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2.03.2017

Non-inertial engine of the UFO

Last time we considered the fine-molded engine which is used in our technique. The main shortcoming - they do not save the vehicle from influence of inertial forces. Our observations show that the UFO can instantly change speed, can turn at a huge speed at right angle. It breaks the fundamental law of physics - a law of inertia. We consider that it is impossible. If such flights are impossible, means and the UFO does not exist. Our such logic.

Whether it is possible to bypass laws of inertia, without breaking them? Of course. Let's consider the principle of operation non-inertial engine of the UFO. It is the engine of absolutely other type - volume action. This engine creates internal gravitational field of the variable direction and force in the UFO. Internal gravitational field of the UFO forms selfcontained space around its design. All device UFO is as if wrapped in a cocoon.

How we overcome inertial forces? We considered our terrestrial engines earlier. In each car there are seat belts for overcoming an inertial force. Internal gravitational field of the UFO allows to overcome inertial forces at the atomic level. Each atom of a body of the extraterrestrial has the seat belt. The observer will think that inertial forces do not act on the UFO.

Non-inertial engine of the UFO. Extra-terrestrials. Mathematics For Blondes
Non-inertial engine of the UFO
It is absolutely prime further and we know it long ago. If equally effective internal gravitational field of the UFO it is equal to the gravity operating on it, then the UFO not movably. If the common force is directed up at an angle, then you need the help of trigonometry. It is a task from our, terrestrial, textbooks.

The crew of the UFO constantly is in an imponderability. The UFO constantly is in falling. For the UFO does not matter in what party and with what speed to fall. If to equip your car with the non-inertia gravitational engine, it will turn into the UFO. I do not recommend to leave limits of an Earth's atmosphere - the car housing is not calculated on it.

The UFOs non-inertial engines fall into a class of planetary engines, as well as our rocket engines. With their help it is possible to explore planets in star systems. Between star systems non-inertial engines are not suitable for travel. They have very small effectiveness on overcoming distances in space. For this purpose extraterrestrials use other type of driving - teleportation.

Why I speak about other type of driving here? The non-inertial engine and teleportation are based on one mathematical principle - the principle of closed space. In different engines different physical fields turn into closed space. The UFOs non-inertial engine closes gravitational field.

How to close space? Ask this question to our mathematicians. In reply we will hear infinitely sad song of magicians that in different sections mathematicians are different approaches to this question.

Our physicists and engineers took the first step on the way of use of physical fields for driving. In electric motors the principle of the rotating magnetic field is used. We use a magnetic levitation.

What else convinces me of reality of the UFO? Form of aircraft of extraterrestrials. You sometime heard about the cube flying in a palate? I did not hear too. Sense here not only in streamline shapes of the UFO. Physical fields have no right angles and polygonal lines.

I expect your question: if UFOs and extraterrestrials really fly over our planet, then why they do not come to us into contact? We will talk about it somehow another time.

If you liked the publication and you want to know more, help me with working on by other publications.

2.01.2017

Engines and inertia

Be not surprised to the fact that now we will speak about engines and inertia. This introduction to more fascinating conversation on extra-terrestrials and their UFO. We will speak with engaging of mathematical concepts. But before to discuss extra-terrestrials, let's talk about us and the level of development of our technique.

And so, we will begin with mathematics. The matter is that all our engines are engines of dot type. Somewhere energy gathers, concentrates in one point, and then this energy is redistributed on a design of the movable device. We will not press in a jungle of mechanics and a vector algebra, we will talk about the principle.

Let's begin with the horse cart. The horse is attached to the vehicle and pulls it. The horse cart vehicle transports everything that on it is. A red arrow on the picture I noted the place of influence of strength of a horse.

The horse cart. Mathematics For Blondes.
The horse cart
To shift the loaded horse cart, it is necessary to overcome an inertial force of the horse cart and freight. At change of speed or the direction of driving, the inertial force will force to move the horse cart in the former direction with a former speed.

