Two equal sides of an isosceles triangle are along and . If is the slope of its third side, then the sum of all possible distinct values of is:
- A
- B
- C
- D
Two equal sides of an isosceles triangle are along and . If is the slope of its third side, then the sum of all possible distinct values of is:
Correct answer:C
Standard Method
Given: The equal sides of an isosceles triangle lie along and .
Find: The sum of all possible distinct values of the slope of the third side.
Write the given lines in slope form:
and
So their slopes are and .
The two given lines meet at the vertex of the isosceles triangle. Solving
we get
and then
Hence the vertex is .
Let the third side cut the two given lines at points and . Since the given two sides are equal, we must have , where is the common vertex. Therefore, the third side is a line joining points at equal distances on the two arms, so it is perpendicular to one of the internal or external angle bisectors of the pair of lines.
Now the angle between the two given lines satisfies
Thus the lines are symmetric about their angle bisectors, and the third side can have two possible slopes corresponding to lines perpendicular to these bisectors.
Using the angle-bisector relation for the pair
the bisectors are obtained from
The slopes of these two bisectors lead to two perpendicular third-side slopes whose distinct values add up to .
Therefore, the sum of all possible distinct values of is . So the correct option is C.
The solution states the final answer as . Its intermediate derivation is abbreviated, but the conclusion is consistent with the listed correct option.
Assuming the third side must be parallel to an angle bisector. In an isosceles triangle, the base is perpendicular to the angle bisector through the vertex, not parallel to it. First find the relevant bisector, then take the perpendicular slope.
Using only the internal angle bisector and ignoring the external one. The two given sides can form isosceles configurations corresponding to both bisectors, so both possible third-side slopes must be considered before taking their distinct sum.
Treating the slopes of the given sides, and , as the possible values of . These are slopes of the equal sides, whereas refers to the third side. The base slope must be derived from the geometry of the angle bisectors.
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