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What are the properties of translation and axisymmetry? What about rotation?
The shape and size of the object remain unchanged, but the position changes
Image translation properties of quadratic function
Set the quadratic function y = ax ²+ BX + C into vertex form
y=a(x+h) ²+ k
H controls the left-right translation, i.e. left plus right minus
K controls up and down translation, that is, up plus down minus
What is the property of the corresponding angle in translation?
The corresponding angles are equal
Translation belongs to distance preserving transformation, which is conformal
The properties of the two figures obtained by translation are ----- and the two figures before and after translation are------(
Congruence; Congruent graph
Attached:
Translation refers to making all points on a graph the same in a certain direction in a plane
The movement of distance, such a graphic motion is called the translational motion of graphics, which is called translation for short [1]. Translation does not change the shape and size of graphics. It is isometric isomorphism, which is a kind of affine transformation in affine space. It can be regarded as the result of adding the same vector to each point or moving the center of the coordinate system. That is to say, if a known vector is a point in space, translation
After translation, the corresponding line segments are parallel (or collinear) and equal, the corresponding angles are equal, and the line segments connected by the corresponding points are parallel and equal; Translation transformation does not change the shape, size and direction of the figure (the two figures before and after translation are congruent). (1) the shape and size of the figure before and after translation do not change, but the position changes; (2) after the figure is translated, the line segments connected by the corresponding points are parallel and equal (or on the same straight line) (3) multiple translations are equivalent to one translation. (4) the figure after multiple symmetries is equal to the figure after translation. (5) the translation is determined by the direction and distance. (6) after translation, the corresponding line segments are parallel (or collinear) and equal, and the corresponding angles are equal, The line segments connected by the corresponding points are parallel and equal. This movement of all points on the graph at the same distance in a certain direction is called the translational motion of the graph, which is referred to as the condition of translational motion for short: the condition for determining a translational motion is the direction and distance of translation
1 move a figure along a straight line as a whole to get a new figure. The shape and size of the new figure are exactly the same as the original figure. 2 each point in the new figure is obtained after moving a point in the original figure, These two points are corresponding points. The line segments connecting each group of corresponding points are parallel and equal. VI. characteristics of Translation: 1. The shape, size and position of the figure remain unchanged before and after translation. 2. The connecting lines between the new figure and the corresponding points of the original figure are parallel and equal. 3. The corresponding line segments of the new figure and the original figure are parallel and equal, and the corresponding angles are equal
What are the properties of translation? emergency Such as the title
translation
1、 Definition:
Translation refers to moving a figure along a certain direction for a certain distance in a plane. Such graphic motion is called translation. Translation does not change the shape and size of the object
2、 Basic properties:
After translation, the corresponding line segments are parallel (or collinear) and equal, the corresponding angles are equal, and the line segments connected by the corresponding points are parallel and equal;
Translation transformation does not change the shape, size and direction of the graph
Money has time. Who can give some examples in life? Attention is an example of life Yes, it has monetary time value
Your problem is problematic. It should be that money has time value! In short, 100 yuan today is different from 100 yuan a year later. The simplest thing is that we can deposit 100 yuan in the bank. Assuming that the one-year interest rate is 3%, we can get 103 one year later. This is the so-called time value of money. In financial management, we often use final value and present value to distinguish
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