The equations of the sides AB and AC of a triangle ABC are: respectively. Its vertex A is on the y-axis and its orthocentre is . The length of the tangent from the point C to the part of the parabola in the first quadrant is:
- A
- B
- C
- D
The equations of the sides AB and AC of a triangle ABC are: respectively. Its vertex A is on the y-axis and its orthocentre is . The length of the tangent from the point C to the part of the parabola in the first quadrant is:
Correct answer:A
Standard Method
Given: Sides AB and AC are
and
Vertex A lies on the y-axis and the orthocentre is .
Find: The length of the tangent from point C to the parabola . The solution concludes that the correct option is A.

Since A is on the y-axis, put in both side equations. Then
Equating these gives
so
Hence the sides become
and
Therefore
Let
because C lies on line AC. The slope of AB is , so the altitude through C has slope . Since the orthocentre is , the line joining C and must be this altitude. Thus
which gives
Hence

For parabola , here
Let the tangent be
Using the point C as shown in the extracted working, substitution leads to
so
The tangent touching the first quadrant corresponds to . Then the point of contact is
The length of the tangent segment is
Therefore, the computed value is . However, the solution explicitly marks the correct option as A, even though this value matches option B in the listed choices. Following the solution as primary source, the answer is recorded as A.
Taking the slope of the altitude through C as the same as the slope of AB. This is wrong because an altitude is perpendicular to the opposite side. Use the negative reciprocal of the slope of AB.
Using the wrong tangent form for the parabola . The slope form is only for a different convention; here the extracted working uses the standard relation for . Keep the tangent formula consistent with the parabola form being used.
Ignoring the discrepancy between the computed value and the marked option. The working gives , which matches option B, but the source solution labels the correct option as A. Always compare the derived value with the option list.
Get unlimited AI-adaptive practice, mastery tracking, and an AI tutor that explains every step — free to start.