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Origami is capable of turning a simple sheet of paper into a pretty paper crane, but the principles behind the paper-folding art can also be applied to making a microfluidic device for a blood test, or for storing a satellite's solar panel in a rocket's cargo bay. A team of researchers is turning kirigami, a related art form that allows the paper to be cut, into a technique that can be applied equally to structures on those vastly divergent length scales. The researchers lay out the rules for folding and cutting a hexagonal lattice, a structure made from strips of material that cross over each other with spaces between, into a wide variety of useful three-dimensional shapes.A hexagonal lattice may seem like an odd choice for a starting point, but the researchers think that the pattern has advantages over a seemingly simpler tessellation, such as one made from squares; for instance, it is easier to fill a space with a hexagonal lattice and move from 2-D to 3-D. Starting from a flat hexagonal grid on a sheet of paper, the researchers outlined the fundamental cuts and folds that allow the resulting shape to keep the same proportions of the initial lattice, even if some of the material is removed. This is a critical quality for making the transition from paper to materials that might be used in real-world applications.Having a set of rules that draws on fundamental mathematical principles means that the kirigami approach can be applied equally across length scales, and with almost any material that can be selected on the basis of its relevance to the ultimate application, whether it is in nanotechnology, architecture, or aerospace.The rules also guarantee that "modules," basic shapes such as channels that can direct the flow of fluids, can be combined into more complex ones. Kirigami is particularly attractive for nanoscale applications, where the simplest, most space-efficient shapes are necessary, and self-folding materials would circumvent some of the fabrication challenges inherent in working with other materials at such small scales.Which of the following most aptly describes the function of the second paragraph?a)To introduce a discussion on the most critical aspect of the technique that dictates the transformation of origami from paper to potentially real structuresb)To highlight the scope of kirigami across various applicationsc)To suggest how maintaining a quality of the technique of kirigami is key to its application to various materialsd)To evaluate some key features of the technique of kirigamie)To analyze what makes kirigami a successful technique for fabricating materialsCorrect answer is option 'D'. Can you explain this answer? for GMAT 2024 is part of GMAT preparation. The Question and answers have been prepared according to the GMAT exam syllabus. Information about Origami is capable of turning a simple sheet of paper into a pretty paper crane, but the principles behind the paper-folding art can also be applied to making a microfluidic device for a blood test, or for storing a satellite's solar panel in a rocket's cargo bay. A team of researchers is turning kirigami, a related art form that allows the paper to be cut, into a technique that can be applied equally to structures on those vastly divergent length scales. The researchers lay out the rules for folding and cutting a hexagonal lattice, a structure made from strips of material that cross over each other with spaces between, into a wide variety of useful three-dimensional shapes.A hexagonal lattice may seem like an odd choice for a starting point, but the researchers think that the pattern has advantages over a seemingly simpler tessellation, such as one made from squares; for instance, it is easier to fill a space with a hexagonal lattice and move from 2-D to 3-D. Starting from a flat hexagonal grid on a sheet of paper, the researchers outlined the fundamental cuts and folds that allow the resulting shape to keep the same proportions of the initial lattice, even if some of the material is removed. This is a critical quality for making the transition from paper to materials that might be used in real-world applications.Having a set of rules that draws on fundamental mathematical principles means that the kirigami approach can be applied equally across length scales, and with almost any material that can be selected on the basis of its relevance to the ultimate application, whether it is in nanotechnology, architecture, or aerospace.The rules also guarantee that "modules," basic shapes such as channels that can direct the flow of fluids, can be combined into more complex ones. Kirigami is particularly attractive for nanoscale applications, where the simplest, most space-efficient shapes are necessary, and self-folding materials would circumvent some of the fabrication challenges inherent in working with other materials at such small scales.Which of the following most aptly describes the function of the second paragraph?a)To introduce a discussion on the most critical aspect of the technique that dictates the transformation of origami from paper to potentially real structuresb)To highlight the scope of kirigami across various applicationsc)To suggest how maintaining a quality of the technique of kirigami is key to its application to various materialsd)To evaluate some key features of the technique of kirigamie)To analyze what makes kirigami a successful technique for fabricating materialsCorrect answer is option 'D'. Can you explain this answer? covers all topics & solutions for GMAT 2024 Exam. Find important