MCQEasyJEE 2024Applications of P&C

JEE Mathematics 2024 Question with Solution

There are 55 points P1,P2,P3,P4,P5P_1, P_2, P_3, P_4, P_5 on the side ABAB, excluding AA and BB, of a triangle ABCABC. Similarly, there are 66 points P6,P7,,P11P_6, P_7, \ldots, P_{11} on the side BCBC and 77 points P12,P13,,P18P_{12}, P_{13}, \ldots, P_{18} on the side CACA of the triangle. The number of triangles that can be formed using the points P1,P2,,P18P_1, P_2, \ldots, P_{18} as vertices is:

  • A

    776776

  • B

    751751

  • C

    796796

  • D

    771771

Answer

Correct answer:B

Step-by-step solution

Counting non-collinear triples

Given: There are 1818 points on the sides of triangle ABCABC: 55 on ABAB, 66 on BCBC, and 77 on CACA.

Find: The number of triangles formed using these 1818 points as vertices.

Any triangle is formed by choosing 33 non-collinear points.

The total number of ways to choose 33 points from 1818 is

(183)=816\binom{18}{3} = 816

Now subtract the collinear selections. Since points lying on the same side are collinear, the number of such cases is

(53)+(63)+(73)=10+20+35=65\binom{5}{3} + \binom{6}{3} + \binom{7}{3} = 10 + 20 + 35 = 65

Therefore, the number of triangles is

81665=751816 - 65 = 751

Therefore, the correct option is B.

Common mistakes

  • Counting all (183)\binom{18}{3} selections as triangles. This is wrong because three points on the same side are collinear and do not form a triangle. Subtract the collinear cases from the total.

  • Using (52)+(62)+(72)\binom{5}{2} + \binom{6}{2} + \binom{7}{2} for invalid cases. This is wrong because a degenerate triangle requires 33 collinear points, not 22. Use (53),(63),(73)\binom{5}{3}, \binom{6}{3}, \binom{7}{3} instead.

  • Including points A,B,CA, B, C in the count. This is wrong because the question explicitly says only P1P_1 to P18P_{18} are used as vertices. Count only those given points.

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