Exercise 10.3
Q1. Reduce the following equations into slope - intercept form and find their slopes and the y - intercepts.
(i) x + 7y = 0,
(ii) 6x + 3y – 5 = 0,
(iii) y = 0.
Solution:
Solution:
Solution:
(iii) y = 0
Q2. Reduce the following equations into intercept form and find their intercepts on the axes.
(i) 3x + 2y – 12 = 0
(ii) 4x – 3y = 6
(iii) 3y + 2 = 0.
Solution: (i) 3x + 2y – 12 = 0
Reducing into intercept form
3x + 2y = 12
Dividing by 12
Solution: (ii) 4x – 3y = 6
Reducing equation into intercept form
4x – 3y = 6
Dividing by 6
Solution: (iii) 3y + 2 = 0
Reducing equation into intercept form
0.x + 3y = - 2
Dividing by -2
Q3. Reduce the following equations into normal form. Find their perpendicular distances from the origin and angle between perpendicular and the positive x-axis.
Required normal form of the line.
X cos 120° + y sin 120° = 4
Perpendicular distance (p) = 4
And angle between perpendicular and the positive x-axis = 120°
Solution: (ii) y – 2 = 0
On reducing the equation we have
Here, comparing with general normal form x cos ω + y sin ω = p
cos ω = , sin ω = and p = 2
Hence point lies on y-axis and θ is in I quadrant.
θ = 90°
∴ ω = 90°
Required normal form of the line.
X cos 90° + y sin 90° = 2
Perpendicular distance (p) = 2
And angle between perpendicular and the positive x-axis = 90°
∴ ω θ
Solution: (iii) x – y = 4
On reducing the equation we have
x - y = 2 …. (1)
A = 1 and B = -1
Hence ω lies in VI quadrant.
θ = 45° [ θ is value of angle between 0 - 90°]
∴ ω = 360° - θ = 360° - 45° = 315°
Required normal form of the line.
x cos 315° + y sin 315° = 2
Perpendicular distance (p) = 2
And angle between perpendicular and the positive x-axis = 315°
Q4. Find the distance of the point (–1, 1) from the line 12(x + 6) = 5(y – 2).
Solution:
Given line is 12(x + 6) = 5(y – 2) which gives
⇒ 12(x + 6) = 5(y – 2)
⇒ 12x + 72 = 5y – 10
⇒ 12x – 5y + 72 + 10 = 0
⇒ 12x – 5y + 82 = 0 ….. (1)
On comparing equation (1) with general equation of line Ax + By + C = 0, we obtain
A = 12, B = - 5 and C = 82
Now distance from given point (-1, 1) to line 12x – 5y + 82 = 0 given by
Solution:
⇒ 4x + 3y = 12
⇒ 4x + 3y - 12 = 0 …..(1)
Comparing equation (1) with general equation of line Ax + By + C = 0
We obtain, A = 4, B = 3 C = -12
Let the point on x-axis be (a, 0) whose distance from given line is 4 units.
Using perpendicular distance formula;
⇒ ±(4a – 12) = 20
Here we take both +ve and –ve signs
⇒ 4a – 12 = 20 Or – 4a + 12 = 20
⇒ 4a = 32 Or – 4a = 20 – 12
⇒ 4a = 32 Or – 4a = 20 – 12 = 8
⇒ a = 8 or a = – 2
Thus the required point on x-axis are (8, 0) and (-2, 0)
Q6. Find the distance between parallel lines
(i) 15x + 8y – 34 = 0 and 15x + 8y + 31 = 0
(ii) l (x + y) + p = 0 and l (x + y) – r = 0.
Solution:
(i) 15x + 8y – 34 = 0 and 15x + 8y + 31 = 0
Q12. Two lines passing through the point (2, 3) intersects each other at an angle of 60°. If slope of one line is 2, find equation of the other line.
Solution:
The slope of one line m1 = 2,
Let the slope of other line be m2.
And the angle between two lines is 60°
⇒ θ = 60°
Now equation of the given live which passes through (2, 3)
Now equation of the given live which passes through (2, 3)
Q13. Find the equation of the right bisector of the line segment joining the points (3, 4) and (–1, 2).
Solution:
Right bisector means perpendicular bisector of given line segment are A(3, 4) and B(-1, 2).
∵ Line bisects AB
The equation of the line passing through (1, 3) and having a slope of –2 is
(y – 3) = –2 (x – 1) y – 3 = –2x + 2
2x + y = 5
Thus, the required equation of the line is 2x + y = 5.
Q14. Find the coordinates of the foot of perpendicular from the point (–1, 3) to the line 3x – 4y – 16 = 0.
Solution:
Equation of given line is
3x – 4y – 16 = 0 …………. (1)
Q15. The perpendicular from the origin to the line y = mx + c meets it at the point (–1, 2). Find the values of m and c.
Solution:
Slope of perpendicular line from origin (0, 0) and (–1, 2).
Q16. If p and q are the lengths of perpendiculars from the origin to the lines x cosθ - ysin θ = k cos2θ and x sec θ + y cosec θ = k, respectively, prove that p2 + 4q2 = k2.
Solution:
x cos θ – y sinθ = k cos 2θ ………………. (1)
x secθ + y cosec θ = k ………………….… (2)
The perpendicular distance (d) of a line Ax + By + C = 0 from a point (x1, y1) is given by
Q17. In the triangle ABC with vertices A (2, 3), B (4, –1) and C (1, 2), find the equation and length of altitude from the vertex A.
Solution:
ABC is the triangle which vertices are A (2, 3), B (4, –1) and C (1, 2).
AD is altitude on side BC from vertex A.
Equation for Altitude AD
⇒ (y – 3) = 1 (x – 2)
⇒ y – 3 = x – 2
⇒ x – y – 2 + 3 = 0
⇒ x – y + 1 = 0
The required equation of Altitude is x – y + 1 = 0.
Now equation for line BC where slope is – 1.
⇒ (y + 1) = –1 (x – 4)
⇒ y + 1 = – x + 4
⇒ x + y + 1 – 4 = 0
⇒ x + y – 3 = 0
Length of AD = Length of the perpendicular from A (2, 3) to BC The equation of BC is x + y – 3 = 0