Pair of Linear Equations in Two Variables
1-Mark Questions
1
For what value of k, the following system of equations has a unique solution:
x - ky = 2 and 3x + 2y = -5
(M'15)
Step 1: Condition for unique solution
For a system of linear equations a₁x + b₁y = c₁ and a₂x + b₂y = c₂ to have a unique solution:
a₁/a₂ ≠ b₁/b₂
For a system of linear equations a₁x + b₁y = c₁ and a₂x + b₂y = c₂ to have a unique solution:
a₁/a₂ ≠ b₁/b₂
Step 2: Apply the condition
For equations: x - ky = 2 and 3x + 2y = -5
a₁ = 1, b₁ = -k, a₂ = 3, b₂ = 2
So, 1/3 ≠ -k/2
For equations: x - ky = 2 and 3x + 2y = -5
a₁ = 1, b₁ = -k, a₂ = 3, b₂ = 2
So, 1/3 ≠ -k/2
Step 3: Solve for k
1/3 ≠ -k/2
Cross-multiplying: 2 ≠ -3k
k ≠ -2/3
1/3 ≠ -k/2
Cross-multiplying: 2 ≠ -3k
k ≠ -2/3
∴ The system has a unique solution for all values of k except k = -2/3
2
For what values of m, the pair of equations 3x + my = 10 and 9x + 12y = 30 have a unique solution.
(M'16)
Step 1: Condition for unique solution
For a unique solution: a₁/a₂ ≠ b₁/b₂
For a unique solution: a₁/a₂ ≠ b₁/b₂
Step 2: Apply the condition
For equations: 3x + my = 10 and 9x + 12y = 30
a₁ = 3, b₁ = m, a₂ = 9, b₂ = 12
So, 3/9 ≠ m/12
For equations: 3x + my = 10 and 9x + 12y = 30
a₁ = 3, b₁ = m, a₂ = 9, b₂ = 12
So, 3/9 ≠ m/12
Step 3: Solve for m
1/3 ≠ m/12
Cross-multiplying: 12 ≠ 3m
m ≠ 4
1/3 ≠ m/12
Cross-multiplying: 12 ≠ 3m
m ≠ 4
∴ The system has a unique solution for all values of m except m = 4
3
In a rectangle ABCD, AB = x + y, BC = x - y, CD = 9 and AD = 3. Find the values of x and y.
(J'16)
Step 1: Properties of a rectangle
In a rectangle, opposite sides are equal.
So, AB = CD and BC = AD
In a rectangle, opposite sides are equal.
So, AB = CD and BC = AD
Step 2: Set up equations
AB = CD ⇒ x + y = 9 ...(1)
BC = AD ⇒ x - y = 3 ...(2)
AB = CD ⇒ x + y = 9 ...(1)
BC = AD ⇒ x - y = 3 ...(2)
Step 3: Solve the equations
Adding (1) and (2):
(x + y) + (x - y) = 9 + 3
2x = 12 ⇒ x = 6
Adding (1) and (2):
(x + y) + (x - y) = 9 + 3
2x = 12 ⇒ x = 6
Step 4: Find y
Substitute x = 6 in equation (1):
6 + y = 9 ⇒ y = 3
Substitute x = 6 in equation (1):
6 + y = 9 ⇒ y = 3
∴ x = 6, y = 3
4
Show that the pair of Linear Equations 7x + y = 10 and x + 7y = 10 are consistent.
(M'17)
Step 1: Check for consistency
For equations a₁x + b₁y = c₁ and a₂x + b₂y = c₂:
If a₁/a₂ ≠ b₁/b₂, the equations are consistent with a unique solution.
For equations a₁x + b₁y = c₁ and a₂x + b₂y = c₂:
If a₁/a₂ ≠ b₁/b₂, the equations are consistent with a unique solution.
Step 2: Apply the condition
For equations: 7x + y = 10 and x + 7y = 10
a₁ = 7, b₁ = 1, a₂ = 1, b₂ = 7
a₁/a₂ = 7/1 = 7
b₁/b₂ = 1/7 = 1/7
For equations: 7x + y = 10 and x + 7y = 10
a₁ = 7, b₁ = 1, a₂ = 1, b₂ = 7
a₁/a₂ = 7/1 = 7
b₁/b₂ = 1/7 = 1/7
Step 3: Compare the ratios
Since 7 ≠ 1/7, the equations are consistent with a unique solution.
Since 7 ≠ 1/7, the equations are consistent with a unique solution.
∴ The pair of equations is consistent as a₁/a₂ ≠ b₁/b₂
5
Write the Condition for the pair of linear equations in two variables to be parallel lines.
