Coordinate geometry

Coordinate geometry

Coordinate geometry
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Que. 1. Find the distances between the following pairs of points.

1. (2,3),          (4,1)

A (2,3)  (X1, Y1)                 B (4,1)  (x2,y2)

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2.  (-5,7)    ,        (-1,3)

P (-5,7)  (X1, Y1)                Q (-1,3) (x2,y2)

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3.   (a, b) ,               (-a, -b)

P (a, b)  (X1, Y1)                Q (-a, -b) (x2,y2)

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Que. 2. Find the distance between the points (0, 0) and (36, 15).

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Distance from the origin

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Que. 3. Determine whether the points (1, 5), (2, 3), and (-2, -11) are collinear.

A = (1, 5) ,     B = (2, 3)    ,      C = (-2, -11)

AB + BC = AC

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Therefore, these three points are not collinear.

Que. 4. Check whether the points (5, -2), (6, 4), and (7, -2) are the vertices of an isosceles triangle.

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A = (5, -2)     ,      B = (6, 4)  ,        C = (7, -2)

AB + BC = AC

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Therefore AB = BC

Que. 5. In a classroom, four friends are seated at points A, B, C, and D, as shown in the figure. Champa and Chameli walk into the class and, after observing for a few minutes, Champa asks Chameli, “Don’t you think ABCD is a square?” Chameli disagrees. Using the distance formula, determine which of them is correct.

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By Distance Formula,

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AB = BC = CD = AD; therefore, points A, B, C, and D form a square.

Que. 6. Name the type of quadrilateral formed by the following points (if any) and give reasons for your answer:

1. (-1, -2)   ,   (1, 0)   ,    (-1, 2)  ,    (-3, 0)

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By Distance Formula,

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AB = BC = CD = AD; therefore, ABCD is a square.

2. (-3, 5)   ,   (3, 1)   ,    (0, 3)  ,    (-1, -4)

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By Distance Formula,

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Therefore, ABCD is not a quadrilateral.

3. (4, 5)   ,   (7, 6)   ,    (4, 3)  ,    (1, 2)

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By Distance Formula,

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Hence ABCD is a parallelogram.

Que. 7. Find the point on the x-axis that is equidistant from (2, 5) and (-2, 9).

Point P is equidistant from points A and B; therefore,

AP = BP

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Coordinates of point P = (x, 0) = (-7, 0)

Que. 8. Find the value of y for which the distance between the points P(2, 3) and Q(10, y) is 10 units.

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Y2 + 6y + 73 = 100

Y2 + 6y + 73 – 100 = 0

Y2 + 6y -27 = 0

Y2 + 9y -3y -27 = 0

Y(y + 9) -3(y + 9) = 0

 (y + 9) (y – 3) = 0

Y + 9 = 0                         y – 3 = 0

Y = -9                                y = 3

Coordinates of point Q = (10, -9) Or

                                  (10, 3)

Que. 9. If Q (0, 1) is equidistant from the points P(5, -3) and R(x, 6), find the value of x. Also, find the distances QR and PR.

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41 = x2 + 25

41 – 25 = x2

16 = x2

x2  = 16

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Que. 10. Find a relationship between x and y such that the point (x, y) is equidistant from the points (3, 6) and (-3, 4).

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On squaring both sides,

X2 + y2 -6x -12y + 45 = x2 + y2 +6x -8y +25

X2 + y2 -6x -12y + 45 -x2 – y2 -6x +8y -25 = 0

-12x + 4y -20 = 0

4 (3x + y -5) = 0

3x + y -5 = 0

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