Sometimes, in mathematical problems, we encounter some unknown figures which are only based upon imagination. There are various predefined shapes and figures in geometry. Note: Geometry proofs in coordinate plane connect algebra and geometry. Therefore, following these points, we can easily do coordinate geometry proofs. We shall also keep in mind a few properties of the basic shapes like the rectangle, parallelogram, circle, rhombus, etc to use them further. We shall remember and use the basic formulae of coordinate geometry such as the distance formula, midpoint formula, section formula, etc to prove the more complex statements given in mathematical problems. While plotting points on the cartesian plane, we must carefully mark the points and not get confused with the sign of the axis about which the point is to be marked. It consists of four quadrants each of which has a different combination of positive and negative values of the x-axis and the y-axis. The geometry proofs are done on a plane known as the cartesian plane. There are certain things which are to be taken care of while doing geometry proofs. Thus, we shall look into what are the requirements of implementing geometry proofs. Coordinate proofs have been given variables for coordinates instead of numerical values so that they can be used for any related set of values. Hint: Geometry proofs or coordinate proofs are very prevalent because they help us to understand a particular problem in many ways.
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