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Test: Linear Equations In Two Variables - 2 - Class 9 MCQ


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25 Questions MCQ Test - Test: Linear Equations In Two Variables - 2

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Test: Linear Equations In Two Variables - 2 - Question 1

x = 5 and y = -2 is the solution of the linear equation

Detailed Solution for Test: Linear Equations In Two Variables - 2 - Question 1

Test: Linear Equations In Two Variables - 2 - Question 2

y = 0 is the equation of

Detailed Solution for Test: Linear Equations In Two Variables - 2 - Question 2

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Test: Linear Equations In Two Variables - 2 - Question 3

How many lines pass through two points?

Detailed Solution for Test: Linear Equations In Two Variables - 2 - Question 3

Only one straight line can pass through two points because the line will connect the two points as one as the initial and another point as the ending point.

Test: Linear Equations In Two Variables - 2 - Question 4

The equation of a line parallel to the y-axis and 4 units above the origin is

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Test: Linear Equations In Two Variables - 2 - Question 5

Customers are asked to stand in the lines. If one customer is extra in a line, then there would be two less lines. If one customer is less in line, there would be three more lines. Find the total number of customers.

Detailed Solution for Test: Linear Equations In Two Variables - 2 - Question 5

Step-by-step explanation:

Customers are asked to stand in the lines. If one customer is extra in a line, then there would be two less lines. If one customer is less in line, there would be three more lines.

 

Let say There are  C customers in a Line  and total L number of lines

 

Total number of customers = ( customers in a line) * (number of Lines)

=>Total number of customers =  CL

 

If one customer is extra in a line, then there would be two less lines

=> Total number of customers = (C + 1)(L -2)

(C + 1)(L -2)  = CL

=> CL + L - 2C - 2 = CL

=> L - 2C  = 2   - eq 1

 

If one customer is less in line, there would be three more lines.

=> Total number of customers = (C - 1)(L +3)

(C - 1)(L +3) = CL

=> CL - L + 3C - 3 = CL

=> - L + 3C = 3    - eq 2

Adding eq 1 & eq 2

=> C = 5

L - 2(5) = 2

=> L = 12

customers in a Line

Total Number of customers =  CL = 5*12  = 60

Test: Linear Equations In Two Variables - 2 - Question 6

How many lines pass through one point?

Detailed Solution for Test: Linear Equations In Two Variables - 2 - Question 6

There are infinitely many lines that can pass through a single point. Here’s why

  • A point in geometry has no dimensions; it is simply a location.
  • A line is defined by two points.
  • Given one point, you can choose any other point in the plane, and a line can be drawn through these two points.
  • Since there are infinitely many points that can be chosen as the second point, there are infinitely many lines that can pass through the initial point.
Test: Linear Equations In Two Variables - 2 - Question 7

x = 0 is the equation of

Detailed Solution for Test: Linear Equations In Two Variables - 2 - Question 7
Vertical lines cannot be written in standard form because the slope is undefined. The equation of the line is given by the x-intercept of the line. In this case x=0 goes though the origin (x=0), which means this is the equation of the y-axis.
Test: Linear Equations In Two Variables - 2 - Question 8

x – 4 = 0 is the equation of

Detailed Solution for Test: Linear Equations In Two Variables - 2 - Question 8

we know that the line parallel to y axis is given by x = a

x-4 = 0

x = 4
so it is a line parallel to y axis, at a distance of 4 units from it, to the right.

Test: Linear Equations In Two Variables - 2 - Question 9

The area of the triangle formed by the line 2x + 5y = 10 and the coordinate axes is

Detailed Solution for Test: Linear Equations In Two Variables - 2 - Question 9

Test: Linear Equations In Two Variables - 2 - Question 10

For the equation 5x – 7y = 35, if y = 5, then the value of ‘x’ is

Detailed Solution for Test: Linear Equations In Two Variables - 2 - Question 10

Test: Linear Equations In Two Variables - 2 - Question 11

The graph of y = 4x will

Detailed Solution for Test: Linear Equations In Two Variables - 2 - Question 11

Test: Linear Equations In Two Variables - 2 - Question 12

Five years ago, A was thrice as old as B and ten years later, A shall be twice as old as B. What is the present age of A.       

Detailed Solution for Test: Linear Equations In Two Variables - 2 - Question 12

Given :  

1. Five years ago a was three times as old as b  

2. Ten years later a shall be twice older than b.

Assume that present age of a as x and that of b as y.

