Co-ordinate Geometry
Bayani Gaba-gaba
Coordinates in a Plane: To begin with, understanding coordinates in a plane is fundamental to coordinate geometry. In a two-dimensional plane, a point is uniquely identified by its coordinates – an ordered pair (x, y). The x-coordinate represents the horizontal position, whereas the y-coordinate shows the vertical position. These coordinates are essential for plotting points, defining shapes, and solving geometric problems.
Midpoint of a Line Segment: One of the key concepts in coordinate geometry is determining the midpoint of a line segment. The midpoint M of a line segment AB is the point that divides the segment into two equal parts. To find the midpoint, we take the average of the x-coordinates and the y-coordinates of the endpoints A and B. This midpoint formula helps us locate the center point of a line segment.
Dividing a Line in a Given Ratio: Apart from finding midpoints, coordinate geometry enables us to locate points that divide a line segment in a given ratio. Given two points A(x₁, y₁) and B(x₂, y₂), we can calculate the coordinates of a point P that divides AB in the ratio m:n. By applying the section formula, we can find the precise coordinates of the dividing point.
Distance Between Two Points: In coordinate geometry, measuring the distance between two points A and B is crucial for determining lengths, perimeters, and other geometric properties. The distance formula, derived from the Pythagorean theorem, allows us to calculate the distance AB using the coordinates of the two points. This formula is applicable across various geometric contexts.
Gradient of a Line: Another significant aspect of coordinate geometry is the concept of gradient, which represents the slope of a line. The gradient is calculated as the ratio of the change in y-coordinates to the change in x-coordinates between two points on the line. It indicates the steepness of the line and is crucial for understanding the direction and inclination of lines.
Equation of a Line: Finally, deriving the equation of a line from its gradient and a point on the line is a key skill in coordinate geometry. The point-slope form or slope-intercept form can be used to find the equation of a line when the gradient and a point are given. This equation serves as a mathematical representation of the line and allows for further analysis and problem-solving.
Manufura
- Calculate the distance between two points on a plane
- Find the gradient of a line given two points on the line
- Derive the equation of a line given the gradient and a point on the line
- Calculate the midpoint of a line segment
- Understand the concept of coordinates in a plane
- Determine the coordinates of points that divide a line in a given ratio
Takardar Darasi
Nazarin Darasi
Barka da kammala darasi akan Co-ordinate Geometry. Yanzu da kuka bincika mahimman raayoyi da raayoyi, lokaci yayi da zaku gwada ilimin ku. Wannan sashe yana ba da ayyuka iri-iri Tambayoyin da aka tsara don ƙarfafa fahimtar ku da kuma taimaka muku auna fahimtar ku game da kayan.
Za ka gamu da haɗe-haɗen nau'ikan tambayoyi, ciki har da tambayoyin zaɓi da yawa, tambayoyin gajeren amsa, da tambayoyin rubutu. Kowace tambaya an ƙirƙira ta da kyau don auna fannoni daban-daban na iliminka da ƙwarewar tunani mai zurfi.
Yi wannan ɓangaren na kimantawa a matsayin wata dama don ƙarfafa fahimtarka kan batun kuma don gano duk wani yanki da kake buƙatar ƙarin karatu. Kada ka yanke ƙauna da duk wani ƙalubale da ka fuskanta; maimakon haka, ka kallesu a matsayin damar haɓaka da ingantawa.
- Calculate the midpoint of the line segment with endpoints at (3,5) and (-1,7). A. (1,6) B. (2,-1) C. (0,6) D. (7,3) Answer: A. (1,6)
- Given a line segment with endpoints A(2,1) and B(8,5), determine the coordinates of a point C that divides AB in the ratio 2:1. A. (3,2) B. (6,4) C. (5,3) D. (4,3) Answer: B. (6,4)
- Find the distance between the points P(4,3) and Q(9,7). A. √17 B. 7 C. 5 D. √29 Answer: A. √17
- If the gradient of a line is 2 and it passes through the point (1,3), what is the equation of the line in the form y = mx + c? A. y = 2x + 1 B. y = 2x - 1 C. y = 3x + 1 D. y = 3x - 2 Answer: A. y = 2x + 1
- Determine the equation of a line that passes through the points (2,3) and (4,1). A. y = -2x + 7 B. y = 2x - 1 C. y = -2x + 5 D. y = 2x - 5 Answer: C. y = -2x + 5
- Calculate the coordinates of the point that divides the line segment joining (1,5) and (3,9) internally in the ratio 3:2. A. (2,7) B. (3,8) C. (5,6) D. (4,7) Answer: A. (2,7)
- Find the gradient of the line passing through the points (5,4) and (7,9). A. 1.5 B. 2 C. 2.5 D. 3 Answer: A. 1.5
- Determine the equation of a line parallel to y = 3x + 1 passing through the point (2,5). A. y = 3x - 1 B. y = 3x + 2 C. y = -3x + 2 D. y = -3x + 1 Answer: B. y = 3x + 2
- If the midpoint of a line segment with endpoints at (-3,7) and (5,-1) is (-1,3), what are the coordinates of the other endpoint? A. (7,-7) B. (9,-11) C. (3,3) D. (-5,7) Answer: A. (7,-7)
Littattafan da ake ba da shawarar karantawa
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Educational Publications Ltd
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ISBN
978-1-2345-6789-0
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