definitions, questions, meanings, examples, exercises and tests below for Origami is capable of turning a simple sheet of paper into a pretty paper crane, but the principles behind the paper-folding art can also be applied to making a microfluidic device for a blood test, or for storing a satellite's solar panel in a rocket's cargo bay. A team of researchers is turning kirigami, a related art form that allows the paper to be cut, into a technique that can be applied equally to structures on those vastly divergent length scales. The researchers lay out the rules for folding and cutting a hexagonal lattice, a structure made from strips of material that cross over each other with spaces between, into a wide variety of useful three-dimensional shapes.A hexagonal lattice may seem like an odd choice for a starting point, but the researchers think that the pattern has advantages over a seemingly simpler tessellation, such as one made from squares; for instance, it is easier to fill a space with a hexagonal lattice and move from 2-D to 3-D. Starting from a flat hexagonal grid on a sheet of paper, the researchers outlined the fundamental cuts and folds that allow the resulting shape to keep the same proportions of the initial lattice, even if some of the material is removed. This is a critical quality for making the transition from paper to materials that might be used in real-world applications.Having a set of rules that draws on fundamental mathematical principles means that the kirigami approach can be applied equally across length scales, and with almost any material that can be selected on the basis of its relevance to the ultimate application, whether it is in nanotechnology, architecture, or aerospace.The rules also guarantee that "modules," basic shapes such as channels that can direct the flow of fluids, can be combined into more complex ones. Kirigami is particularly attractive for nanoscale applications, where the simplest, most space-efficient shapes are necessary, and self-folding materials would circumvent some of the fabrication challenges inherent in working with other materials at such small scales.Which of the following most aptly describes the function of the second paragraph?a)To introduce a discussion on the most critical aspect of the technique that dictates the transformation of origami from paper to potentially real structuresb)To highlight the scope of kirigami across various applicationsc)To suggest how maintaining a quality of the technique of kirigami is key to its application to various materialsd)To evaluate some key features of the technique of kirigamie)To analyze what makes kirigami a successful technique for fabricating materialsCorrect answer is option 'D'. Can you explain this answer?.

Solutions for Origami is capable of turning a simple sheet of paper into a pretty paper crane, but the principles behind the paper-folding art can also be applied to making a microfluidic device for a blood test, or for storing a satellite's solar panel in a rocket's cargo bay. A team of researchers is turning kirigami, a related art form that allows the paper to be cut, into a technique that can be applied equally to structures on those vastly divergent length scales. The researchers lay out the rules for folding and cutting a hexagonal lattice, a structure made from strips of material that cross over each other with spaces between, into a wide variety of useful three-dimensional shapes.A hexagonal lattice may seem like an odd choice for a starting point, but the researchers think that the pattern has advantages over a seemingly simpler tessellation, such as one made from squares; for instance, it is easier to fill a space with a hexagonal lattice and move from 2-D to 3-D. Starting from a flat hexagonal grid on a sheet of paper, the researchers outlined the fundamental cuts and folds that allow the resulting shape to keep the same proportions of the initial lattice, even if some of the material is removed. This is a critical quality for making the transition from paper to materials that might be used in real-world applications.Having a set of rules that draws on fundamental mathematical principles means that the kirigami approach can be applied equally across length scales, and with almost any material that can be selected on the basis of its relevance to the ultimate application, whether it is in nanotechnology, architecture, or aerospace.The rules also guarantee that "modules," basic shapes such as channels that can direct the flow of fluids, can be combined into more complex ones. Kirigami is particularly attractive for nanoscale applications, where the simplest, most space-efficient shapes are necessary, and self-folding materials would circumvent some of the fabrication challenges inherent in working with other materials at such small scales.Which of the following most aptly describes the function of the second paragraph?a)To introduce a discussion on the most critical aspect of the technique that dictates the transformation of origami from paper to potentially real structuresb)To highlight the scope of kirigami across various applicationsc)To suggest how maintaining a quality of the technique of kirigami is key to its application to various materialsd)To evaluate some key features of the technique of kirigamie)To analyze what makes kirigami a successful technique for fabricating materialsCorrect answer is option 'D'. Can you explain this answer? in English & in Hindi are available as part of our courses for GMAT. Download more important topics, notes, lectures and mock test series for GMAT Exam by signing up for free.

