Question

# The polygon before translation is

- Image
- Pre-image
- Triangle
- Square

Hint:

### The translation is the act of moving a shape or a figure from one location to another. A figure can move in translation up, down, right, left, or anywhere else in the coordinate system. Only the object's position changes during translation; its size stays the same.

We have asked what is polygon called before translation.

## The correct answer is: Pre-image

### Now as we said that in translation, a point or a figure can move up, down, right, left, or anywhere else in the coordinate system. Any point can be located using a Cartesian coordinate system or coordinate system, and that point can be displayed as an ordered pair (x, y) known as Coordinates.

In cartesian plane there are 4 quadrants:

1st Quadrant

2nd Quadrant

3rd Quadrant

4th Quadrant

The sign patterns are in this way:

I- quadrant (+, +)

II-quadrant (-, +)

III-quadrant (-, -)

IV-quadrant (+, -)

Lets take an example:

(x, y) --> (x - 9, y + 3)

(x, y) --> (x + 2, y + 5)

So with these examples, we can see that a new image is formed. So before translation, It is called as pre-image.

In this question, we used the concept of translation and found out the points according to the condition given. We also understood the concept of the cartesian system and the coordinates. In translation, only the position of the object changes, and its size remains the same. The polygon before translation is Pre-image.

### Related Questions to study

### If the image is moving right, the translation is for

In this question, we used the concept of translation and found out the points according to the condition given. We also understood the concept of the cartesian system and the coordinates. In translation, only the position of the object changes, its size remains the same.

### If the image is moving right, the translation is for

In this question, we used the concept of translation and found out the points according to the condition given. We also understood the concept of the cartesian system and the coordinates. In translation, only the position of the object changes, its size remains the same.

### In translation if the image moves vertically, then it moves

In this question, we used the concept of translation and found out the points according to the condition given. We also understood the concept of the cartesian system and the coordinates. In translation, only the position of the object changes, its size remains the same.

### In translation if the image moves vertically, then it moves

### In translation if the image moves to the right, then it moves

### In translation if the image moves to the right, then it moves

### If two triangles are similar, then

### If two triangles are similar, then

### Which statement is not true in the following statements?

### Which statement is not true in the following statements?

### If the scale factor of two similar triangles is a:b, then the ratio of their area is

### If the scale factor of two similar triangles is a:b, then the ratio of their area is

### If two triangles are similar, the ratios of their perimeter and scale factor are

### If two triangles are similar, the ratios of their perimeter and scale factor are

### If given polygons are similar, then find the scale factor.

### If given polygons are similar, then find the scale factor.

### Observe the given triangles and choose the correct statement.

### Observe the given triangles and choose the correct statement.

### Determine the scale factor of the following figure.

### Determine the scale factor of the following figure.

### Find the missing sides.

### Find the missing sides.

### If the two triangles are similar. Find the value of angle L.

### If the two triangles are similar. Find the value of angle L.

### Find the value of *x.*

1.) Two triangles are similar if their corresponding angles are equal and their corresponding sides are within the same ratio (or proportion). Similar triangles will have the same shape, but not necessarily the same size

If the corresponding angles of two triangles are equal, then the triangles are similar. They are called equiangular triangles

### Find the value of *x.*

1.) Two triangles are similar if their corresponding angles are equal and their corresponding sides are within the same ratio (or proportion). Similar triangles will have the same shape, but not necessarily the same size

If the corresponding angles of two triangles are equal, then the triangles are similar. They are called equiangular triangles