(J'17)
Condition for parallel lines:
For equations a₁x + b₁y + c₁ = 0 and a₂x + b₂y + c₂ = 0:
The lines are parallel if a₁/a₂ = b₁/b₂ ≠ c₁/c₂
For equations a₁x + b₁y + c₁ = 0 and a₂x + b₂y + c₂ = 0:
The lines are parallel if a₁/a₂ = b₁/b₂ ≠ c₁/c₂
Explanation:
When a₁/a₂ = b₁/b₂, the lines have the same slope but different intercepts, making them parallel.
When a₁/a₂ = b₁/b₂, the lines have the same slope but different intercepts, making them parallel.
∴ The condition for parallel lines is: a₁/a₂ = b₁/b₂ ≠ c₁/c₂
6
If x = a and y = b is solution for the pair of equations x - y = 2 and x + y = 4, then find the values of a and b.
(M'18)
Step 1: Set up the equations
Since (a, b) is a solution to both equations:
a - b = 2 ...(1)
a + b = 4 ...(2)
Since (a, b) is a solution to both equations:
a - b = 2 ...(1)
a + b = 4 ...(2)
Step 2: Solve the equations
Adding (1) and (2):
(a - b) + (a + b) = 2 + 4
2a = 6 ⇒ a = 3
Adding (1) and (2):
(a - b) + (a + b) = 2 + 4
2a = 6 ⇒ a = 3
Step 3: Find b
Substitute a = 3 in equation (2):
3 + b = 4 ⇒ b = 1
Substitute a = 3 in equation (2):
3 + b = 4 ⇒ b = 1
∴ a = 3, b = 1
7
Whether the following pair of Linear Equations are parallel? Justify.
6x - 4y + 10 = 0, 3x - 2y + 6 = 0.
(J'18)
Step 1: Condition for parallel lines
For parallel lines: a₁/a₂ = b₁/b₂ ≠ c₁/c₂
For parallel lines: a₁/a₂ = b₁/b₂ ≠ c₁/c₂
Step 2: Identify coefficients
For 6x - 4y + 10 = 0: a₁ = 6, b₁ = -4, c₁ = 10
For 3x - 2y + 6 = 0: a₂ = 3, b₂ = -2, c₂ = 6
For 6x - 4y + 10 = 0: a₁ = 6, b₁ = -4, c₁ = 10
For 3x - 2y + 6 = 0: a₂ = 3, b₂ = -2, c₂ = 6
Step 3: Compare ratios
a₁/a₂ = 6/3 = 2
b₁/b₂ = -4/-2 = 2
c₁/c₂ = 10/6 = 5/3
a₁/a₂ = 6/3 = 2
b₁/b₂ = -4/-2 = 2
c₁/c₂ = 10/6 = 5/3
Step 4: Check the condition
Since a₁/a₂ = b₁/b₂ = 2, but 2 ≠ 5/3
Since a₁/a₂ = b₁/b₂ = 2, but 2 ≠ 5/3
∴ Yes, the lines are parallel as a₁/a₂ = b₁/b₂ ≠ c₁/c₂
8
For what value of 't' the following pair of linear equations has no solution?
2x - ty = 5 and 3x + 2y = 11.
(M'19)
Step 1: Condition for no solution
For no solution: a₁/a₂ = b₁/b₂ ≠ c₁/c₂
For no solution: a₁/a₂ = b₁/b₂ ≠ c₁/c₂
Step 2: Identify coefficients
For 2x - ty = 5: a₁ = 2, b₁ = -t, c₁ = 5
For 3x + 2y = 11: a₂ = 3, b₂ = 2, c₂ = 11
For 2x - ty = 5: a₁ = 2, b₁ = -t, c₁ = 5
For 3x + 2y = 11: a₂ = 3, b₂ = 2, c₂ = 11
Step 3: Apply the condition
a₁/a₂ = b₁/b₂ ⇒ 2/3 = -t/2
a₁/a₂ = b₁/b₂ ⇒ 2/3 = -t/2
Step 4: Solve for t
2/3 = -t/2
Cross-multiplying: 4 = -3t
t = -4/3
2/3 = -t/2
Cross-multiplying: 4 = -3t
t = -4/3
Step 5: Verify c₁/c₂
c₁/c₂ = 5/11
Since 2/3 ≠ 5/11, the condition is satisfied.
c₁/c₂ = 5/11
Since 2/3 ≠ 5/11, the condition is satisfied.
∴ t = -4/3
9
The solution of the linear equation x + y = 5 are (1, 4), (2, 3) and (3, 2).
The solution of another linear equation x - y = 1 are (3, 2), (2, 1) and (5, 4).
Plot these points on a graph sheet and draw lines.