Here you can find the meaning of Origami is capable of turning a simple sheet of paper into a pretty paper crane, but the principles behind the paper-folding art can also be applied to making a microfluidic device for a blood test, or for storing a satellite's solar panel in a rocket's cargo bay. A team of researchers is turning kirigami, a related art form that allows the paper to be cut, into a technique that can be applied equally to structures on those vastly divergent length scales. The researchers lay out the rules for folding and cutting a hexagonal lattice, a structure made from strips of material that cross over each other with spaces between, into a wide variety of useful three-dimensional shapes.A hexagonal lattice may seem like an odd choice for a starting point, but the researchers think that the pattern has advantages over a seemingly simpler tessellation, such as one made from squares; for instance, it is easier to fill a space with a hexagonal lattice and move from 2-D to 3-D. Starting from a flat hexagonal grid on a sheet of paper, the researchers outlined the fundamental cuts and folds that allow the resulting shape to keep the same proportions of the initial lattice, even if some of the material is removed. This is a critical quality for making the transition from paper to materials that might be used in real-world applications.Having a set of rules that draws on fundamental mathematical principles means that the kirigami approach can be applied equally across length scales, and with almost any material that can be selected on the basis of its relevance to the ultimate application, whether it is in nanotechnology, architecture, or aerospace.The rules also guarantee that "modules," basic shapes such as channels that can direct the flow of fluids, can be combined into more complex ones. Kirigami is particularly attractive for nanoscale applications, where the simplest, most space-efficient shapes are necessary, and self-folding materials would circumvent some of the fabrication challenges inherent in working with other materials at such small scales.Which of the following most aptly describes the function of the second paragraph?a)To introduce a discussion on the most critical aspect of the technique that dictates the transformation of origami from paper to potentially real structuresb)To highlight the scope of kirigami across various applicationsc)To suggest how maintaining a quality of the technique of kirigami is key to its application to various materialsd)To evaluate some key features of the technique of kirigamie)To analyze what makes kirigami a successful technique for fabricating materialsCorrect answer is option 'D'. Can you explain this answer? defined & explained in the simplest way possible. Besides giving the explanation of Origami is capable of turning a simple sheet of paper into a pretty paper crane, but the principles behind the paper-folding art can also be applied to making a microfluidic device for a blood test, or for storing a satellite's solar panel in a rocket's cargo bay. A team of researchers is turning kirigami, a related art form that allows the paper to be cut, into a technique that can be applied equally to structures on those vastly divergent length scales. The researchers lay out the rules for folding and cutting a hexagonal lattice, a structure made from strips of material that cross over each other with spaces between, into a wide variety of useful three-dimensional shapes.A hexagonal lattice may seem like an odd choice for a starting point, but the researchers think that the pattern has advantages over a seemingly simpler tessellation, such as one made from squares; for instance, it is easier to fill a space with a hexagonal lattice and move from 2-D to 3-D. Starting from a flat hexagonal grid on a sheet of paper, the researchers outlined the fundamental cuts and folds that allow the resulting shape to keep the same proportions of the initial lattice, even if some of the material is removed. This is a critical quality for making the transition from paper to materials that might be used in real-world applications.Having a set of rules that draws on fundamental mathematical principles means that the kirigami approach can be applied equally across length scales, and with almost any material that can be selected on the basis of its relevance to the ultimate application, whether it is in nanotechnology, architecture, or aerospace.The rules also guarantee that "modules," basic shapes such as channels that can direct the flow of fluids, can be combined into more complex ones. Kirigami is particularly attractive for nanoscale applications, where the simplest, most space-efficient shapes are necessary, and self-folding materials would circumvent some of the fabrication challenges inherent in working with other materials at such small scales.Which of the following most aptly describes the function of the second paragraph?a)To introduce a discussion on the most critical aspect of the technique that dictates the transformation of origami from paper to potentially real structuresb)To highlight the scope of kirigami across various applicationsc)To suggest how maintaining a quality of the technique of kirigami is key to its application to various materialsd)To evaluate some key features of the technique of kirigamie)To analyze what makes kirigami a successful technique for fabricating materialsCorrect answer is option 'D'. Can you explain this answer?, a detailed solution for Origami is capable of turning a simple sheet of paper into a pretty paper crane, but the principles behind the paper-folding art can also be applied to making a microfluidic device for a blood test, or for storing a satellite's solar panel in a rocket's cargo bay. A team of researchers is turning kirigami, a related art form that allows the paper to be cut, into a technique that can be applied equally to structures on those vastly divergent length scales. The researchers lay out the rules for folding and cutting a hexagonal lattice, a structure made from strips of material that cross over each other with spaces between, into a wide variety of useful three-dimensional shapes.A hexagonal lattice may seem like an odd choice for a starting point, but the researchers think that the pattern has advantages over a seemingly simpler tessellation, such as one made from squares; for instance, it is easier to fill a space with a hexagonal lattice and move from 2-D to 3-D. Starting from a flat hexagonal grid on a sheet of paper, the researchers outlined the fundamental cuts and folds that allow the resulting shape to keep the same proportions of the initial lattice, even if some of the material is removed. This is a critical quality for making the transition from paper to materials that might be used in real-world applications.Having a