समतलों \(x= a y+ b\) तथा \(z= c y+ d\) की प्रतिच्छेदी रेखा का सममित रूप है

A \(\frac{{x - b}}{a} = \frac{{y - 1}}{1} = \frac{{z - d}}{c}\)
B \(\frac{{x - b - a}}{a} = \frac{{y - 1}}{1} = \frac{{z - d - c}}{c}\)
C \(\frac{{x - a}}{b} = \frac{{y - 0}}{1} = \frac{{z - c}}{d}\)
D \(\frac{{x - b - a}}{b} = \frac{{y - 1}}{0} = \frac{{z - d - c}}{d}\)

Verified Solution

Answer & Solution

Correct Answer

(B) \(\frac{{x - b - a}}{a} = \frac{{y - 1}}{1} = \frac{{z - d - c}}{c}\)

Step-by-step Solution

Detailed explanation

Given two planes: \(x-a y-b=0\) and \(c y-z+d=0\) Let, \(l, m, n\) be the direction ratio of the required line. since the required line is perpendicular to normal of both the plane, therefore \(l-a m=0\) and \(c m-n=0\) \(\Rightarrow l-a m+0 . n=0\) and \(0 . l+c m-n=0\)…

Apply the relevant identity from the chapter and substitute the values established in the previous step, keeping the original constraint in view.

Use the simplified expression to isolate the unknown, then plug the result back into the question setup to confirm the working is internally consistent.

Cross-check against a boundary or limiting case. Both the dimensional balance and the qualitative behaviour at the extreme should agree with the candidate answer.

Combine the steps above to identify the correct option. The remaining choices each fail at least one of the consistency, dimensional, or boundary checks.

Same subject

Explore more questions on app

From JEE Mains

Explore more questions on app

चर \(( x )\)	\(x _{1}\)	\(x _{1}\)	\(x _{3} \ldots \ldots x _{15}\)
बारंबारता \((f)\)	\(f _{1}\)	\(f _{1}\)	\(f _{3} \ldots f _{15}\)