(May 2022)
Step 1: Identify the equations
Equation 1: x + y = 5
Equation 2: x - y = 1
Equation 1: x + y = 5
Equation 2: x - y = 1
Step 2: Find the intersection point
Solving the equations:
x + y = 5 ...(1)
x - y = 1 ...(2)
Adding (1) and (2): 2x = 6 ⇒ x = 3
Substituting in (1): 3 + y = 5 ⇒ y = 2
Solving the equations:
x + y = 5 ...(1)
x - y = 1 ...(2)
Adding (1) and (2): 2x = 6 ⇒ x = 3
Substituting in (1): 3 + y = 5 ⇒ y = 2
Step 3: Graph description
Step 4: Interpretation
The lines intersect at (3, 2), which is the common solution to both equations.
The lines intersect at (3, 2), which is the common solution to both equations.
∴ The lines intersect at (3, 2)
10
The solutions of the linear equation x + y = 8 are (1, 8), (2, 6) and (3, 5).
The solutions of another linear equation 3x + 3y = 12 are (1, 3), (3, 1) and (9, 4).
Plot these points on a graph sheet and draw lines.
Step 1: Simplify the equations
Equation 1: x + y = 8
Equation 2: 3x + 3y = 12 ⇒ Divide by 3: x + y = 4
Equation 1: x + y = 8
Equation 2: 3x + 3y = 12 ⇒ Divide by 3: x + y = 4
Step 2: Analyze the equations
Both equations have the same left-hand side (x + y) but different right-hand sides (8 and 4).
This means the lines are parallel.
Both equations have the same left-hand side (x + y) but different right-hand sides (8 and 4).
This means the lines are parallel.
Step 3: Graph description
Step 4: Interpretation
The lines are parallel and will never intersect, so the system has no solution.
The lines are parallel and will never intersect, so the system has no solution.
∴ The lines are parallel and the system has no solution
11
If the pair of linear equations 6x - 4y + 10 = 0 and 3x + ky + 6 = 0 represents parallel lines graphically, then find the value of 'k'.
(Jun'23)
Step 1: Condition for parallel lines
For parallel lines: a₁/a₂ = b₁/b₂ ≠ c₁/c₂
For parallel lines: a₁/a₂ = b₁/b₂ ≠ c₁/c₂
Step 2: Identify coefficients
For 6x - 4y + 10 = 0: a₁ = 6, b₁ = -4, c₁ = 10
For 3x + ky + 6 = 0: a₂ = 3, b₂ = k, c₂ = 6
For 6x - 4y + 10 = 0: a₁ = 6, b₁ = -4, c₁ = 10
For 3x + ky + 6 = 0: a₂ = 3, b₂ = k, c₂ = 6
Step 3: Apply the condition
a₁/a₂ = b₁/b₂ ⇒ 6/3 = -4/k
a₁/a₂ = b₁/b₂ ⇒ 6/3 = -4/k
Step 4: Solve for k
2 = -4/k
k = -4/2 = -2
2 = -4/k
k = -4/2 = -2
Step 5: Verify c₁/c₂
c₁/c₂ = 10/6 = 5/3
Since 2 ≠ 5/3, the condition is satisfied.
c₁/c₂ = 10/6 = 5/3
Since 2 ≠ 5/3, the condition is satisfied.
∴ k = -2
Linear Equations - 2 Mark Questions
1
If we multiply or divide both sides of a linear equation by a non-zero number, then the roots of that linear equation will remain the same. Is it true? If so, justify with an example.
(M'15)
Step 1: Understanding the concept
Yes, this statement is true. When we multiply or divide both sides of a linear equation by the same non-zero number, we are performing an equivalent transformation that doesn't change the solution set.
Yes, this statement is true. When we multiply or divide both sides of a linear equation by the same non-zero number, we are performing an equivalent transformation that doesn't change the solution set.
Step 2: Example to justify
Consider the equation: 2x + 4 = 10
Solution: 2x = 6 ⇒ x = 3
Consider the equation: 2x + 4 = 10
Solution: 2x = 6 ⇒ x = 3
Step 3: Multiply both sides by 2
(2x + 4) × 2 = 10 × 2 ⇒ 4x + 8 = 20
Solution: 4x = 12 ⇒ x = 3
(2x + 4) × 2 = 10 × 2 ⇒ 4x + 8 = 20
Solution: 4x = 12 ⇒ x = 3
Step 4: Divide both sides by 2
(2x + 4) ÷ 2 = 10 ÷ 2 ⇒ x + 2 = 5
Solution: x = 3
(2x + 4) ÷ 2 = 10 ÷ 2 ⇒ x + 2 = 5
Solution: x = 3
∴ Yes, the statement is true. Multiplying or dividing both sides by a non-zero number doesn't change the solution.
2
If the present ages of A and B are in ratio of 9 : 4 and after 7 years the ratio of the ages will be 5 : 3 then find their present ages.
