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Question
Jamil lives 4 kilometers due west of Rehana's house. Ajit lives 6 kilometers due north of Rehana's house and 4 kilometers due west of john's house. What is the straight line distance in kilometers from Jamil's house to John's house?
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ANSWER : 4
Descrption
<p>Let's denote:<br>- J as the location of Jamil's house,<br>- R as the location of Rehana's house,<br>- A as the location of Ajit's house, and<br>- H as the location of John's house.</p><p>Given:<br>- Jamil lives 4 kilometers due west of Rehana's house.<br>- Ajit lives 6 kilometers due north of Rehana's house and 4 kilometers due west of John's house.</p><p>The distance from Rehana's house to Ajit's house is 6 kilometers north, and then 4 kilometers west, forming a right triangle.</p><p>Now, applying the Pythagorean theorem.</p><p><img class="image_resized" style="width:21.92%;" src="data:image/png;base64,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"></p><p>So, the straight-line distance from Jamil's house to John's house is 10 kilometers.</p>
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