Points (3, 0) and (–1, 0) are invariant points under reflection in the line L1; points (0, –3) and (0, 1) are invariant points on reflection in line L2. Name or write equations for the lines L1 and L2. Write down the images of the points P (3, 4) and Q (–5, –2) on reflection in line L1. Name the images as P’ and Q’ respectively. Write down the images of P and Q on reflection in L2. Name the images as P” and Q” respectively. State or describe a single transformation that maps P’ onto P''.

Points (3, 0) and (–1, 0) are invariant points under reflection in the line L1; points (0, –3) and (0, 1) are invariant points on reflection in line L2. Name or write equations for the lines L1 - Mathematics

प्रश्न

Points (3, 0) and (–1, 0) are invariant points under reflection in the line L₁; points (0, –3) and (0, 1) are invariant points on reflection in line L₂.

Name or write equations for the lines L₁ and L₂.
Write down the images of the points P (3, 4) and Q (–5, –2) on reflection in line L₁. Name the images as P’ and Q’ respectively.
Write down the images of P and Q on reflection in L₂. Name the images as P” and Q” respectively.
State or describe a single transformation that maps P’ onto P''.

बेरीज

उत्तर

i. We know that every point in a line is invariant under the reflection in the same line.

Since points (3, 0) and (–1, 0) lie on the x-axis.

So, (3, 0) and (–1, 0) are invariant under reflection in x-axis.

Hence, the equation of line L₁ is y = 0.

Similarly, (0, –3) and (0, 1) are invariant under reflection in y-axis.

Hence, the equation of line L₂ is x = 0.

ii. P’ = Image of P (3, 4) in L₁ = (3, –4)

Q’ = Image of Q (–5, –2) in L₁ = (–5, 2)

iii. P” = Image of P (3, 4) in L₂ = (–3, 4)

Q” = Image of Q (–5, –2) in L₂ = (5, –2)

iv. Single transformation that maps P’ onto P” is reflection in origin.

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संबंधित प्रश्‍न

Attempt this question on graph paper.

Plot A (3, 2) and B (5, 4) on graph paper. Take 2 cm = 1 unit on both the axes.
Reflect A and B in the x-axis to A’ and B’ respectively. Plot these points also on the same graph paper.
Write down:
1. the geometrical name of the figure ABB’A’;
2. the measure of angle ABB’;
3. the image of A” of A, when A is reflected in the origin.
4. the single transformation that maps A’ to A”.

Point P (a, b) is reflected in the x-axis to P’ (5, –2). Write down the values of a and b.
P” is the image of P when reflected in the y-axis. Write down the co-ordinates of P”.
Name a single transformation that maps P’ to P”.

A point P (a, b) is reflected in the x-axis to P’ (2, –3). Write down the values of a and b. P” is the image of P, reflected in the y-axis. Write down the co-ordinates of P”. Find the co-ordinates of P”’, when P is reflected in the line, parallel to y-axis, such that x = 4.

Points A and B have co-ordinates (3, 4) and (0, 2) respectively. Find the image:

A’ of A under reflection in the x-axis.
B’ of B under reflection in the line AA’.
A” of A under reflection in the y-axis.
B” of B under reflection in the line AA”.

The point P (5, 3) was reflected in the origin to get the image P’.

Write down the co-ordinates of P’.
If M is the foot of the perpendicular from P to the x-axis, find the co-ordinates of M.
If N is the foot of the perpendicular from P’ to the x-axis, find the co-ordinates of N.
Name the figure PMP’N.
Find the area of the figure PMP’N.

P and Q have co-ordinates (0, 5) and (–2, 4).

P is invariant when reflected in an axis. Name the axis.
Find the image of Q on reflection in the axis found in (a).
(0, k) on reflection in the origin is invariant. Write the value of k.
Write the co-ordinates of the image of Q, obtained by reflecting it in the origin followed by reflection in x-axis.

A’ and B’ are images of A (-3, 5) and B (-5, 3) respectively on reflection in y-axis. Find: (

a) the co-ordinates of A’ and B’.

(b) Assign special name of quadrilateral AA’B’B.

Using a graph paper, plot the point A (6, 4) and B (0, 4).

(a) Reflect A and B in the origin to get the image A’ and B’.

(b) Write the co-ordinates of A’ and B’.

(d) Find its perimeter.

Use a graph paper for this question.

(Take 2 cm = 1 unit on both x and y axes)

Plot the following points: A(0, 4), B(2, 3), C(1, 1) and D(2, 0).
Reflect points B, C, D on the y-axis and write down their coordinates. Name the images as B', C', D' respectively.
Join the points A, B, C, D, D', C', B' and A in order, so as to form a closed figure. Write down the equation to the line about which if this closed figure obtained is folded, the two parts of the figure exactly coincide.

Points (3, 0) and (−1, 0) are invarient points under reflection in the line L₁; point (0, −3) and (0, 1) are invarient points on reflection in line L₂.

Write the equation of the line L₁ and L₂.
Write down the images of points P(3, 4) and Q(−5, −2) on reflection in L₁. Name the images as P' and Q' respectively.
Write down the images of P and Q on reflection in L₂. Name the image as P'' and Q'' respectively.

Points (3, 0) and (–1, 0) are invariant points under reflection in the line L1; points (0, –3) and (0, 1) are invariant points on reflection in line L2. Name or write equations for the lines L1 - Mathematics

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Points (3, 0) and (–1, 0) are invariant points under reflection in the line L1; points (0, –3) and (0, 1) are invariant points on reflection in line L2. Name or write equations for the lines L1 - Mathematics

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