(J'15)
Step 1: Set up variables
Let present age of A = 9x years
Let present age of B = 4x years
Let present age of A = 9x years
Let present age of B = 4x years
Step 2: Set up equation for after 7 years
After 7 years:
Age of A = 9x + 7
Age of B = 4x + 7
Ratio = (9x + 7) : (4x + 7) = 5 : 3
After 7 years:
Age of A = 9x + 7
Age of B = 4x + 7
Ratio = (9x + 7) : (4x + 7) = 5 : 3
Step 3: Form the equation
(9x + 7)/(4x + 7) = 5/3
Cross-multiplying: 3(9x + 7) = 5(4x + 7)
(9x + 7)/(4x + 7) = 5/3
Cross-multiplying: 3(9x + 7) = 5(4x + 7)
Step 4: Solve for x
27x + 21 = 20x + 35
27x - 20x = 35 - 21
7x = 14 ⇒ x = 2
27x + 21 = 20x + 35
27x - 20x = 35 - 21
7x = 14 ⇒ x = 2
Step 5: Find present ages
Age of A = 9 × 2 = 18 years
Age of B = 4 × 2 = 8 years
Age of A = 9 × 2 = 18 years
Age of B = 4 × 2 = 8 years
∴ Present ages: A = 18 years, B = 8 years
3
Solve the following pair of linear equations by substitution method: 2x - 3y = 19 and 3x - 2y = 21
(M'16)
Substitution Method:
Step 1: Express one variable in terms of the other
From first equation: 2x - 3y = 19 ⇒ 2x = 19 + 3y ⇒ x = (19 + 3y)/2
From first equation: 2x - 3y = 19 ⇒ 2x = 19 + 3y ⇒ x = (19 + 3y)/2
Step 2: Substitute in second equation
3x - 2y = 21
3[(19 + 3y)/2] - 2y = 21
(57 + 9y)/2 - 2y = 21
3x - 2y = 21
3[(19 + 3y)/2] - 2y = 21
(57 + 9y)/2 - 2y = 21
Step 3: Solve for y
Multiply throughout by 2: 57 + 9y - 4y = 42
57 + 5y = 42
5y = 42 - 57 = -15
y = -3
Multiply throughout by 2: 57 + 9y - 4y = 42
57 + 5y = 42
5y = 42 - 57 = -15
y = -3
Step 4: Find x
x = (19 + 3y)/2 = (19 + 3(-3))/2 = (19 - 9)/2 = 10/2 = 5
x = (19 + 3y)/2 = (19 + 3(-3))/2 = (19 - 9)/2 = 10/2 = 5
∴ x = 5, y = -3
4
If the measure of angles of a triangle are x°, y° and 40°, and difference between the measures of angles x° and y° is 30°, then find values of x° and y°.
(J'16)
Step 1: Use angle sum property of triangle
Sum of angles of a triangle = 180°
So, x + y + 40 = 180
x + y = 140 ...(1)
Sum of angles of a triangle = 180°
So, x + y + 40 = 180
x + y = 140 ...(1)
Step 2: Use the given difference
x - y = 30 ...(2) [Assuming x > y]
x - y = 30 ...(2) [Assuming x > y]
Step 3: Solve the equations
Adding (1) and (2):
(x + y) + (x - y) = 140 + 30
2x = 170 ⇒ x = 85
Adding (1) and (2):
(x + y) + (x - y) = 140 + 30
2x = 170 ⇒ x = 85
Step 4: Find y
From equation (1): 85 + y = 140 ⇒ y = 55
From equation (1): 85 + y = 140 ⇒ y = 55
∴ x = 85°, y = 55°
5
Given the linear equation 3x + 4y = 11, write linear equations in two variables such that their geometrical representations form parallel lines and intersecting lines.
(M'18)
Step 1: For parallel lines
For parallel lines, the ratios of coefficients of x and y should be equal but the constant term should be different.
Example: 3x + 4y = 15 (same coefficients for x and y, different constant)
For parallel lines, the ratios of coefficients of x and y should be equal but the constant term should be different.
Example: 3x + 4y = 15 (same coefficients for x and y, different constant)
Step 2: For intersecting lines
For intersecting lines, the ratios of coefficients of x and y should not be equal.
Example: 2x + 5y = 12 (different ratio of coefficients)
For intersecting lines, the ratios of coefficients of x and y should not be equal.
Example: 2x + 5y = 12 (different ratio of coefficients)
∴ Parallel lines: 3x + 4y = 15
Intersecting lines: 2x + 5y = 12
Intersecting lines: 2x + 5y = 12
6
Solve the pair of linear equations 2x + 3y = 8 and x + 2y = 5 by Elimination method.
