begin{aligned}
& 14(x-1)+2(y-1)+15(z-1)=0 \\
& \Rightarrow 14 x+2 y+15 z=31
\end{aligned}\)
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