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Distance Formula Test #2

In this Section:



In this section, we learn how to find the distance between two points on a coordinate plane. We begin by learning about the Pythagorean formula: a2 + b2 = c2. This formula is a relationship between the sides of a right triangle. Using our Cartesian coordinate plane, we can connect any two points (x1,y1),(x2,y2) using a line. This line represents the hypotenuse of the right triangle or leg c. After this is completed, we can draw lines to represent legs a and b. These legs are the horizontal and vertical legs of the right triangle. We can measure the lengths of leg a along with leg b, and plug the results into the Pythagorean formula. This will allow us to solve for c (the hypotenuse) or distance between our two points. The distance formula is a direct application of this process. Instead of having to pullout a coordinate plane each time, we can simply label each point and plug into the formula. It relates c (the distance between the two points) to the square root of a2 + b2. a and b here represent the horizontal leg and vertical leg in the right triangle.
Sections:

In this Section:



In this section, we learn how to find the distance between two points on a coordinate plane. We begin by learning about the Pythagorean formula: a2 + b2 = c2. This formula is a relationship between the sides of a right triangle. Using our Cartesian coordinate plane, we can connect any two points (x1,y1),(x2,y2) using a line. This line represents the hypotenuse of the right triangle or leg c. After this is completed, we can draw lines to represent legs a and b. These legs are the horizontal and vertical legs of the right triangle. We can measure the lengths of leg a along with leg b, and plug the results into the Pythagorean formula. This will allow us to solve for c (the hypotenuse) or distance between our two points. The distance formula is a direct application of this process. Instead of having to pullout a coordinate plane each time, we can simply label each point and plug into the formula. It relates c (the distance between the two points) to the square root of a2 + b2. a and b here represent the horizontal leg and vertical leg in the right triangle.