(M'19)
Elimination Method:
Step 1: Make coefficients of one variable equal
Equations: 2x + 3y = 8 ...(1)
x + 2y = 5 ...(2)
Multiply equation (2) by 2: 2x + 4y = 10 ...(3)
Equations: 2x + 3y = 8 ...(1)
x + 2y = 5 ...(2)
Multiply equation (2) by 2: 2x + 4y = 10 ...(3)
Step 2: Eliminate x
Subtract equation (1) from equation (3):
(2x + 4y) - (2x + 3y) = 10 - 8
y = 2
Subtract equation (1) from equation (3):
(2x + 4y) - (2x + 3y) = 10 - 8
y = 2
Step 3: Find x
Substitute y = 2 in equation (2):
x + 2(2) = 5 ⇒ x + 4 = 5 ⇒ x = 1
Substitute y = 2 in equation (2):
x + 2(2) = 5 ⇒ x + 4 = 5 ⇒ x = 1
∴ x = 1, y = 2
7
For what values of m the following system of equations will have no solution? Why?
mx + 4y = 10 and 9x + 12y = 30 (J'19)
mx + 4y = 10 and 9x + 12y = 30 (J'19)
Step 1: Condition for no solution
For no solution: a₁/a₂ = b₁/b₂ ≠ c₁/c₂
For no solution: a₁/a₂ = b₁/b₂ ≠ c₁/c₂
Step 2: Identify coefficients
For mx + 4y = 10: a₁ = m, b₁ = 4, c₁ = 10
For 9x + 12y = 30: a₂ = 9, b₂ = 12, c₂ = 30
For mx + 4y = 10: a₁ = m, b₁ = 4, c₁ = 10
For 9x + 12y = 30: a₂ = 9, b₂ = 12, c₂ = 30
Step 3: Apply the condition
a₁/a₂ = b₁/b₂ ⇒ m/9 = 4/12 = 1/3
m/9 = 1/3 ⇒ m = 3
a₁/a₂ = b₁/b₂ ⇒ m/9 = 4/12 = 1/3
m/9 = 1/3 ⇒ m = 3
Step 4: Check c₁/c₂
c₁/c₂ = 10/30 = 1/3
Since a₁/a₂ = b₁/b₂ = c₁/c₂ = 1/3, the lines are coincident, not parallel.
c₁/c₂ = 10/30 = 1/3
Since a₁/a₂ = b₁/b₂ = c₁/c₂ = 1/3, the lines are coincident, not parallel.
Step 5: Conclusion
For no solution, we need a₁/a₂ = b₁/b₂ ≠ c₁/c₂
But here when m = 3, a₁/a₂ = b₁/b₂ = c₁/c₂
So there is no value of m for which the system has no solution.
For no solution, we need a₁/a₂ = b₁/b₂ ≠ c₁/c₂
But here when m = 3, a₁/a₂ = b₁/b₂ = c₁/c₂
So there is no value of m for which the system has no solution.
∴ There is no value of m for which the system has no solution.
8
Solve 2x + y = 5 and 5x + 3y = 11.
(May 2022)
Step 1: Use substitution method
From first equation: 2x + y = 5 ⇒ y = 5 - 2x
From first equation: 2x + y = 5 ⇒ y = 5 - 2x
Step 2: Substitute in second equation
5x + 3y = 11
5x + 3(5 - 2x) = 11
5x + 15 - 6x = 11
5x + 3y = 11
5x + 3(5 - 2x) = 11
5x + 15 - 6x = 11
Step 3: Solve for x
-x + 15 = 11
-x = 11 - 15 = -4
x = 4
-x + 15 = 11
-x = 11 - 15 = -4
x = 4
Step 4: Find y
y = 5 - 2x = 5 - 2(4) = 5 - 8 = -3
y = 5 - 2x = 5 - 2(4) = 5 - 8 = -3
∴ x = 4, y = -3
9
Solve 3x + 2y = 11 and 2x + 3y = 4.
