Jump to content

Flashcard

From Wikipedia, the free encyclopedia
(Redirected from Three-sided flashcard)
A set of flashcards demonstrating the Leitner system. Cards that the learner knows are promoted to a box for less frequent review (indicated by green arrows); cards for which the learner has forgotten the meaning are demoted to be studied more frequently (indicated by red arrows).

A flashcard or flash card is a card bearing information on both sides, which is intended to be used as an aid in memorization. Each flashcard typically bears a question or definition on one side and an answer or target term on the other. Flashcards are often used to memorize vocabulary, historical dates, formulae or any subject matter that can be learned via a question-and-answer format. Flashcards can be virtual (part of a flashcard software), or physical.

Flashcards are an application of the testing effect − the finding that long-term memory is increased when some of the learning period is devoted to retrieving the information through testing with proper feedback. Study habits affect the rate at which a flashcard-user learns, and proper spacing of flashcards has been proven to accelerate learning.[1]

Use

[edit]

Flashcards exercise the mental process of active recall: given a prompt, one produces the answer. Beyond the content of cards, which are collected in decks, there is the question of use – how does one use the cards, in particular, how frequently does one review, and how does one react to errors, either complete failures to recall or mistakes? Various systems have been developed, mostly based around spaced repetition – increasing the time intervals between reviews whenever a card is recalled correctly.

Spaced repetition

[edit]

Spaced repetition is an evidence-based learning technique which incorporates increasing time intervals between each review of a flashcard in order to exploit the psychological spacing effect. Newly introduced and more difficult flashcards are shown more frequently while older and less difficult flashcards are shown less frequently. The use of spaced repetition has been shown to increase rate of learning.[2] Although the principle is useful in many contexts, spaced repetition is commonly applied in contexts in which a learner must acquire a large number of items and retain them indefinitely in memory. It is, therefore, well suited for the problem of vocabulary acquisition in the course of second language learning. Spaced repetition software has been developed to aid the learning process.[3]

Leitner system

[edit]
In the Leitner system, correctly answered cards are advanced to the next, less frequent box, while incorrectly answered cards return to the first box for more aggressive review and repetition.

The Leitner system is a widely used method of efficiently using flashcards that was proposed by the German science journalist Sebastian Leitner in the 1970s. It is a simple implementation of the principle of spaced repetition, where cards are reviewed at increasing intervals.

In this method, flashcards are sorted into groups according to how well the learner knows each one in the Leitner's learning box. The learners try to recall the solution written on a flashcard. If they succeed, they send the card to the next group. If they fail, they send it back to the first group. Each succeeding group has a longer period of time before the learner is required to revisit the cards. In Leitner's original method, published in his book So lernt man Lernen (How to learn to learn), the schedule of repetition was governed by the size of the partitions in the learning box. These were 1, 2, 5, 8 and 14 cm. Only when a partition became full was the learner to review some of the cards it contained, moving them forward or back depending on whether they remembered them.

Software

[edit]
Example of a virtual flashcard: using flashcard software Anki to review a mathematical formula. First, only the question is displayed. Then the answer is displayed too, for verification.

There is a wide range of software (including open source and online services) available for creating and using virtual flashcards as an aid to learning.

Two-sided cards

[edit]

Physical flashcards are two-sided; in some contexts one wishes to correctly produce the opposite side upon being presented with either side, such as in foreign language vocabulary; in other contexts one is content to go in only one direction, such as in producing a poem given its title or incipit (opening). For physical flashcards, one may either use a single card, flipping it according to the direction, or two parallel decks, such as one English-Japanese and one Japanese-English. They have a number of uses and can be simple or elaborate depending on the user.

Example

[edit]

An English-speaking student learning the Chinese word (rén, person or people):

Q: person
A: 人, rén

Reverse:

Q: 人
A: rén, person

Three-sided cards

[edit]

Physical flashcards are necessarily two-sided. A variant, found in electronic flashcards, is what is known as a three-sided card.[4] This is a particular kind of asymmetric two-sided card; abstractly, such a card has three fields, Q, A, A*, where Q & A are reversed on flipping, but A* is always in the answer – the two "sides" are thus Q/A,A* and A/Q,A*. Concretely, these are most used for learning foreign vocabulary where the foreign pronunciation is not transparent from the foreign writing – in this case, the Question is the native word, the Answer is the foreign word (written), and the pronunciation is always part of the answer (Answer*). This is particularly the case for Chinese characters, as in Chinese hanzi and Japanese kanji, but can also be used for other non-phonetic spellings, including English as a second language.

The purpose of three-sided cards is to provide the benefits of two-sided cards – ease of authoring (enter data once to create two cards), synchronized updates (changes to one are reflected in the other), and spacing between opposite sides (so opposite sides of the same card are not tested too close together) – without the card needing to be symmetric.

One can generalize this principle to an arbitrary number of data fields associated with a single record, with each field representing a different aspect of a fact or bundle of facts.

History

[edit]

Paper flashcards have been used since at least the 19th century, with Reading Disentangled (1834), a set of phonics flashcards by English educator Favell Lee Mortimer being credited by some as the first flashcards.[5] Previously, a single-sided hornbook had been used for early literacy education.

The Leitner system for scheduling flashcards was introduced by German scientific journalist Sebastian Leitner in the 1970s, specifically his 1972 So lernt man lernen. Der Weg zum Erfolg (How to learn to learn),[6] while the SuperMemo program and algorithm (specifically the SM-2 algorithm, which is the most popular in other programs) was introduced on December 13, 1987, by Polish researcher Piotr Woźniak.[7]

References

[edit]
  1. ^ Endres, Tino; Renkl, Alexander (2015-07-24). "Mechanisms behind the testing effect: an empirical investigation of retrieval practice in meaningful learning". Frontiers in Psychology. 6: 1054. doi:10.3389/fpsyg.2015.01054. ISSN 1664-1078. PMC 4513285. PMID 26257696.
  2. ^ Smolen, Paul; Zhang, Yili; Byrne, John H. (25 January 2016). "The right time to learn: mechanisms and optimization of spaced learning". Nature Reviews Neuroscience. 17 (2): 77–88. arXiv:1606.08370. Bibcode:2016arXiv160608370S. doi:10.1038/nrn.2015.18. PMC 5126970. PMID 26806627.
  3. ^ "Human Memory: Theory and Practice", Alan D. Baddeley, 1997
  4. ^ Adding images, sounds, mathematical formulas, and three-sided cards on The Mnemosyne Project
  5. ^ The Clumsiest People in Europe: Or, Mrs. Mortimer's Bad-Tempered Guide to the Victorian World, Favell Lee Mortimer, foreword by Todd Pruzan, 2006 edition, p. 5
  6. ^ So lernt man lernen. Der Weg zum Erfolg (How to learn to learn), Freiburg i. Br. 1972/2003, ISBN 3-451-05060-9
  7. ^ 3. Account of research leading to the SuperMemo method, 3.1. The approximate function of optimal intervals Archived 2019-03-09 at the Wayback Machine and 3.2. Application of a computer to improve the results obtained in working with the SuperMemo method, P. A. Wozniak, Optimization of learning, Master's Thesis, University of Technology in Poznan, 1990.