Question

. If a pair of parallel lines are rotated, which is true?

Answer 1

Answer:  The correct option is (C)  Rotated parallel lines always remain parallel lines.

Step-by-step explanation:  We are given ton select the correct statement about the rotation of two parallel lines.

We know that two parallel lines have same slope.

So, let m = 2 be the slope of the two parallel lines and 4, 7 are the y-intercepts.

Then, the equations of the lines are given by

$y=2x+4~~~~~~~~~~~~~~~~~~~~(i)\\y=2x+7~~~~~~~~~~~~~~~~~~~~(ii)$

Let us rotate the lines through an angle of 90° clockwise.

The co-ordinates of the point (x, y), after rotating 90° clockwise becomes (y, -x).

We have

P(-1, 2) and Q(1, 6) are two points on the line (i) and R(-1, 5) and S(1, 9) are two points on the line (ii).

So, after rotation, they become

P(-1, 2)  ⇒  P'(2, 1),

Q(1, 6) ⇒  Q'(6, -1),

R(-1, 5)  ⇒  R'(5, 1),

S(1, 9)  ⇒  S'(9, -1).

So, slope of line (i) is

$m_1=\dfrac{-1-1}{6-2}=-\dfrac{1}{2},$

and the slope of line (ii) is

$m_2=\dfrac{-1-1}{9-5}=-\dfrac{1}{2}.$

Since, $m_1=m_2,$

so the slopes of the lines after rotation is again same, and hence they are again parallel to each other.

So, the angle of rotation (90° or 180° or 360°)does not matter, the parallel lines will always be parallel.

Thus, the rotated parallel lines always remain parallel lines.

Option (C) is correct.

Answer 2

C.
Rotating parallel lines by the same amount does not change their parallel nature.