(Aug 2022)
Elimination Method:
Step 1: Make coefficients of y equal
Equations: 3x + 2y = 11 ...(1)
2x + 3y = 4 ...(2)
Multiply (1) by 3: 9x + 6y = 33 ...(3)
Multiply (2) by 2: 4x + 6y = 8 ...(4)
Equations: 3x + 2y = 11 ...(1)
2x + 3y = 4 ...(2)
Multiply (1) by 3: 9x + 6y = 33 ...(3)
Multiply (2) by 2: 4x + 6y = 8 ...(4)
Step 2: Eliminate y
Subtract (4) from (3):
(9x + 6y) - (4x + 6y) = 33 - 8
5x = 25 ⇒ x = 5
Subtract (4) from (3):
(9x + 6y) - (4x + 6y) = 33 - 8
5x = 25 ⇒ x = 5
Step 3: Find y
Substitute x = 5 in equation (1):
3(5) + 2y = 11 ⇒ 15 + 2y = 11 ⇒ 2y = -4 ⇒ y = -2
Substitute x = 5 in equation (1):
3(5) + 2y = 11 ⇒ 15 + 2y = 11 ⇒ 2y = -4 ⇒ y = -2
∴ x = 5, y = -2
Linear Equations - 4 Marks Solutions
1
Draw a graph for the following pair of linear equations in two variables and find their solution from the graph: 2x + y = 5 and 3x – 2y = 4
(M'15)
Graphical Method:
Step 1: Find points for 2x + y = 5
When x = 0: 2(0) + y = 5 → 0 + y = 5 → y = 5 → Point: (0, 5)
When x = 1: 2(1) + y = 5 → 2 + y = 5 → y = 3 → Point: (1, 3)
When x = 2: 2(2) + y = 5 → 4 + y = 5 → y = 1 → Point: (2, 1)
Step 2: Find points for 3x - 2y = 4
When x = 0: 3(0) - 2y = 4 → 0 - 2y = 4 → -2y = 4 → y = -2 → Point: (0, -2)
When x = 2: 3(2) - 2y = 4 → 6 - 2y = 4 → -2y = -2 → y = 1 → Point: (2, 1)
When x = 4: 3(4) - 2y = 4 → 12 - 2y = 4 → -2y = -8 → y = 4 → Point: (4, 4)
∴ The lines intersect at point (2, 1), so the solution is x = 2, y = 1
2
Draw the graphs of the following equations 3x – y – 2 = 0 and 2x + y – 8 = 0 on the graph paper.
i) Write down the co-ordinates of the point of intersection of the equations.
ii) Find the area of the triangle formed by the lines and the X-axis. (J'15)
i) Write down the co-ordinates of the point of intersection of the equations.
ii) Find the area of the triangle formed by the lines and the X-axis. (J'15)
Step 1: Find points for 3x - y - 2 = 0
When x = 0: 3(0) - y - 2 = 0 → 0 - y - 2 = 0 → -y = 2 → y = -2 → Point: (0, -2)
When x = 1: 3(1) - y - 2 = 0 → 3 - y - 2 = 0 → 1 - y = 0 → y = 1 → Point: (1, 1)
When x = 2: 3(2) - y - 2 = 0 → 6 - y - 2 = 0 → 4 - y = 0 → y = 4 → Point: (2, 4)
Step 2: Find points for 2x + y - 8 = 0
When x = 0: 2(0) + y - 8 = 0 → 0 + y - 8 = 0 → y = 8 → Point: (0, 8)
When x = 2: 2(2) + y - 8 = 0 → 4 + y - 8 = 0 → y - 4 = 0 → y = 4 → Point: (2, 4)
When x = 4: 2(4) + y - 8 = 0 → 8 + y - 8 = 0 → y = 0 → Point: (4, 0)
Step 3: Find intersection point
The lines intersect at (2, 4)
Step 4: Find area of triangle with X-axis
For 3x - y - 2 = 0: When y = 0, 3x - 0 - 2 = 0 → 3x = 2 → x = 2/3 ≈ 0.67
For 2x + y - 8 = 0: When y = 0, 2x + 0 - 8 = 0 → 2x = 8 → x = 4
Base = 4 - 2/3 = 10/3
Height = y-coordinate of intersection point = 4
Area = 1/2 × base × height = 1/2 × (10/3) × 4 = 20/3 ≈ 6.67 sq units
∴ i) Intersection point: (2, 4)
ii) Area of triangle: 20/3 sq units ≈ 6.67 sq units
ii) Area of triangle: 20/3 sq units ≈ 6.67 sq units
3
Draw the graph for the equations 2x – 3y = 5 and 4x – 6y = 15 on the graph paper and check whether they are consistent or not.
