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Question
In ΔAВC; D and E are two points on AB such that AD = DE = EB. Through D and E, lines are drawn parallel to AC meet BC at N and M, respectively. Through N and M, lines are drawn parallel to AB meet AC at Q and P. Prove that AP = PQ = CQ.
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Solution
Given: In triangle ABC, points D and E lie on AB with AD = DE = EB.
Through D and E lines are drawn parallel to AC meeting BC at N and M respectively.
Through N and M lines are drawn parallel to AB meeting AC at Q and P respectively.
To Prove: AP = PQ = CQ.
Proof (Step-wise):
1. From AD = DE = EB we have
`AD = 1/3 AB`
`AE = 2/3 AB`
`EB = 1/3 AB`
So, D divides AB at `1/3` from A, E at `2/3` from A.
2. Consider a line through D parallel to AC meeting BC at N.
Since DN || AC, triangles DBN and BAC are similar.
Hence, `(BN)/(BC) = (DB)/(BA)`.
But DB = AB – AD
= ` 2/3 AB`
So, `(BN)/(BC) = 2/3`.
Therefore, CN = BC – BN
= `1/3 BC`
3. Similarly, the line through E parallel to AC meets BC at M.
From EM || AC we get
`(BM)/(BC) = (EB)/(BA) = 1/3`
So, `BM = 1/3 BC` and hence `CM = 2/3 BC`.
4. Now consider the line through N parallel to AB meeting AC at Q.
Because NQ || AB, triangles CNQ and CAB are similar.
So, `(CQ)/(CA) = (CN)/(CB)`.
From step 2,
`(CN)/(CB) = 1/3`
Hence, `CQ = 1/3 CA`.
5. Likewise, the line through M parallel to AB meets AC at P.
Since MP || AB, triangles CMP and CAB are similar.
So, `(CP)/(CA) = (CM)/(CB)`.
From step 3,
`(CM)/(CB) = 2/3`
Hence, `CP = 2/3 CA`.
Therefore, AP = CA − CP
= `CA - 2/3 CA`
= `1/3 CA`
6. Finally, on AC we have AP + PQ + QC = AC.
Substituting `AP = 1/3 CA` and `CQ = 1/3 CA`
Gives PQ = AC – AP – CQ
= `CA - 1/3 CA - 1/3 CA`
= `1/3 CA`
7. Therefore, AP = PQ = CQ = `1/3` CA, as required.
AP = PQ = CQ; the points P and Q trisect AC.
