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Q&A for How to Find the Distance Between Two Points
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QuestionHow do I find the horizontal distance between (3, 4) and (8, 4)?Community AnswerSubtract 3 from 8 since both are at 4 on the y axis. So distance is: 8-3=5.
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QuestionWhat is the distance from the x-axis to (7,-2)?Community AnswerThis is an ambiguous question. I will assume you mean the shortest distance. Then, your second point will be (7,0) because the line that goes through (7,0) and (7,-2) is perpendicular to the x-axis. So your answer is 2.
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QuestionWhat is the distance between (2, 3) and (-8,12)?Community AnswerUsing the distance formula shown in the above article, find the horizontal distance between the two points by subtracting (-8) from 2, which is 10. Then find the vertical distance between the points by subtracting 12 from 3, which is -9. We then add together the squares of those two distances: 3² + (-9)² = 9 + 81 = 90. Find the square root of that sum: √90 = 9.49. That's the distance (in "units") between the two points.
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QuestionWhere will I need this besides my test?DonaganTop AnswererIt's not likely you will use this technique in a real-life application. It is a way to practice using graphs and the Pythagorean theorem.
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QuestionWhen both points have negative X and Y positions, how do I fill in the formula?Community AnswerYou still fill in the formula the same way, remembering that the negative signs are part of the formula. The negative numbers squared become positive, so there should not be any problem in the end.
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QuestionWhat is the midpoint of 45, 972 and 66, 191?DonaganTop AnswererThe x-coordinate of the midpoint is half the distance between 45 and 66: 66 - 45 = 21. Half of 21 is 10½. Add 10½ to 45 to get the midpoint's x-coordinate, 55½. The y-coordinate of the midpoint is half the distance between 972 and 191: 972 - 191 = 781. Half of 781 is 390½. Add 390½ to 191 to get the midpoint's y-coordinate, 581½. So the midpoint is (55½, 581½).
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QuestionIn finding the distance between two points (horizontally or vertically), is the formula used either Xsub1 -Xsub2, or Xsub2 - Xsub1?DonaganTop AnswererBecause all you care about is distance, not direction, you can subtract in either order. You just want to know how far apart the two points are, and subtracting in either direction will tell you. That's true of both the horizontal and vertical directions.
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QuestionWhat is the distance between (4,6) and (-5,8)?Community AnswerLet (x_1, y_1) = (4,6) and (x_2, y_2) = (-5,8). The distance formula is sqrt((x_2 - x_1)^2 + (y_2 - y_1)^2). Simply plug in to the formula, and you obtain sqrt(85).
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QuestionWhat is the distance between (2, -4) and (-5, 3)?Community AnswerThe distance formula is sqrt((x_2 - x_1)^2 + (y_2 - y_1)^2). 3-(-4)=7-5-2=-7 (7)^2=49 (-7)^2=49 sqrt(49+49)=9.8.
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QuestionIf the distance between two point is 7 and the points are 5,2 and x,4, how do I find the value of x?Community AnswerThe distance formula is sqrt((x_2 - x_1)^2 + (y_2 - y_1)^2). 7= sqrt((x-5)^2 + (4-2)^2)....> Square both side....>49=(x-5)^2 + (4-2)^2 .=>49=(x-5)^2+4=>49-4=(x-5)^2 =>45=(x-5)^2=>sqrt(45)=(x-5)=>x=6.7-5=>x=1.7
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QuestionHow can I find the distance between two coordinates without graphing and counting the spaces between?DonaganTop AnswererThe distance formula shown above does not require graphing or counting.
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QuestionIs there any other method of finding the distance between two points besides the distance formula?DonaganTop AnswererIf the two points are defined only as being on a coordinate plane, the distance formula is the only way to find the distance between them. If they are defined differently, however, (as the vertices of a geometrical figure, for instance, or as the center of a circle and a point on that circle's circumference) there would be several other ways to find the distance between them.
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QuestionHow do I find the distance between more than two points?DonaganTop AnswererYou don't. Distance is a measurement of the space between two points only.
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QuestionWhat is the distance between -2 and 4?DonaganTop AnswererOn a number line there is a distance of 6 between -2 and +4.
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QuestionWhy is math so hard?DonaganTop AnswererIt's "hard" because it requires a certain kind of mental maneuvering which can be learned and practiced but which does not come naturally to many people. Others who are mentally "wired" in a particular way find math to be interesting and even fun.
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QuestionWhat if your problem has negative numbers?DonaganTop AnswererSubtracting a negative number is the same as adding a positive number. For example, 5 - (-4) = 5 + 4 = 9. This means that there are 9 units of distance between 5 and -4.
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QuestionFind the distance between two points, the original and the point (6,7).DonaganTop AnswererThe origin is (0,0), so the distance from there to (6,7) is √(6² + 7²) = √(36 + 49) = √85 = 9.22.
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QuestionIs there a shorter version of this formula or a short cut out there?DonaganTop AnswererNo. That formula is as short and simple as it gets.
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QuestionIf one of my values is a decimal, would the problem work the same?DonaganTop AnswererYes, exactly the same, although the decimal makes it slightly more difficult.
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QuestionIs the distance between (-4, 2) and (4,-6) 11.3?Community AnswerYes, that answer is correct.
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