Total number of Δ are
$\begin{aligned}
& ={ }^9 \mathrm{C}_1{ }^{12} \mathrm{C}_2+{ }^9 \mathrm{C}_2{ }^{12} \mathrm{C}_1+{ }^1 \mathrm{C}_1{ }^9 \mathrm{C}_1{ }^{12} \mathrm{C}_1 \
& =594+432+108 \
& =1134
\end{aligned}$
Line L1 of slope 2 and line L2 of slope 21 intersect at the origin O . In the first quadrant, P1,P2,….P12 are 12 points on line L1 and Q1,Q2,…..Q9 are 9 points on line L2. Then the total number of triangles, that can be formed having vertices at three of the 22 points O,P1,P2,…P12, Q1,Q2,….Q9, is:
Held on 3 Apr 2025 · Verified 6 Jul 2026.
1080
1134
1026
1188
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