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Distance and Midpoint Word Problems 1. )On a map, Julie’s house is located at (−2,5 (and Jimmy’s house is at 6,−2). How long is the direct path from Julie’s house to Jimmy’s house? 2. The Riley and Brown families decided to go to a concert together. The Riley’s live 6 miles west and 3 miles north of the concert.
Gabriela wants to find the distance between her house on one side of a lake and the beach on the other side. She marks off a third point forming a right triangle, as shown in the figure. The distances in the diagram are measured in meters. Use the Pythagorean Theorem to find the straight-line distance from Gabriela’s house to the beach.
In the problems on this page, we solved for distance and rate of travel, but you can also use the travel equation to solve for time. You can even use it to solve certain problems where you're trying to figure out the distance, rate, or time of two or more moving objects.
1. 1cm: 3 miles. On the map, the distance between two towns is 7cm. What is the actual distance between the two towns? Include units for your answer. .............................. (2) 2. The diagram shows part of a map. It shows the position of a school and a shop. The scale of the map is 1cm = 100 metres.
Scan here. Question 1: The table shows the distances, in kilometres, between some towns. (a) Write down the distance between Newtown and Greensville. (b) Write down the names of the two towns that are the most distance apart. (c) Which two towns are exactly 9 kilometres apart.
Worksheets: Places in town, printable exercises pdf, handouts, video, vocabulary exercises esl. Shops and buildings in a city.
Distance Problems traveling at different rates, word problems involving distance, rate (speed) and time, How to solve distance, rate and time problems: opposite directions, same direction and round trip, with video lessons, examples and step-by-step solutions.