set of rules that draws on fundamental mathematical principles means that the kirigami approach can be applied equally across length scales, and with almost any material that can be selected on the basis of its relevance to the ultimate application, whether it is in nanotechnology, architecture, or aerospace.The rules also guarantee that "modules," basic shapes such as channels that can direct the flow of fluids, can be combined into more complex ones. Kirigami is particularly attractive for nanoscale applications, where the simplest, most space-efficient shapes are necessary, and self-folding materials would circumvent some of the fabrication challenges inherent in working with other materials at such small scales.Which of the following most aptly describes the function of the second paragraph?a)To introduce a discussion on the most critical aspect of the technique that dictates the transformation of origami from paper to potentially real structuresb)To highlight the scope of kirigami across various applicationsc)To suggest how maintaining a quality of the technique of kirigami is key to its application to various materialsd)To evaluate some key features of the technique of kirigamie)To analyze what makes kirigami a successful technique for fabricating materialsCorrect answer is option 'D'. Can you explain this answer? has been provided alongside types of Origami is capable of turning a simple sheet of paper into a pretty paper crane, but the principles behind the paper-folding art can also be applied to making a microfluidic device for a blood test, or for storing a satellite's solar panel in a rocket's cargo bay. A team of researchers is turning kirigami, a related art form that allows the paper to be cut, into a technique that can be applied equally to structures on those vastly divergent length scales. The researchers lay out the rules for folding and cutting a hexagonal lattice, a structure made from strips of material that cross over each other with spaces between, into a wide variety of useful three-dimensional shapes.A hexagonal lattice may seem like an odd choice for a starting point, but the researchers think that the pattern has advantages over a seemingly simpler tessellation, such as one made from squares; for instance, it is easier to fill a space with a hexagonal lattice and move from 2-D to 3-D. Starting from a flat hexagonal grid on a sheet of paper, the researchers outlined the fundamental cuts and folds that allow the resulting shape to keep the same proportions of the initial lattice, even if some of the material is removed. This is a critical quality for making the transition from paper to materials that might be used in real-world applications.Having a set of rules that draws on fundamental mathematical principles means that the kirigami approach can be applied equally across length scales, and with almost any material that can be selected on the basis of its relevance to the ultimate application, whether it is in nanotechnology, architecture, or aerospace.The rules also guarantee that "modules," basic shapes such as channels that can direct the flow of fluids, can be combined into more complex ones. Kirigami is particularly attractive for nanoscale applications, where the simplest, most space-efficient shapes are necessary, and self-folding materials would circumvent some of the fabrication challenges inherent in working with other materials at such small scales.Which of the following most aptly describes the function of the second paragraph?a)To introduce a discussion on the most critical aspect of the technique that dictates the transformation of origami from paper to potentially real structuresb)To highlight the scope of kirigami across various applicationsc)To suggest how maintaining a quality of the technique of kirigami is key to its application to various materialsd)To evaluate some key features of the technique of kirigamie)To analyze what makes kirigami a successful technique for fabricating materialsCorrect answer is option 'D'. Can you explain this answer? theory, EduRev gives you an ample number of questions to practice Origami is capable of turning a simple sheet of paper into a pretty paper crane, but the principles behind the paper-folding art can also be applied to making a microfluidic device for a blood test, or for storing a satellite's solar panel in a rocket's cargo bay. A team of researchers is turning kirigami, a related art form that allows the paper to be cut, into a technique that can be applied equally to structures on those vastly divergent length scales. The researchers lay out the rules for folding and cutting a hexagonal lattice, a structure made from strips of material that cross over each other with spaces between, into a wide variety of useful three-dimensional shapes.A hexagonal lattice may seem like an odd choice for a starting point, but the researchers think that the pattern has advantages over a seemingly simpler tessellation, such as one made from squares; for instance, it is easier to fill a space with a hexagonal lattice and move from 2-D to 3-D. Starting from a flat hexagonal grid on a sheet of paper, the researchers outlined the fundamental cuts and folds that allow the resulting shape to keep the same proportions of the initial lattice, even if some of the material is removed. This is a critical quality for making the transition from paper to materials that might be used in real-world applications.Having a set of rules that draws on fundamental mathematical principles means that the kirigami approach can be applied equally across length scales, and with almost any material that can be selected on the basis of its relevance to the ultimate application, whether it is in nanotechnology, architecture, or aerospace.The rules also guarantee that "modules," basic shapes such as channels that can direct the flow of fluids, can be combined into more complex ones. Kirigami is particularly attractive for nanoscale applications, where the simplest, most space-efficient shapes are necessary, and self-folding materials would circumvent some of the fabrication challenges inherent in working with other materials at such small scales.Which of the following most aptly describes the function of the second paragraph?a)To introduce a discussion on the most critical aspect of the technique that dictates the transformation of origami from paper to potentially real structuresb)To highlight the scope of kirigami across various applicationsc)To suggest how maintaining a quality of the technique of kirigami is key to its application to various materialsd)To evaluate some key features of the technique of kirigamie)To analyze what makes kirigami a successful technique for fabricating materialsCorrect answer is option 'D'. Can you explain this answer? tests, examples and also practice GMAT tests.