Examples of shaping in the following topics:
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- The shape of an object is a description of space that the object takes up; the shape can change if the object is deformed.
- Most shapes occurring in the physical world are complex.
- Having the same shape is an equivalence relation, and accordingly a precise mathematical definition of the notion of shape can be given as being an equivalence class of subsets of a Euclidean space having the same shape.
- Shapes of physical objects are equal if the subsets of space these objects occupy satisfy the definition above.
- In particular, the shape does not depend on the size and placement in space of the object.
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- Shape refers to an area in two-dimensional space that is defined by edges.
- Shapes can be created by placing two different textures, or shape-groups, next to each other, thereby creating an enclosed area, such as a painting of an object floating in water.
- "Positive space" refers to the space of the defined shape, or figure.
- Form is a concept that is related to shape.
- Combining two or more shapes can create a three-dimensional shape.
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- Such a line gives the contour or shape of the melodic line.
- You can also describe the shape of a melody verbally.
- For example, you can speak of a "rising melody" or of an "arch-shaped" phrase.
- Please see The Shape of a Melody for children's activities covering melodic contour.
- Arch shapes (in which the melody rises and then falls) are easy to find in many melodies.
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- Shaping is a method of operant conditioning by which successive approximations of a target behavior are reinforced.
- In his operant-conditioning experiments, Skinner often used an approach called shaping.
- Shaping is useful because it is often unlikely that an organism will display anything but the simplest of behaviors spontaneously.
- In shaping, behaviors are broken down into many small, achievable steps.
- Shaping is also a useful technique in human learning.
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- The overall shape of a sampling distribution is expected to be symmetric and approximately normal.
- The "shape of a distribution" refers to the shape of a probability distribution.
- The shape of a distribution is sometimes characterized by the behaviors of the tails (as in a long or short tail).
- As previously mentioned, the overall shape of a sampling distribution is expected to be symmetric and approximately normal.
- Give examples of the various shapes a sampling distribution can take on
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- Volumes of complicated shapes can be calculated using integral calculus if a formula exists for the shape's boundary.
- Three dimensional mathematical shapes are also assigned volumes.
- Volumes of some simple shapes, such as regular, straight-edged, and circular shapes can be easily calculated using arithmetic formulas.
- The volumes of more complicated shapes can be calculated using integral calculus if a formula exists for the shape's boundary.
- Calculate the volume of a shape by using the triple integral of the constant function 1
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- The amount and arrangement of the proteins and nucleic acid of viruses determine their size and shape.
- The protein and nucleic acid constituents have properties unique for each class of virus; when assembled, they determine the size and shape of the virus for that specific class.
- Any determination of the size of a virus also must take into account its shape, since different classes of viruses have distinctive shapes.
- The larger and more-complex bacteriophages contain double-stranded DNA as their genetic information and combine both filamentous and polygonal shapes.
- The classic T4 bacteriophage is composed of a polygonal head, which contains the DNA genome, and a special-function rod-shaped tail of long fibres.
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- A solid is in a state of matter that maintains a fixed volume and shape.
- A liquid maintains a fixed volume, but its shape will mold to the shape of the container it is being held in.
- Matter in the plasma state has variable volume and shape.
- Liquids maintain a fixed volume, but their shape will mold to the shape of the container they are being held in.
- Solids are in a state of matter that maintains a fixed volume and shape.