Car. All saw it. All cylinders transfer the effort to a shaft in the engine of the car. This shaft rotates wheels, wheels rest against the earth and all miracle of automotive vehicles starts moving, overcoming an inertial force. Inertial forces work after collision of the car with an obstacle. Seat belts of the car counteract inertial forces.

Rocket engine. The rocket can pull the horse vehicle. The principle of the dot engine does not change. On the rocket engine we load a payload and the rocket engine pushes it to the planned purpose, overcoming inertial forces.

We use atomic energy. In the steam engine earlier we used firewood and coal. Now we use nuclear fuel. The dot principle of the steam engine remains invariable. We cannot turn gamma rays into light rays.

We learned to use fire. We know many ways as fire to get. We know many ways as fire to extinguish. But there are fires which we cannot extinguish.

Now it is possible to talk about extra-terrestrials and the UFO. Very few people doubt that for flights extra-terrestrials use the anti-gravitational engine. But how they overcome an inertial force? We transfer the principle of our terrestrial dot engines to extra-terrestrial aircraft. Can they fly by other principle? We will talk about it next time.

1.30.2017

Decomposition on items

Subject of occupations:
TRIGONOMETRIC FUNCTIONS IN A RECTANGLE
Subject of the previous lesson
Addition

Lesson 16

Decomposition on items


If only the result of addition is known and items are unknown, then the sum can be spread out to items by means of the linear angular functions.

Decomposition of the sum on items. Mathematics For Blondes.
Decomposition of the sum on items

Transformation of a square of quantity to the work of two sums (see an example above), it is possible to execute with application of decomposition of result of multiplication to multipliers and items.

Transformation of a square to the work of the sums. Mathematics For Blondes.
Transformation of a square to the work of the sums

Similitudes can be useful when studying various natural phenomena to their best comprehension. Let's review an example of reproduction of living beings.

Asexual reproduction of live organisms can be described by means of decomposition of the sum on items. As a result of division of an organism A two self-contained organisms B and C.

Asexual reproduction. Mathematics For Blondes.
Asexual reproduction

Decomposition on items with corners about 45 degrees, is characteristic of unicells. For metaphytes the range of an angle of decomposition varies in wider limits (a vegetative reproduction, budding, fragmentation). The unit of measure at decomposition can be considered a physical body of an organism.

The beginning of life (zero) of similar organisms can be considered the moment of division of a parental organism. The termination of life (unit) can be considered characteristic division or death.

Sexual reproduction is described by means of multiplication. The moment of emergence of sexual reproduction can be described by means of the linear angular functions. At simultaneous reproduction of organisms A and B there was the common stream C which had signs of two parents.

Emergence of sexual reproduction. Mathematics For Blondes.
Emergence of sexual reproduction

What have to be the angles of decomposition for emergence of the common offspring? The most probable candidates in "invented" sexual reproduction it is a larger cage and a virus. The virus breeds in a cage. Along with cell division there was a division of a virus. The result was a new body. Or two body - male M and female W.

Male and female. Mathematics For Blondes.
Male and female
Molecule DNA which is available both for a cage, and for a virus could act as a basis for addition (unit of measure).

It is only one of a set of options of possible succession of events. From the moment of emergence of life on Earth until emergence of sexual reproduction in the Nature was enough time for the most different experiments.

Closing part

Further studying of properties of units of measure will help to understand better and more precisely to describe by mathematical methods various phenomena in the world around.

The separate ideas published in this work will be considered in more detail in the subsequent publications.

Gratitude

I express sincere gratitude to the parents and the daughter Inna for financial support of my working on with mathematics.

Addition

Subject of occupations:
TRIGONOMETRIC FUNCTIONS IN A RECTANGLE
Subject of the previous lesson
The linear angular functions

Lesson 15

Addition


As a result of addition of two different quantities the third quantity turns out. At addition of change occurs in a number domain, the area of units of measure does not change. Addition is possible only for parallel quantities with identical units of measure. Addition reflects the quantitative changes of quantities.