(J'15)
Step 1: Find points for 2x - 3y = 5
When x = 1: 2(1) - 3y = 5 → 2 - 3y = 5 → -3y = 3 → y = -1 → Point: (1, -1)
When x = 4: 2(4) - 3y = 5 → 8 - 3y = 5 → -3y = -3 → y = 1 → Point: (4, 1)
When x = 7: 2(7) - 3y = 5 → 14 - 3y = 5 → -3y = -9 → y = 3 → Point: (7, 3)
Step 2: Find points for 4x - 6y = 15
When x = 3: 4(3) - 6y = 15 → 12 - 6y = 15 → -6y = 3 → y = -0.5 → Point: (3, -0.5)
When x = 6: 4(6) - 6y = 15 → 24 - 6y = 15 → -6y = -9 → y = 1.5 → Point: (6, 1.5)
When x = 9: 4(9) - 6y = 15 → 36 - 6y = 15 → -6y = -21 → y = 3.5 → Point: (9, 3.5)
Step 3: Check consistency
For equations a₁x + b₁y = c₁ and a₂x + b₂y = c₂:
If a₁/a₂ = b₁/b₂ ≠ c₁/c₂, then lines are parallel and inconsistent
Here: 2/4 = 1/2, -3/-6 = 1/2, 5/15 = 1/3
Since 1/2 = 1/2 ≠ 1/3, the lines are parallel
∴ The equations are inconsistent (no solution) as the lines are parallel
4
Draw the graph for the following pair of linear equations in two variables and find their solution from the graph. 3x– 2y = 2 and 2x + y = 6
(M'16)
Step 1: Find points for 3x - 2y = 2
When x = 0: 3(0) - 2y = 2 → 0 - 2y = 2 → -2y = 2 → y = -1 → Point: (0, -1)
When x = 2: 3(2) - 2y = 2 → 6 - 2y = 2 → -2y = -4 → y = 2 → Point: (2, 2)
When x = 4: 3(4) - 2y = 2 → 12 - 2y = 2 → -2y = -10 → y = 5 → Point: (4, 5)
Step 2: Find points for 2x + y = 6
When x = 0: 2(0) + y = 6 → 0 + y = 6 → y = 6 → Point: (0, 6)
When x = 2: 2(2) + y = 6 → 4 + y = 6 → y = 2 → Point: (2, 2)
When x = 3: 2(3) + y = 6 → 6 + y = 6 → y = 0 → Point: (3, 0)
∴ The lines intersect at point (2, 2), so the solution is x = 2, y = 2
5
Draw the graph for the equations 2x – y – 4 = 0 and x + y = 0 on the graph paper and check whether they are consistent or not.
(J'16)
Step 1: Find points for 2x - y - 4 = 0
When x = 0: 2(0) - y - 4 = 0 → 0 - y - 4 = 0 → -y = 4 → y = -4 → Point: (0, -4)
When x = 2: 2(2) - y - 4 = 0 → 4 - y - 4 = 0 → -y = 0 → y = 0 → Point: (2, 0)
When x = 4: 2(4) - y - 4 = 0 → 8 - y - 4 = 0 → 4 - y = 0 → y = 4 → Point: (4, 4)
Step 2: Find points for x + y = 0
When x = -2: -2 + y = 0 → y = 2 → Point: (-2, 2)
When x = 0: 0 + y = 0 → y = 0 → Point: (0, 0)
When x = 2: 2 + y = 0 → y = -2 → Point: (2, -2)
Step 3: Find intersection point algebraically
From x + y = 0, we have y = -x
Substitute in 2x - y - 4 = 0: 2x - (-x) - 4 = 0 → 2x + x - 4 = 0 → 3x = 4 → x = 4/3
Then y = -4/3
∴ The equations are consistent (have a unique solution) and intersect at (4/3, -4/3)
6
Draw the graph of 2x + y = 6 and 2x – y + 2 = 0 and find the solution from the graph.
(M'17)
Step 1: Find points for 2x + y = 6
When x = 0: 2(0) + y = 6 → 0 + y = 6 → y = 6 → Point: (0, 6)
When x = 1: 2(1) + y = 6 → 2 + y = 6 → y = 4 → Point: (1, 4)
When x = 3: 2(3) + y = 6 → 6 + y = 6 → y = 0 → Point: (3, 0)
Step 2: Find points for 2x - y + 2 = 0
When x = 0: 2(0) - y + 2 = 0 → 0 - y + 2 = 0 → -y = -2 → y = 2 → Point: (0, 2)
When x = 1: 2(1) - y + 2 = 0 → 2 - y + 2 = 0 → 4 - y = 0 → y = 4 → Point: (1, 4)
When x = 2: 2(2) - y + 2 = 0 → 4 - y + 2 = 0 → 6 - y = 0 → y = 6 → Point: (2, 6)
∴ The lines intersect at point (1, 4), so the solution is x = 1, y = 4
7
Show that the following pair of equations are consistent and show them graphically: x + 3y = 6 and 2x– 3y = 12
(J'17)
Step 1: Check consistency
For equations a₁x + b₁y = c₁ and a₂x + b₂y = c₂:
If a₁/a₂ ≠ b₁/b₂, then lines intersect and are consistent
Here: 1/2 = 0.5, 3/-3 = -1
Since 0.5 ≠ -1, the lines intersect and are consistent
Step 2: Find points for x + 3y = 6
When x = 0: 0 + 3y = 6 → 3y = 6 → y = 2 → Point: (0, 2)
When x = 3: 3 + 3y = 6 → 3y = 3 → y = 1 → Point: (3, 1)
When x = 6: 6 + 3y = 6 → 3y = 0 → y = 0 → Point: (6, 0)
Step 3: Find points for 2x - 3y = 12
When x = 0: 2(0) - 3y = 12 → 0 - 3y = 12 → -3y = 12 → y = -4 → Point: (0, -4)
When x = 3: 2(3) - 3y = 12 → 6 - 3y = 12 → -3y = 6 → y = -2 → Point: (3, -2)
When x = 6: 2(6) - 3y = 12 → 12 - 3y = 12 → -3y = 0 → y = 0 → Point: (6, 0)
∴ The equations are consistent (have a unique solution) and intersect at (6, 0)
8
Solve the following pair of linear equations by graph method. 2x + y = 6 and 2x – y + 2 = 0.
