Math group2 BLOCK A

Math group2 BLOCK A

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Photos from Math group2 BLOCK A's post 15/12/2021

Fractals are used to predict or analyze various biological processes or phenomena such as the growth pattern of bacteria, the pattern of situations such as nerve dendrites, etc. And speaking of imaging, one of the most important uses of fractals is with regards to image compressing.
-In my fractal grids I use the square shape to create a pattern. The pattern i present in my grids is translational symmetry.

Submitted by: Melody F. Leonardo

Photos from Math group2 BLOCK A's post 15/12/2021

I made fractal triangle composed of smaller and smallet triangles.The Sierpinski triangle illustrates the fundamental principles of fractals-how a pattern can repeat again and again at different scales and how this complex shape formed by simple repitition.

Submitted by: Hannah Katrina B. Fang

Photos from Math group2 BLOCK A's post 15/12/2021

Fractals can be found in almost every element of existence. To write the definitive reference to knowing what fractals are because the phrase is becoming increasingly extensively used. To be categorized as a gractal, a shape does not have to be similar. Instead, the key condition for being categorized as a fractal is that the shapes have intrinsic and recurrent similarities.
Doing my own fractals I realized not that easy to make like my expectation. Fractals is totally complex to create my fractal. While making this, I'd said to myself that fractals is connected to our life everyday.

Submitted by: Angelika Doria
Submitted to: Mr. Emilio Aspuria Jr.

BsCRIM- BLOCK A

Photos from Math group2 BLOCK A's post 15/12/2021

Estonilo, Jr. Baltazar R.
Block-A

The reflection and transmission properties of finely divided fractal layers are investigated and characterized. The results for electromagnetic or optical waves normally incident upon Cantor bar fractal layers are found for different stages of fractal growth. We develop a new exact self-similar algorithm that makes use of the self-similarity of these structures. This fractal computational scheme provides the reflection and transmission coefficients for hundreds or thousands, or more, of fractally distributed layers with extreme economy when compared with traditional approaches.

Photos from Math group2 BLOCK A's post 14/12/2021

A fractal is an object or quantity that displays self-similarity in a somewhat technical sense.Objects do not need to show exactly the same structure on all scales, but the same struture must appear on all scales.Thus the urban desricption based on characterristic lengths should be replaced by urban characterization based on scaling.Fractal geometry is one powerful tool for the scaling analysis of cities.Fractal parameters can be defined by entropy and correlation functions.

Submitted by:Estacio Gerald V.

14/12/2021

Fractal mathematics has many practical uses too — for example, in producing stunning and realistic computer graphics, in computer file compression systems,and in the architecture of the networks that make up the internet.

Not just in the making and/or capturing computer graphics, Plants 'nor trees are fractals.But also, "we" as "humans" our circulatory system, brain, even our whole body are just like a fractals, it has a different parts that binds together.

Submitted by:Gali, Carline Mae L.

Photos from Math group2 BLOCK A's post 14/12/2021

Fractal geometry can also provide a way to understand complexity in "systems" as well as just in shapes. The timing and sizes of earthquakes and the variation in a person's heartbeat and the prevalence of diseases are just three cases in which fractal geometry can describe the unpredictable.
Fractals help us study and understand important scientific concepts, such as the way bacteria grow, patterns in freezing water (snowflakes) and brain waves, for example. Their formulas have made possible many scientific breakthroughs.
A fractal is a never-ending pattern. Fractals are infinitely complex patterns that are self-similar across different scales. They are created by repeating a simple process over and over in an ongoing feedback loop. Driven by recursion, fractals are images of dynamic systems – the pictures of Chaos.

Submitted by: Julie Anne Garcia
Submitted to: Mr. Emilio Garcia Aspuria

Photos from Math group2 BLOCK A's post 14/12/2021

A fractal is a never-ending pattern. Fractals are infinitely complex patterns that are self-similar across different scales. They are created by repeating a simple process over and over in an ongoing feedback loop. Driven by recursion, fractals are images of dynamic systems – the pictures of Chaos. Geometrically, they exist in between our familiar dimensions. Fractal patterns are extremely familiar, since nature is full of fractals

SUBMITTED BY: FLORES JOHNPAUL
SUBMITTED TO: EMILIO GARCIA ASPURIA

14/12/2021

A fractal is a never-ending pattern. Fractals are infinitely complex patterns that are self-similar across different scales. They are created by repeating a simple process over and over in an ongoing feedback loop. Driven by recursion, fractals are images of dynamic systems – the pictures of Chaos. Geometrically, they exist in between our familiar dimensions. Fractal patterns are extremely familiar, since nature is full of fractals

SUBMITTED BY: ORLANDO GARCIA DAZ JR
SUBMITTED TO: EMILIO GARCIA ASPURIA

30/11/2021

Statistics is the discipline that concerns the collection, organization, analysis, interpretation, and presentation of data. In a statistical figure that represents the distribution`s center or average, Averages are a common term for measures of central tendency. The term "central tendency" is occasionally used by authors to describe "the tendency of quantitative data to cluster around some central value. " The central tendency of a distribution is often contrasted with its dispersion or variability; Dispersion and central tendency are often characteristic properties of distributions.

In other words, for a measure of statistical dispersion, a measure of central tendency is required that minimizes variability: such that the change from the center is the smallest among all the choices of the median.
The most common position measures are percentages, quarters, and standard scores (also known as zscores). An observation at the 50th percentile would be the group mean. Quartiles divide a classified data set into four equal parts. A standard score (aka zscore score) indicates the number of standard deviations of an item from the mean. Where z is the z score, X is the item value, is the population mean, and is the standard deviation.

Submitted by: Angelika Doria
Submitted to: Mr. Emilio Garcia Aspuria

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