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This page provides a list of educational videos related to The Distance Formula. You can also use this page to find sample questions, apps, worksheets, lessons , infographics and presentations related to The Distance Formula.
Distance formula
By Khan Academy
How to find the distance between lines using the Pythagorean Formula
Algebra 2: Midpoint and Distance Formula
By Educator
Video about finding the distance and midpoints using formulas.
The Distance Formula and Finding the Distance Between Two Points - Example 2
By PatrickJMT
The Distance Formula and Finding the Distance Between Two Points - Example 2
Algebra - Distance Formula
By yaymath
Have you ever sat in on a math lesson conducted UPSIDE DOWN?! Well here's your chance... gravity is taking a back seat for 20 minutes while we YAY MATH our way to learning the distance formula. Visit yaymath.org Videos copyright (c) Yay Math
Distance formula | Analytic geometry | Geometry | Khan Academy
By Khan Academy
In this video, Sal Khan, explains how to how to find the distance between lines using the Pythagorean Formula. Mr. Khan uses the Paint Program (with different colors) to illustrate his points. Sal Khan is the recipient of the 2009 Microsoft Tech Award in Education.
Distance formula | Analytic geometry | Geometry | Khan Academy
By Khan Academy
In this video, Sal Khan, explains how to how to find the distance between lines using the Pythagorean Formula. Mr. Khan uses the Paint Program (with different colors) to illustrate his points. Sal Khan is the recipient of the 2009 Microsoft Tech Award in Education.
Distance formula | Analytic geometry | Geometry | Khan Academy
By Khan Academy
In this video, Sal Khan, explains how to how to find the distance between lines using the Pythagorean Formula. Mr. Khan uses the Paint Program (with different colors) to illustrate his points. Sal Khan is the recipient of the 2009 Microsoft Tech Award in Education.
01 - The Distance Formula, Pythagorean Theorem & Midpoint Formula - Part 1 (Calculate Distance)
By Math and Science
Quality Math And Science Videos that feature step-by-step example problems!
Geometry: 1-6 Finding Midpoint & Distance in the Coordinate Plane
By Sir Tyler Tarver
http://www.tylertarver.com Develop and apply the formula for midpoint. Use the Distance formula and the pythagorean theorem to find the distance between points. Would you dance if I asked you to dance?
Finding average speed or rate | Ratios, proportions, units, and rates | Pre-Algebra | Khan Academy
By Khan Academy
Using the formula for finding distance we can determine Usian Bolt's average speed, or rate, when he broke the world record in 2009 in the 100m. Watch.
Deriving the Equation of a Parabola in General
By Khan Academy
Watch this video to get a better sense for how a parabola is defined geometrically, and how we can use the distance formula to help us find the equation of the parabola based on that definition. Remember, we need two distances to be the same for any point on the parabola. The distance from the point on the parabola to the focus must be the SAME as the distance from the point on the parabola to the directrix.
Intermediate Algebra | MathHelp.com
By MathHelp.com
This lesson covers motion problems. Students learn to solve advanced "motion" word problems -- for example, riding a bike to pick up a car and driving back, or biking part of a trip and taking a boat the rest of the trip. Students should first draw a diagram to represent the relationship between the distances involved in the problem, then set up a chart based on the formula rate times time = distance. The chart is then used to set up the equation.
Motion Problems | MathHelp.com
By MathHelp.com
This lesson covers mapping diagrams. Students learn that if the x-coordinate is different in each ordered pair in a given relation, then the relation is a function. Students also learn to use mapping diagrams and the vertical line test to determine if a relation is a function.
Midpoint Formula | MathHelp.com
By MathHelp.com
In this example, we’re asked to find the distance between the points (1, 2) and (5, -1), so we use the distance formula, which states that the distance between two points is equal to the square root of parentheses x2 minus x1 squared + parentheses y2 - y1 squared. Our first point, (1, 2), represents (x1, y1), and our second point, (5, -1), represents (x2, y2). So plugging the given information into the formula, we have the square root of parentheses x2, which is 5, minus x1, which is 1, squared, minus parentheses y2, which is -1, minus y1, which is 2, squared. Next, we simplify inside the parentheses. 5 – 1 is 4, and – 1 – 2 is -3, so we have the square root of 4 squared plus -3 squared. Next, 4 squared is 16, and -3 squared is positive 9, so we have the square root of 16 plus 9, or the square root of 25, which is 5. So the distance between the points (1, 2) and (5, -1) is 5.