In the diagram, $PQ_1$, $PQ_2$, and $PQ$ are parallel and so also are $Q_1P_2$ and $Q_2P_3$ - Leaving Cert Mathematics - Question 6B - 2011
Question 6B
In the diagram, $PQ_1$, $PQ_2$, and $PQ$ are parallel and so also are $Q_1P_2$ and $Q_2P_3$.
Prove that $|Q_2|\times|P_3|=|P_2|\times|Q_1|.$
Worked Solution & Example Answer:In the diagram, $PQ_1$, $PQ_2$, and $PQ$ are parallel and so also are $Q_1P_2$ and $Q_2P_3$ - Leaving Cert Mathematics - Question 6B - 2011
Step 1
Prove that $|P_3|/|P_1| = |Q_2|/|Q_1|$
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Answer
Given that PQ1∣∣PQ2, by the properties of parallel lines and transversal, the ratios of the segments formed are equal. Thus, we can state that:
∣P1∣∣P3∣=∣Q1∣∣Q2∣
Step 2
Prove that $|P_2|/|P_1| = |Q_2|/|Q_1|$
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Answer
Similarly, since PQ∣∣PQ2 and with Q1P2 being another transversal, we imply:
∣P1∣∣P2∣=∣Q1∣∣Q2∣
Step 3
Using the results to find $|Q_2|\times|P_3|$ and $|P_2|\times|Q_1|$
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Answer
We have:
From the first step:
∣P3∣=∣P1∣×∣Q1∣∣Q2∣
So therefore:
∣Q2∣×∣P3∣=∣Q2∣×(∣P1∣×∣Q1∣∣Q2∣)=∣Q1∣∣Q2∣2∣P1∣
From the second step:
∣P2∣=∣P1∣×∣Q1∣∣Q2∣
Hence:
∣P2∣×∣Q1∣=∣Q2∣×∣P1∣
Combining these results, we arrive at:
∣Q2∣×∣P3∣=∣P2∣×∣Q1∣
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