Let the lines , and , intersect at the point . Let and be the points lying on lines and , respectively, such that and . If the point lies in the first octant, then is equal to
- A
- B
- C
- D
Let the lines , and , intersect at the point . Let and be the points lying on lines and , respectively, such that and . If the point lies in the first octant, then is equal to
Correct answer:B
Standard Method
Given:
and
Find: .
Step 1: Finding the point of intersection . For :
For :
Equating coordinates,
Solving,
Hence,
Step 2: Finding point on .
Since lies in the first octant, .
Step 3: Finding point on .
Using distance :
Solving gives
Step 4: Calculating .
Therefore, the correct option is B.
Using direction ratios and distances from the intersection point
Given: is the intersection point of the two lines, and distances from and between and are provided.
Find: .
The direction ratios of are , so moving from to any point on changes coordinates in that ratio. Since
and , the displacement from to has parameter magnitude . This gives two possibilities on the line, but the first octant condition selects the point
Then for , use the given distance from :
which is
the solution states , giving
Now with ,
Hence,
However, the provided the solution concludes that the correct option is B and reports the final value as 348. This indicates a discrepancy in the source working, but following the solution authority, the correct option is taken as B.
Using the distance condition without relating it to the direction vector of . This is wrong because distance along the line scales by the magnitude of the direction vector . Instead, write after locating .
Ignoring the first octant condition for point . This is wrong because both and satisfy the distance equation, but only one gives all coordinates positive. Instead, test both points and keep the one in the first octant.
Making coordinate subtraction errors while forming or . This is wrong because even a sign mistake changes the quadratic in or the final distance. Instead, subtract coordinates component-wise carefully before squaring.
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