Five years ago, a was thrice as old as b  

i.e. age of a was x - 5 and age of b was 3(y-5)

x - 5 = 3 (y - 5)

x - 5 = 3y - 15

x - 3y = -15+5

x - 3y = -10  ---------(1)

Ten years later, a shall be twice as old as b  

i.e. age of a will be x + 10 and age of b will  be 2(y+10)

x + 10 = 2 (y + 10)

x + 10 = 2y + 20

x - 2y = 20-10

x - 2y = 10  ---------(2)

By elimination method, we get

x - 3y = -10  

x - 2y = 10  

 - y = -20

y = 20 i.e. present age of b

Substituting y = 20 in equation 1, we get

x - 3y = -10    

x - 3(20) = -10

x - 60 = -10

x = -10 + 60

x = 50 i.e. present age of a.

 

Test: Linear Equations In Two Variables - 2 - Question 13

Express ‘y’ in terms of ‘x’ in the equation 5x – 2y = 7.

Detailed Solution for Test: Linear Equations In Two Variables - 2 - Question 13

Test: Linear Equations In Two Variables - 2 - Question 14

The equation of a line parallel to x-axis and 3 units above the origin is

Detailed Solution for Test: Linear Equations In Two Variables - 2 - Question 14

Test: Linear Equations In Two Variables - 2 - Question 15

The graph of the linear equation x + y = 0 passes through the point

Detailed Solution for Test: Linear Equations In Two Variables - 2 - Question 15

Test: Linear Equations In Two Variables - 2 - Question 16

If (k, -3) lies on the line 3x – y = 6, then the value of ‘k’ is

Detailed Solution for Test: Linear Equations In Two Variables - 2 - Question 16

Putting x= k and y= -3 in the given equation,

i.e. 3(k) - (-3) = 6

=> 3k + 3 = 6

=> 3k = 3

Hence, k = 1

Test: Linear Equations In Two Variables - 2 - Question 17

Express ‘x’ in terms of ‘y’ in the equation 2x – 3y – 5 = 0.

Detailed Solution for Test: Linear Equations In Two Variables - 2 - Question 17

Test: Linear Equations In Two Variables - 2 - Question 18

If x = 3 and y = -2 satisfies 2x – 3y = k, then the value of ‘k’ is

Detailed Solution for Test: Linear Equations In Two Variables - 2 - Question 18

Test: Linear Equations In Two Variables - 2 - Question 19

The equation of a line parallel to x-axis and 5 units below the origin is

Detailed Solution for Test: Linear Equations In Two Variables - 2 - Question 19

Test: Linear Equations In Two Variables - 2 - Question 20

Which of the following pair is a solution of the equation 3x – 2y = 7?

Detailed Solution for Test: Linear Equations In Two Variables - 2 - Question 20

Test: Linear Equations In Two Variables - 2 - Question 21

The graph of the linear equation x + y = 0 passes through the point

Detailed Solution for Test: Linear Equations In Two Variables - 2 - Question 21

The graph of the linear equation x + y = 0 passes through the point (1,-1) because the co-ordinate of x and y axis satisfy the  given equation
x + y = 0
1 - 1 = 0
so we can say  (1,-1) is a solution of above equation

Test: Linear Equations In Two Variables - 2 - Question 22

The point of the form (a, a), where a ¹ 0 lies on

Detailed Solution for Test: Linear Equations In Two Variables - 2 - Question 22

Test: Linear Equations In Two Variables - 2 - Question 23

A fraction becomes 1/3 when 1 is subtracted from its numerator and it becomes 1/4 when 8 is added to its denominator. Find the fraction

Detailed Solution for Test: Linear Equations In Two Variables - 2 - Question 23

Test: Linear Equations In Two Variables - 2 - Question 24

For what value of ‘k’, x = 2 and y = -1 is a solution of x + 3y – k = 0?

Detailed Solution for Test: Linear Equations In Two Variables - 2 - Question 24

Test: Linear Equations In Two Variables - 2 - Question 25

Which of the following is a linear equation in two variables?

Detailed Solution for Test: Linear Equations In Two Variables - 2 - Question 25

The correct answer is C: 2x – 5y = 0.

- A linear equation in two variables can be written in the form ( ax + by = c ), where ( a ), ( b ), and ( c ) are constants.
- Option C: ( 2x - 5y = 0 ) fits the form ( ax + by = c ), making it linear.

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