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Jamal Malik sucht seine verlorene Liebe Latika mit allen Mitteln. Schließlich nimmt er aus diesem Grund auch an der Show "Wer wird Millionär?" teil. Der Film erklärt auf bezaubernde Weise, wieso ein verarmter junger Mann aus den Slums es in die Sendung geschafft hat und warum er alle Fragen beantworten kann.
Wahre Kunst kann nur mit der richtigen Inspiration erschaffen werden. Und in der richtigen Stimmung. Und nicht, während es Streit mit den Frauen gibt. Das muss der Schriftsteller James Lord feststellen, als er zusagt, für den genialen, aber emotionalen Alberto Giacometti Modell für ein Porträt zu sitzen.
Our muscles work miracles. We can run long distances and perform complex coordinative movements. Our muscles need energy to do so. Adenosine triphosphate, ATP for short, is essential in the provision of energy to muscles. Because without ATP, muscles cannot contract. This film explains how the ATP gets to and feeds the muscles.
Twenty-four hours fit into a day, 60 minutes into an hour - time is a little more complicated to learn than other units of measurement with their simple tenths and hundredths. This video uses vivid animations to explain how to read the clock. The viewer also learns how and why people began to measure time.
Daniel Blake hätte nie gedacht, dass er einmal auf staatliche Hilfe angewiesen sein würde, doch dann kommt es dazu - aus gesundheitlichen Gründen. Erst arrangiert sich Daniel damit, doch als er an den bürokratischen Klippen des "Sozialstaats" scheitert, verwandelt sich bei ihm die Ohnmacht langsam in Wut.
In logistic growth, exponential and bounded growth are combined. The curve of a logistic growth starts exponential. In the middle it becomes approximately linear, and it finally ends at a limit which cannot be exceeded. The video explains the formula and gives some illustrative examples from everyday life.
Three laws of arithmetic - the commutative law, the distributive law and the associative law - make arithmetic easier. The film introduces the three laws, explains their meaning and gives the corresponding formulae. The content of each law is summarized in an understandable way in a short and catchy mnemonic.
This film explains linear equations and their graphical representation. A linear equation, in which there is exactly one y-value for each x-value, is a linear function. The general functional rule for a linear function is y = m * x + b, the corresponding graph is a straight line with the gradient m and the y-axis section b.
Die Film Flat bietet über 8.000 rechtssichere Unterrichtsfilme für alle Schulformen, Fächer und Altersklassen. Das Angebot umfasst Lehrfilme, Dokumentationen und Spielfilme. Lehrkräfte können die Videos streamen, herunterladen und mit ihren Schülerinnen und Schülern teilen.
The subject of this film is linear equations. Equations are made up of a series of mathematical symbols with logical connections that are linked by an equals sign. An equation is always linear if the variables do not occur in any power higher than the 1st. Linear equations are solved using equivalence transformations.
The basics of interest calculation are presented using practical examples. Credit, capital, interest rate and term are explained. Clear calculation examples explain how the interest rate affects the amount of money that has to be paid back. The different terms of loans and per annum interest are also introduced.
This film uses an example from everyday school life to demonstrate the intercept theorems when scaling a triangle centrally. The first and second intercept theorems are explained and shown in detail using specific problems. The benefit in daily life is then also shown when calculating a difficult to measure length.
The subject of this film is improper fractions. In top-heavy fractions the numerator is a multiple of the denominator. Top-heavy fractions can therefore be converted into whole numbers using reduction. The film uses clear examples to explain what top-heavy fractions are and how to calculate with them.
We are familiar with the term growth from everyday life. Children grow, the state´s mountain of debt grows, the number of computer users worldwide too. Generally we can say: if any size increases with time, we refer to growth. This film explains the term growth in detail, including positive and negative growth.
For comparison and calculation, fractions can be expanded until they have the same denominator. To do this, the numerator and denominator are multiplied by the same number, whereby the valence does not change. If the numerator and denominator have a common divisor, you can reduce the fraction by this number.
The film explains how the fraction bar, the numerator, and the denominator work: The denominator gives the fraction its name, while the numerator gives the number of parts. It is shown that fractions with the same name can easily be added. The fraction calculation is illustrated with everyday examples.
Limited growth is characterized by the fact that it does not exceed a certain limit or bound. The film explains limited growth using several catchy examples from the economy, nature and everyday life, explains the recursive function equation and finally illustrates limited growth with an exponential function.
You multiply fractions with integers by keeping the denominator and multiplying the numerator by the number, and using the reduction advantage. If you have parent fractions, you multiply the denominators together. If you have different fractions, you multiply numerators by numerators and denominators by denominators.
The audience learns what exponential growth is through the legend of Buddhiram, the inventor of chess. The video explains the recursive and explicit functional equations and shows how both positive and negative exponential growth work. Exponential, linear and quadratic growth are compared with each other.
Using examples from everyday life as well as animations and real models, we show you how the surfaces of different geometric figures can be understood using grids. Clear examples of the grids of tetrahedrons, square pyramids, cuboids, and prisms as well as complicated shapes such as cylinders and cones are shown.
The subject of this film is the graphical representation of percentage calculations. The principle of visualizing parts and their proportions in histograms or pie charts is explained. The various criteria that have to be taken into account to reach a reliable and accurate graphical representation are looked at.
This film introduces the construction and the daily use of circles. Easy-to-understand practical examples show how circles can be made with the help of a compass or using string, and how important these geometric shapes are in navigation and shipping. The uses of the circle in art are also mentioned in this film.
When adding or reducing fractions, it is helpful to know the least common multiple and the greatest common divisor. The video shows how to find these numbers using several illustrative examples. Both denominators or both denominators and numerators must be reduced with the help of the prime factorization.
This film introduces the mathematical expression "term" and sets out the arithmetical rules for terms. Variables are also introduced as substitutes for numbers and we explain how they can usefully be used in various formulas. The difference between dependent and independent variables is also clearly shown.
The subject of this film is negative numbers. It was René Descartes who extended the series of numbers named after him beyond zero. Gabriel Fahrenheit worked with negative numbers to measure temperatures. The film shows at which points negative numbers can be helpful and how they fit into the number system.
This film is about multiplying and dividing negative numbers. Easy-to-understand animations show how numbers with different signs can be multiplied by each other. Calculations on the number line are demonstrated and translated to everyday situations. Calculations with negative fractions are also explained.
By means of the prime factorization, one can get a good overview of the divisor set of a number. The film uses several examples to show how this decomposition works and in which cases it is unique. Since the calculation can quickly become confusing with large numbers, you can also help yourself with powers.
The subject of this film is the rule of three, which will be presented and explained here using various everyday school examples. Terms such as proportional and reciprocal correlation are explained. Clear example calculations also show how principles such as "the more, the more" and "the more, the less" are used mathematically.
Rounding means making numbers less precise and as a result easier to calculate with. But in such a way that they are still precise enough for their purpose. This film introduces the rounding rule according to DIN 1333 using clear everyday examples. We also look at rounding errors and rounding already rounded numbers.
Roman numerals are still used relatively often today. Therefore, the film explains how to read them correctly and transfer them to our number system. It explains the history of the numbers from the beginning, describes the expansion of the system, and points out the special features of the numbers 4 and 9.