## Question

### Solution

Correct option is

2

Since the given (both) lines are parallel to y-axis and the required line is equidistant from these lines, so it is also parallel to y-axis. Let equation of any line parallel to y-axis is

a

Here,  Hence its equation is x = 2.

#### SIMILAR QUESTIONS

Q1

Determine λ, so that 2 is the slope of the line through (2, 5) and (λ, 3).

Q2

Find whether the points (–a, –b), [–(+ 1)a, –(s + 1)b] and [(t – 1)a, (t – 1)b] are collinear?

Q3

For what value of k the points (k, 2 – 2k), (–k + 1, 2k) and (–4 – k, 6 – 2k) are collinear?

Q4

Find the angle between the lines joining the points (0, 0), (2, 3) and (2, –2), (3, 5).

Q5

The angle between two lines is and the slope of one of them is . Find the slope of the other line.

Q6

A line passes through the points A(2, –3) and B(6, 3). Find the slopes of the lines which are

1. parallel to AB

2. perpendicular to AB

Q7

Find the equation of the straight line parallel to y-axis and at a distance

(i).3 units to the right

(ii). 2 units to the left

Q8

Find the equation of the straight line parallel to x-axis and at a distance

(i). 5 units above the x-axis

(ii). 9 units below the x-axis

Q9

Find the equation of the straight line which passes through the point (2, –3) and is

1. parallel to the x-axis

2. perpendicular to the x-axis

Q10

If the straight line y = mx + c passes through the points (2, 4) and (–3, 6), find the values of m and c.