(J'18)
Step 1: Find points for 2x + y = 6
When x = 0: 2(0) + y = 6 → 0 + y = 6 → y = 6 → Point: (0, 6)
When x = 1: 2(1) + y = 6 → 2 + y = 6 → y = 4 → Point: (1, 4)
When x = 3: 2(3) + y = 6 → 6 + y = 6 → y = 0 → Point: (3, 0)
Step 2: Find points for 2x - y + 2 = 0
When x = 0: 2(0) - y + 2 = 0 → 0 - y + 2 = 0 → -y = -2 → y = 2 → Point: (0, 2)
When x = 1: 2(1) - y + 2 = 0 → 2 - y + 2 = 0 → 4 - y = 0 → y = 4 → Point: (1, 4)
When x = 2: 2(2) - y + 2 = 0 → 4 - y + 2 = 0 → 6 - y = 0 → y = 6 → Point: (2, 6)
∴ The lines intersect at point (1, 4), so the solution is x = 1, y = 4
9
Solve the equations by graphically 3x + 4y = 10 and 4x – 3y = 5.
(M'19)
Step 1: Find points for 3x + 4y = 10
When x = 0: 3(0) + 4y = 10 → 0 + 4y = 10 → 4y = 10 → y = 2.5 → Point: (0, 2.5)
When x = 2: 3(2) + 4y = 10 → 6 + 4y = 10 → 4y = 4 → y = 1 → Point: (2, 1)
When x = 4: 3(4) + 4y = 10 → 12 + 4y = 10 → 4y = -2 → y = -0.5 → Point: (4, -0.5)
Step 2: Find points for 4x - 3y = 5
When x = 0: 4(0) - 3y = 5 → 0 - 3y = 5 → -3y = 5 → y = -5/3 ≈ -1.67 → Point: (0, -1.67)
When x = 2: 4(2) - 3y = 5 → 8 - 3y = 5 → -3y = -3 → y = 1 → Point: (2, 1)
When x = 4: 4(4) - 3y = 5 → 16 - 3y = 5 → -3y = -11 → y = 11/3 ≈ 3.67 → Point: (4, 3.67)
∴ The lines intersect at point (2, 1), so the solution is x = 2, y = 1
10
Sum of the present ages of two friends are 23 years, five years ago product of their ages was 42. Find their ages 5 years hence.
(M'19)
Step 1: Set up equations
Let present ages be x and y years
x + y = 23 ...(1)
Five years ago: (x-5)(y-5) = 42 ...(2)
Step 2: Expand equation (2)
(x-5)(y-5) = 42
xy - 5x - 5y + 25 = 42
xy - 5(x+y) = 17
From (1): x+y = 23, so
xy - 5(23) = 17
xy - 115 = 17
xy = 132
Step 3: Solve the system
We have: x + y = 23 and xy = 132
This forms a quadratic: t² - 23t + 132 = 0
Discriminant = 23² - 4(1)(132) = 529 - 528 = 1
t = [23 ± √1]/2 = [23 ± 1]/2
t = 12 or t = 11
Step 4: Find ages 5 years hence
Present ages: 12 and 11 years
Ages 5 years hence: 17 and 16 years
∴ Their ages 5 years hence will be 17 years and 16 years
11
Draw the graph of x + y = 11 and x - y = 5. Find the solution of the pair of linear equations
(J'19)
Step 1: Find points for x + y = 11
When x = 0: 0 + y = 11 → y = 11 → Point: (0, 11)
When x = 5: 5 + y = 11 → y = 6 → Point: (5, 6)
When x = 11: 11 + y = 11 → y = 0 → Point: (11, 0)
Step 2: Find points for x - y = 5
When x = 0: 0 - y = 5 → -y = 5 → y = -5 → Point: (0, -5)
When x = 5: 5 - y = 5 → -y = 0 → y = 0 → Point: (5, 0)
When x = 10: 10 - y = 5 → -y = -5 → y = 5 → Point: (10, 5)
∴ The lines intersect at point (8, 3), so the solution is x = 8, y = 3
