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Distance Formula - Coordinate Geometry, CBSE, Class 10, Mathematics PDF Download

INTRODUCTION
In the previous class, you have learnt to locate the position of a point in a coordinate plane of two dimensions, in terms of two coordinates. You have learnt that a linear equation in two variables, of the form ax + by + c = 0 (either a ≠ 0 or b ≠ 0) can be represented graphically as a straight line in the coordinate plane of x and y coordinates. In chapter 4, you have learnt that graph of a quadratic equation ax2 + bx + c = 0, a ≠ 0 is an upward parabola if a > 0 and a downward parabola if a < 0.
In this chapter, you will learn to find the distance between two given points in terms of their coordinates and also, the coordinates of the point which divides the line segment joining the two given points internally in the given ratio.

HISTORICAL FACTS

Rene Descartes (1596-1650), the 17th century French-Mathematician, was a thinker and a philosopher. He is called the father of Co-ordinate Geometry because he unified Algebra and Geometry which were earlier two distinct branches of Mathematics. Descartes explained that two numbers called co-ordinates are used to locate the position of a point in a plane.
He was the first Mathematician who unified Algebra and Geometry, so Analytical Geometry is also called Algebraic Geometry. Cartesian plane and Cartesian Product of sets have been named after the great Mathematician.
RECALL
 Cartesian Co-ordinate system :

Coordinate Geometry, class X, NCERT CBSE, Question and Answers, Q and A, Important, with solutions, Mathematics

Let X'OX and Y'OY be two perpendicular straight lines intersecting each other at the point O. Then :
1. X'OX is called the x-axis or the axis of x.
2. Y'OY is called the y-axis or the axis of y.
3. The x-co-ordinate along OX is positive and along OX' negative, y-co-ordinate along OY (upward) is positive and along OY' (downward) is negative.
4. Both X'OX and Y'OY taken together in this order are called the rectangular axes because the angle between them is a right angle.
5. O is called the origin i.e., it is point of intersection of the axes of co-ordinates.

Co-ordinates of a point :
Coordinate Geometry, class X, NCERT CBSE, Question and Answers, Q and A, Important, with solutions, Mathematics  


6. Abscissa of a point in the plane is its perpendicular distance with proper sign from y-axis.
7. Ordinate of a point in the plane is its perpendicular distance with proper sign from x-axis.
8. The y-co-ordinate of any point on x-axis is zero.
9. The x-co-ordinate of any point on y-axis is zero.
10. Any point in the xy-plane, whose y-co-ordinate is zero, lies on x-axis.
11. Any point in the xy-plane, whose x-co-ordinate is zero, lies on y-axis.
12. The origin has coordinates (0, 0).
13. The ordinates of all points on a horizontal line which is parallel to x-axis are equal i.e. y = constant = 2.

 

Coordinate Geometry, class X, NCERT CBSE, Question and Answers, Q and A, Important, with solutions, Mathematics

14. The abscissa of all points on a vertical line which is a line parallel to y-axis are equal i.e. x = constant = 4.

Coordinate Geometry, class X, NCERT CBSE, Question and Answers, Q and A, Important, with solutions, Mathematics

Four Quadrants of a Coordinate plane :
 The rectangular axes X'OX and Y'OY divide the plane into four quadrants as below :

Distance Formula - Coordinate Geometry, CBSE, Class 10, Mathematics

 

15. Any point in the I quadrant has (+ve abscissa, +ve ordinate).
16. Any point in the II quadrant has (–ve abscissa, +ve ordinate).
17. Any point in the III quadrant has (–ve abscissa, –ve ordinate).
18. Any point in the IV quadrant has (+ve abscissa, –ve ordinate).

DISTANCE FORMULA

The distance between two points (x1, y1) and (x2, y2) in a rectangular coordinate system is equal  to

Coordinate Geometry, class X, NCERT CBSE, Question and Answers, Q and A, Important, with solutions, Mathematics  

Proof : X'OX and Y'OY are the rectangular coordinate axes. P(x1, y1) and Q(x2, y2) are the given points. We
draw PA and QB perpendiculars on the x-axis ; PC and QD perpendiculars on the y-axis.

Coordinate Geometry, class X, NCERT CBSE, Question and Answers, Q and A, Important, with solutions, Mathematics

Now, CP (produced) meets BQ in R and PR ⊥ BQ.

