In what ratio is the line segment joining the points -2,-3

The HTET Exam Admit Cards Out 26th November 2022. The exam dates for the HTET 2022 have been postponed. Due to the General Elections, the exam dates for the HTET have been revised. The exam will be conducted on the 3rd and 4th of December 2022 instead of the 12th and 13th of November 2022. The exam is conducted by the Board of School Education, Haryana to shortlist eligible candidates for PGT and TGT posts in Government schools across Haryana. The exam is conducted for 150 marks. The HTET Exam Pattern for Level I, Level II, and Level III exams is different. There will be no negative marking in the exam.

Mathematics is a subject that is associated with numbers and calculations. And, according to the type of calculation mathematics is divided into different branches like algebra, geometry, arithmetic, etc. Geometry is the branch of mathematics that deals with shape and their properties. Geometry that deals with a point, lines, and planes in which coordinates are involved is called coordinate geometry.

Coordinates

The location of any point on a plane can be expressed as (x, y) and these pairs are known as the coordinates, x is the horizontal value of a point on the plane. This value can also be called the x-coordinate or Abscissa, y is the vertical value of a point on the plane. This value can be called the y-coordinate or ordinate. In coordinate geometry, the point is represented on the cartesian plane.

Cartesian plane

Divided by y-axis means the point which lies on the y-axis.

The point which lies on the y-axis will always have its x-coordinate to be zero.

Section formula

If a line AB has coordinates (x1, y1) and (x2, y2) of point A and B respectively and there is a point C on line AB which divides the line in ratio m:n, then the coordinate of C can be obtained from below formula, which is known as section formula:

1. x = (mx2 + nx1) /( m + n)
2. y = (my2 + ny1) / (m + n)

Solution:

In the above problem statement, there is one line segment say AB having coordinates (2,3) and (3,7) of A and B respectively. Let’s consider a point C having coordinate (x, y) which lies on the y-axis, then the x coordinate of point C is 0, the coordinates of C can be written as (0, y).

Find the ratio in which this C point will divide the line segment AB. To find the ratio, use the section formula of coordinate geometry. Let’s assume that point C divides AB into a k:1 ratio.

As known, the x-coordinate of point C, we can use it to obtain the value of k and get the ratio. Here,

m = k, n =1

x1 = 2, y1 = 3

x2 = 3, y2 = 7

x- coordinate using section formula:

x = (mx2 + nx1) / (m + n)

After substituting the values,

x = ((k)(3) + (1)(2))/ (k +1)

0 = (3k + 2)/ (k + 1)

0 = 3k + 2

– 2 = 3k 

-2/3 = k

C divides the point in ratio k:1 = -2/3:1, therefore ratio is 2:3

A negative sign represents that point C divides the line segment externally in ratio 2:3.

Sample Problems

Question 1: In what ratio is the line segment joining the points A and B have coordinates (0, -2) and (3, 1) respectively divided by X-axis?

Solution:

Let C be the point on X-axis that divides AB in ratio k: 1. As C lies on the x-axis, the y-coordinate of the C should be 0. Therefore, the coordinate of C : (x, 0). As known as the y-coordinate of point C, we can use it to obtain the value of k and get the ratio. Here, 

m = k, n = 1

x1 = 0, y1 = -2

x2 = 3, y2 = 1

y- coordinate using section formula:

y = (my2 + ny1) / (m + n)

After substituting the values,

y = ((k)(1) + (1)(-2))/ (k +1)

0 = ( k – 2)/ (k + 1)

0 = k – 2

2 = k

2 = k

C divides the point in ratio k:1 = 2:1, therefore ratio is 2:1.

Question 2: In what ratio does a point (2,2) divides the line segment AB of which (0, 0) and (5, 5) are the coordinates of A and B respectively.

Solution:

Let (2, 2) divide AB in ratio k: 1. As known the a and y-coordinate of point, use it to obtain the value of k and get the ratio. Here,

m = k, n = 1

x1 = 0, y1 = 0

x2 = 5, y2 = 5

y- coordinate using section formula:

y = (my2 + ny1) / (m + n)

After substituting the values,

2 = ((k)(5) + (1)(0)) / (k + 1)

2 = ( 5k ) / (k+1)

2(k + 1) = 5k

2k + 2 = 5k

2 = 3k

2/3 = k

Hence, (0, 0 ) divides the point in ratio k:1 = 2/3:1, therefore ratio is 2:3.

Let AB be divided by the x-axis in the ratio :1 k at the point P.

Then, by section formula the coordination of P are

`p = ((3k-2)/(k+1) , (7k-3)/(k+1))`

But P lies on the y-axis; so, its abscissa is 0.
Therefore , `(3k-2)/(k+1) = 0`

`⇒ 3k-2 = 0 ⇒3k=2 ⇒ k = 2/3 ⇒ k = 2/3 `

Therefore, the required ratio is `2/3:1`which is same as 2 : 3
Thus, the x-axis divides the line AB in the ratio 2 : 3 at the point P.

Applying `k= 2/3,`  we get the coordinates of point.

`p (0,(7k-3)/(k+1))`

`= p(0, (7xx2/3-3)/(2/3+1))`

`= p(0, ((14-9)/3)/((2+3)/3))`

`= p (0,5/5)`

= p(0,1)

Hence, the point of intersection of AB and the x-axis is P (0,1).