Class 11 RD Sharma Solutions - Chapter 23 The Straight Lines- Exercise 23.13

Question 1: Find the angles between each of the following pairs of straight lines.

(i) 3x+y+12=0 and x+2y-1=0

Solution:

Given equations of lines are,3x + y + 12 = 0, x + 2y -1 = 0

Letm₁ andm₂ be the slopes of these lines respectively.

By y = mx +c, we getm₁=-3 and m₂=-1/2

Let θ be the angle between the two lines,

By using formula 

⇒

⇒ 1

Therefore,

The angles between the two lines is 45°.

(ii) 3x-y+5 = 0 and x-3y+1 = 0

Solution:

Given equations of lines are 3x - y + 5 = 0, x - 3y +1 = 0

Let m₁ and m₂ be the slopes of these lines respectively.

By y = mx +c, we get m₁=3 and m₂=1/3

Let θ be the angle between the two lines,

We know that,

⇒

Therefore,

The angle between the two lines is

(iii) 3x+4y -7 = 0 and 4x-3y+5 = 0

Solution:

Given equations of lines are 3x + 4y - 7 = 0, 4x - 3y+5 = 0

Letm₁ andm₂ be the slopes of these lines respectively.

By y= mx +c, we get m₁ = and m₂ = 

Here, if we carefully observe, m₁m₂ = -1, which means

From the formula, denominator will become 0,

Therefore, ,

The angle between the two lines is 90°.

(iv) x-4y = 3 and 6x-y = 11

Solution:

Given equations of lines are x - 4y =3, 6x - y =11

Letm₁ andm₂ be the slopes of these lines respectively.

By y = mx +c, we get, m₁=1/4 and m₂=6

Let θ be the angle between the two lines,

We know that,

⇒

⇒

⇒

Therefore,

The angle between the two lines is

(v) (m²-mn)y = (mn+n²)x + n³ and (mn+m²)y = (mn-n²)x + m³

Solution:

Given two lines, letm₁ andm₂ be the slopes of these lines.

By y = mx +c, we getm₁ = and m₂ = 

Let θ be the angle between two lines,

We know that

⇒ 

⇒

⇒

Therefore, Angle between two lines is.

Question 2: Find the acute angle between the lines 2x-y+3 = 0 and x+y+2 = 0

Solution:

Letm₁ andm₂ be the slopes of these two lines

By y = mx +c, we get m₁=2 and m₂=-1

Let θ be the angle between the two lines,

We know that,

⇒ 

⇒ 

Here we need acute angle,is positive if the angle is acute and negative if obtuse.

Therefore,.

The acute angle between the two lines is.

Question 3: Prove that points (2, -1), (0, 2), (2, 3), and (4, 0) are the coordinates of the vertices of a parallelogram and find the angle between its diagonals.

Solution:

Let the given points are A = (2,-1), B = (0, 2), C = (2, 3) and D = (4, 0) are coordinates of a parallelogram.

For these points to form a parallelogram, it is must that any pair of two lines formed by these points are parallel to each other.

So, Now lets find the slopes of lines AB, BC, CD, DA using formula

Slope of line 

Slope of line 

Slope of line 

Slope of line 

Since the lines AB parallel to CD and BC parallel to DA, the points form a parallelogram.

Now, Angle between the diagonals of parallelogram = Angle between the lines AC and BD.

👁 Image

Letm₁ andm₂ be the slopes of these lines,

From the figure, the angle between diagonals

We know that

⇒ 

Therefore, The angle between the diagonals is 

Question 4: Find the angles between the line joining the points (2, 0), (0, 3), and the line x + y = 1.

Solution:

Let slope of line joining the points (2, 0) and (0, 3) is m₁ = -3/2

slope of line m₂ =-1

Let θ be the angle between the two lines,

We know that,

⇒

⇒

Therefore, the acute angle between the line and the line joining the points is

Question 5: If θ is the angle which the straight line joining the points (x1,y1)and (x2,y2) subtends at origin, prove thatand

Solution:

Let the points A = (x₁, y₁), B = (x₂, y₂) and origin O = (0, 0)

👁 Image

Slopes of lines joining OA and OB are m₁ = y₁/x₁ and m₂ = y₂/x₂

Let θ be the angle between the lines OA and OB.

We know that,

⇒

Therefore,

By the formula,we get

Substituting Tanθ from above equation, we get,

Therefore, hence proved.

Question 6: Prove that the straight lines(a+ b)x+(a - b)y=2ab, (a - b)x+(a + b)y=2ab and x + y=0 form an isosceles triangle whose vertical angle is

Solution:

Let m1, m2, m3 be the slopes of given lines respectively.

m₁ = , m₂ = and m₃ = -1

Let θ₁, θ₂, θ₃ be the angles between the lines

👁 Image

Now,=

⇒

⇒⇒

We know that, using this above equation

⇒ 

=

⇒

⇒

=

⇒

⇒

Here, angle θ₂ and θ₃ are equal, and θ₁ is the vertical angle

Therefore, the given lines forms Isosceles triangle with vertical angle

Question 7: Find the angle between the lines x = a, by + c = 0

Solution:

The given lines are in the form of x = constant and y=constant respectively

where x=c and y= -c/b

x = c line is parallel to y-axis as there is no y-coefficient

and is parallel to x-axis as there is no x-coefficient

👁 Image

Therefore, the Angle between the two lines is 90°

Question 8: Find the tangent of the angle between the lines which have intercepts 3, 4, and 1, 8 on the axes respectively.

Solution:

Equation of line which have intercepts a, b on x and y-axis is

Therefore, the line with intercepts 3,4 is

and the line with intercepts 1, 8 is

letm₁ and m₂ be the slopes of these lines,

m₁ = and m₂ = -8

Now, let θ be the angle between the lines,

⇒ 

⇒ ⇒ 

Therefore, The tangent of angle between the lines is 4/7

Question 9: Show that line a²x+ay+1 = 0 is perpendicular to line x-ay = 1

Solution:

Letm₁ and m₂ be the slopes of given lines,m₁=-a andm₂=1/a

Here, if we carefully observe,m₁m₂=-1 ,which means

From the formula, denominator will become 0,

Therefore,, .

The angle between the two lines is 90°, and they are perpendicular to each other.

Therefore, Hence proved.

Question 10: Show that tangent of an angle between the linesand is.

Solution:

Given lines,⇒ 

⇒ 

Let slopes of these lines arem₁ andm₂ respectively.

and

Now, let θ be the angle between the lines,

⇒

⇒

Therefore, Tangent of angle between the lines is

Hence, proved.