We find PR = AB = OB – OA = (x2 – x1)
and QR = BQ – BR = BQ – AP = OD – OC = (y2 –y1)

In right ΔPRQ, using Pythagoras theorem, we have

PQ2 = PR2 + QR2 = (x– x1)2 + (y2 – y1)2Coordinate Geometry, class X, NCERT CBSE, Question and Answers, Q and A, Important, with solutions, Mathematics PQ = Coordinate Geometry, class X, NCERT CBSE, Question and Answers, Q and A, Important, with solutions, Mathematics

We have taken the positive square root value because distance between two points is a non-negative quantity.

The distance of a point (x, y) from origin is  Coordinate Geometry, class X, NCERT CBSE, Question and Answers, Q and A, Important, with solutions, Mathematics

Proof : Let us take a point P (x, y) in the given plane of axes X'OX and Y'OY as shown in the fig. Here, the point P (x, y) is in the first quadrant but it can be taken anywhere in all the four quadrants. We have to find the distance OP, i.e., the distance of the point P from the origin O.

Coordinate Geometry, class X, NCERT CBSE, Question and Answers, Q and A, Important, with solutions, Mathematics

From the point P, draw PM ⊥ OX and PL ⊥ OY. Then we have
OM = x
MP = OL = y
OP2 = OM2 + MP2 = x2 + y2

Coordinate Geometry, class X, NCERT CBSE, Question and Answers, Q and A, Important, with solutions, Mathematics
 

 Test For Geometrical Figures :

(a) For an isosceles triangle : Prove that two sides are equal.
 (b) For an equilateral triangle : Prove that three sides are equal.
 (c) For a right-angled triangle : Prove that the sum of the squares of two sides is equal to the square of the third side.
 (d) For a square                      : Prove that all sides are equal and diagonals are equal.
 (e) For a rhombus                   : Prove that all sides are equal and diagonals are not equal.
 (f) For a rectangle                   : Prove that the opposite sides are equal and diagonals are also equal.
 (g) For a parallelogram           : Prove that the opposite sides are equal in length and diagonals are not equal.


Ex.1 Find points on x-axis which are at a distance of 5 units from the point A(–1, 4).
 Sol.
Let the point on x-axis be P(x, 0).
Distance = PA = 5 units Coordinate Geometry, class X, NCERT CBSE, Question and Answers, Q and A, Important, with solutions, Mathematics PA2 = 25
Coordinate Geometry, class X, NCERT CBSE, Question and Answers, Q and A, Important, with solutions, Mathematics (x + 1)2 + (0 – 4)2 = 25 Coordinate Geometry, class X, NCERT CBSE, Question and Answers, Q and A, Important, with solutions, Mathematics x2 + 2x + 1 + 16 = 25

Coordinate Geometry, class X, NCERT CBSE, Question and Answers, Q and A, Important, with solutions, Mathematics x2 + 2x + 17 = 25 Coordinate Geometry, class X, NCERT CBSE, Question and Answers, Q and A, Important, with solutions, Mathematicsx2 +2x – 8 = 0

 Coordinate Geometry, class X, NCERT CBSE, Question and Answers, Q and A, Important, with solutions, Mathematics

Coordinate Geometry, class X, NCERT CBSE, Question and Answers, Q and A, Important, with solutions, Mathematics

Required point on x-axis are (2, 0) and (–4, 0)

Coordinate Geometry, class X, NCERT CBSE, Question and Answers, Q and A, Important, with solutions, Mathematics

Ex.2 What point on y-axis is equidistant from the points (3, 1) and (1, 5) ?
Sol. Since the required point P(say) is on the y-axis, its abscissa (x-co-ordinate) will be zero. Let the ordinate (y-coordinate) of the point be y.

Therefore co-ordinates of the point P are : (0, y) i.e., P(0, y)

Let A and B denote the points (3, 1) and (1, 5) respectively.

