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Instructional scaffolding is the support given to a student by an instructor throughout the learning process. This support is specifically tailored to each student; this instructional approach allows students to experience student-centered learning, which tends to facilitate more efficient learning than teacher-centered learning.
This term 'scaffolding' is a useful metaphor that is used to symbolise the process of supporting a learner in the early stages of the learning process – as the walls get higher – until there is sufficient evidence of knowledge and skills having been acquired, to then be able to remove that scaffolding so the learner is able to 'stand alone ...
A person does not copy the dance moves exactly, but takes what they can and adds their own personality to it. [18] In mathematics, proximal development uses mathematical exercises for which students have seen one or more worked examples. In secondary school some scaffolding is provided, and generally much less at the tertiary level.
Through the dialogic nature of scaffolding, the student and teacher interact in order to establish the optimal amount of assistance and titration of this assistance. At the heart of the creation of the scaffolding extension to distributed scaffolding, was the need to address the many different ways a scaffold could be provided.
A.M. – arithmetic mean. AP – arithmetic progression. arccos – inverse cosine function. arccosec – inverse cosecant function. (Also written as arccsc.) arccot – inverse cotangent function. arccsc – inverse cosecant function. (Also written as arccosec.) arcexc – inverse excosecant function. (Also written as arcexcsc, arcexcosec.)
Depending on authors, the term "maps" or the term "functions" may be reserved for specific kinds of functions or morphisms (e.g., function as an analytic term and map as a general term). mathematics See mathematics. multivalued A "multivalued function” from a set A to a set B is a function from A to the subsets of B.
The Principles and Standards for School Mathematics was developed by the NCTM. The NCTM's stated intent was to improve mathematics education. The contents were based on surveys of existing curriculum materials, curricula and policies from many countries, educational research publications, and government agencies such as the U.S. National Science Foundation. [3]
Authentic instruction will take on a much different form than traditional teaching methods. In the traditional classroom, students take a passive role in the learning process. Knowledge is considered to be a collection of facts and procedures that are transmitted from the teacher to the student.