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What is 1050 rounded to two significant figures?
1050 contains 4 significant digits and cannot be rounded to two significant figures without changing the value of the number.
What is is called if something has the same she and size?
If something has the same shape and size, it is referred to as "congruent." In geometry, two figures are congruent if they can be transformed into each other through rotations, translations, or reflections without altering their size or shape. This concept applies to various geometric figures such as triangles, circles, and other polygons.
Polygons abcd and efgh are similar. find the length of eh?
The question cannot be answered without information about the relative sizes of the two polygons.
What figures are congruments?
Congruent figures are shapes that have the same size and shape, meaning they can be transformed into one another through rotations, translations, or reflections without altering their dimensions. For example, two triangles with equal side lengths and angles are considered congruent. In notation, if two figures A and B are congruent, it is expressed as A ≅ B. Congruence applies to various geometric shapes, including polygons and circles.
How are the polygons in problem 1 and 2 similar?
Without specific details about the polygons in problems 1 and 2, I can only provide a general answer. If the polygons share the same number of sides, have equal corresponding angles, or are both regular polygons, they can be considered similar. Similar polygons maintain proportional relationships between their corresponding sides and angles. To give a more precise comparison, I would need the characteristics of the polygons in question.
How do you identify a polygon without using attributes?
All polygons have 3 or more sides
Which regular polygons can be used to tile a surface without overlaps or gaps?
Regular polygons that can tile a surface without overlaps or gaps are limited to equilateral triangles, squares, and regular hexagons. This is because these shapes can fit together perfectly at their angles to fill a plane completely. Other regular polygons, such as pentagons or octagons, do not have the necessary angle relationships to achieve this tiling without leaving gaps or creating overlaps.
What is asymmetrical figures?
Figures without symmetry. Quadrilaterals, trapezium..
What polygons cannot be used to create a pure tessellation?
Polygons that cannot create a pure tessellation include those with angles that do not divide evenly into 360 degrees. This primarily includes irregular polygons and certain convex polygons such as triangles with angles that do not meet this criterion. Additionally, polygons like circles, which do not have straight edges, also cannot tessellate. Regular polygons like triangles, squares, and hexagons can tessellate, as their angles fit together without gaps.
Which of the answers for the following conversions contains the correct number of significant figures?
To determine which answer contains the correct number of significant figures in a conversion, it's essential to consider the precision of the values involved in the conversion. The result should reflect the least number of significant figures from the original measurements. Without the specific answers or conversions provided, it's impossible to identify which one is correct. Please provide the answers for a more accurate evaluation.
What is two figures with the same angles and same side length?
Two figures with the same angles and the same side lengths are called congruent figures. This means that they have identical shapes and sizes, allowing one to be transformed into the other through rotations, translations, or reflections without altering their dimensions. In the case of polygons, this includes having equal corresponding sides and angles. Congruency is a fundamental concept in geometry used to compare and analyze shapes.
Which polygons in the diagram are images of polygon 1 under similarity transformations?
To determine which polygons in the diagram are images of polygon 1 under similarity transformations, look for polygons that maintain the same shape but may differ in size or orientation. Similarity transformations include scaling, rotation, and translation. Identify polygons that have corresponding angles equal and side lengths that are proportional to those of polygon 1. Without the diagram, it's not possible to specify which polygons meet these criteria.