PA = PB ...(given)

Squaring we get :

PA= PB2

Coordinate Geometry, class X, NCERT CBSE, Question and Answers, Q and A, Important, with solutions, Mathematics (0 – 3)2 + (y – 1)2 = (0 – 1)2 + (y – 5)2

Coordinate Geometry, class X, NCERT CBSE, Question and Answers, Q and A, Important, with solutions, Mathematics 9 + y2 + 1 – 2y = 1 + y2 + 25 – 10y
Coordinate Geometry, class X, NCERT CBSE, Question and Answers, Q and A, Important, with solutions, Mathematics y2 – 2y + 10 = y2 – 10y + 26

Coordinate Geometry, class X, NCERT CBSE, Question and Answers, Q and A, Important, with solutions, Mathematics –2y + 10y = 26 – 10 Coordinate Geometry, class X, NCERT CBSE, Question and Answers, Q and A, Important, with solutions, Mathematics8y = 16 Coordinate Geometry, class X, NCERT CBSE, Question and Answers, Q and A, Important, with solutions, Mathematicsy = 2

Coordinate Geometry, class X, NCERT CBSE, Question and Answers, Q and A, Important, with solutions, Mathematics  

The required point on y-axis equidistant from A(3, 1) and B(1, 5) is P(0, 2).


Ex.3  If Q(2, 1) and R(–3, 2) and P(x, y) lies on the right bisector of QR then show that 5x – y + 4 = 0.
 Sol.
Let P(x, y) be a point on the right bisector of QR :
Q(2, 1) and R(–3, 2) are equidistant from P(x, y), then we must have :

PQ = PR

Coordinate Geometry, class X, NCERT CBSE, Question and Answers, Q and A, Important, with solutions, MathematicsCoordinate Geometry, class X, NCERT CBSE, Question and Answers, Q and A, Important, with solutions, Mathematics

Ex.4 The vertices of a triangle are (–2, 0), (2, 3) and (1, –3). Is the triangle equilateral : isosceles or scalene ?

Sol. We denote the given point (–2, 0), (2, 3) and (1, –3) by A, B and C respectively then :
A(–2,0), B(2,3), C(1,–3)

Coordinate Geometry, class X, NCERT CBSE, Question and Answers, Q and A, Important, with solutions, Mathematics

Thus we have AB ≠ BC ≠ CA
Coordinate Geometry, class X, NCERT CBSE, Question and Answers, Q and A, Important, with solutions, Mathematics ABC is a scalene triangle

Coordinate Geometry, class X, NCERT CBSE, Question and Answers, Q and A, Important, with solutions, Mathematics

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FAQs on Distance Formula - Coordinate Geometry, CBSE, Class 10, Mathematics

1. What is the distance formula in coordinate geometry?
Ans. The distance formula in coordinate geometry is used to find the distance between two points, usually denoted as (x1, y1) and (x2, y2). The formula is derived from the Pythagorean theorem and is given as: Distance = √[(x2 - x1)^2 + (y2 - y1)^2] This formula calculates the straight-line distance between the two points on a coordinate plane.
2. How is the distance between two points calculated using the distance formula?
Ans. To calculate the distance between two points using the distance formula, you need to follow these steps: 1. Identify the coordinates of the two given points, let's say (x1, y1) and (x2, y2). 2. Substitute these values into the distance formula: Distance = √[(x2 - x1)^2 + (y2 - y1)^2]. 3. Simplify the equation by subtracting x2 from x1 and y2 from y1, and then square these differences. 4. Add the squared differences together and take the square root of the sum to obtain the distance between the two points.
3. What is the significance of the distance formula in coordinate geometry?
Ans. The distance formula in coordinate geometry is significant as it allows us to find the distance between any two points on a coordinate plane. It is widely used in various applications, including physics, engineering, and computer graphics. By calculating distances, we can determine the lengths of line segments, the perimeters of polygons, and the distances traveled by objects in motion. The distance formula is an essential tool for solving problems involving distances in the coordinate plane.
4. How is the distance formula related to the Pythagorean theorem?
Ans. The distance formula is derived from the Pythagorean theorem, which states that in a right-angled triangle, the square of the hypotenuse (the side opposite the right angle) is equal to the sum of the squares of the other two sides. In the context of the coordinate plane, the distance formula can be seen as a special case of the Pythagorean theorem. By considering the horizontal and vertical distances between two points as the lengths of the legs of a right triangle, the distance between the points can be calculated using the Pythagorean theorem.
5. Can the distance formula be used in three-dimensional space?
Ans. Yes, the distance formula can be extended to three-dimensional space. In three-dimensional coordinate geometry, the distance between two points (x1, y1, z1) and (x2, y2, z2) can be calculated using the formula: Distance = √[(x2 - x1)^2 + (y2 - y1)^2 + (z2 - z1)^2] Here, the formula considers the differences in the x, y, and z-coordinates and applies the same principles as in the two-dimensional case. This formula is helpful in determining distances between points or objects in three-dimensional space, such as in physics, computer graphics, and 3D modeling.
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