Let the line pass through the point and make equal angles with the positive coordinate axes. If the distance of from the point is , then the sum of all possible values of is :
- A
- B
- C
- D
Let the line pass through the point and make equal angles with the positive coordinate axes. If the distance of from the point is , then the sum of all possible values of is :
Correct answer:C
Standard Method
Given: The line passes through and makes equal angles with the positive coordinate axes. The point is and the distance from to the line is .
Find: The sum of all possible values of .
A line making equal angles with the axes has direction ratios , so we take direction vector .
The vector from to is
Using the distance formula from a point to a line in three dimensions,
Now,
and
Therefore,
So,
Hence,
Their sum is
Therefore, the correct option is C.
Taking the direction ratios as something other than . This is wrong because equal angles with the three positive coordinate axes imply equal direction cosines, hence proportional direction ratios . Always start by converting the geometric statement into the correct direction vector.
Using the distance formula from a point to a plane instead of from a point to a line. This gives an incorrect equation in . Here the correct relation is for a line with direction vector .
Computing incorrectly. A common error is to miss the contribution of the third coordinate or mishandle signs in . Write the vector carefully as before taking the dot product.
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