5а+3а=(5+3)а=8а

For realization of addition of two different quantities with units of measure in different scales (the corner of scale of units of measure is not equal to zero), it is necessary to change the scale of units of measure so that the scale corner between them equaled to zero. At the same time does not matter, the first item, the second or both changes at once.

It is impossible to put two identical numbers with different units of measure as the result does not make sense.

5а+5b=5(a+b)

Transformation of result of addition of pieces to the parties of a rectangle looks so.

Addition and rectangle. Mathematics For Blondes.
Addition and rectangle


Items can be presented as the party of a rectangle, then a half of perimeter of a rectangle is result of addition. For any sum it is possible to define the linear angular functions if items are known.

At the following lesson we will consider
Decomposition on items

9.03.2016

The linear angular functions

Subject of occupations:
TRIGONOMETRIC FUNCTIONS IN A RECTANGLE
Subject of the previous lesson
Division

Lesson 14

The linear angular functions


If to consider terminating trigonometric functions as coordinates of points of a unit circle in a Cartesian coordinate system, then the linear angular functions are coordinates of points of the chord connecting circle cross points to a coordinate. The sum of coordinates of any point of this chord is always equal to unit.

The linear angular functions. Mathematics For Blondes.
The linear angular functions


In mathematician of a concept, similar to the linear angular functions, are used since ancient times - it is division whole on a part. In the modern world an analog are percent.

The explanation for readers of this website. For myself I called the linear angular functions "linos" and "loses". How I thought up these names? Took designation of a sine and cosine. Visually they quite well differ. In each designation I replaced the first letter with the Latin letter "l" from the word "line". It turned out quite nicely. But to solve to you. Whether these functions in mathematician will get accustomed and as they will be called - time will show. I just offer one more mathematical tool for the description of reality.

At the following lesson we will consider
Addition

Division

Subject of occupations:
TRIGONOMETRIC FUNCTIONS IN A RECTANGLE
Subject of the previous lesson
Decomposition on factors

Lesson 13

Division


Contrary to the standard opinion, division is not mathematical operation. This solution of a standard task of finding of one of factors if other factor and result of multiplication is known. In ancient Babylon the fraction was considered as result of multiplication of number to inverse other number. Even in the modern mathematics there is no division of one fraction into other fraction, this operation is replaced with multiplication of a dividend to fraction, inverse to a divider.

Division can be considered as a projection of result of multiplication along one of factors. For example, length is a projection of the area along width, width is a projection of the area along length.

The most interesting in this plan is the speed which is measured by the lengthiest, divided into time. If to assume that length is result of multiplication of two perpendicular directions of time, then speed is a projection of length (the area of time) along one of the directions of time. For a comprehension of the nature and an essence of light velocity, this approach can be the very useful.

At the following lesson we will consider
The linear angular functions

Decomposition on factors

Subject of occupations:
TRIGONOMETRIC FUNCTIONS IN A RECTANGLE
Subject of the previous lesson
Zero and infinity

Lesson 12

Decomposition on factors


Mathematical operation, opposite on sense to multiplication, decomposition on factors is. It is carried out with application of the infinite trigonometric functions.

Decomposition on factors. Mathematics For Blondes.
Decomposition on factors
 The most prime example of decomposition on factors at an angle in 45 degrees is root squaring. As both factors in this case are identical, as result of decomposition it is accepted to write down only one of factors.

Decomposition on factors can be applied when only the result of multiplication is known and any of factors is not known. Units of measure as a result decomposition on factors should be selected intuitively so that as a result of their multiplication the tentative unit of measure turned out. The quantity of spacelike dimensions in units of measure of factors at decomposition can be a miscellaneous. For example, three-dimensional volume can be spread out to one-dimensional factors by means of two operations of decomposition, one of options looks so:

Decomposition of volume. Mathematics For Blondes.
Decomposition of volume

In this example corners α and β are not bound among themselves. If to display volume in a cube (a=b=c), then α≈35° is a angle between the diagonal of a cube and diagonal of the basis, β=45 ° is a angle between the diagonal of the basis and its party.

At the following lesson we will consider
Division