M O L T E N   U N I V E R S E

By Henryk Szubinski

multiple displace

>=< (process displace input =process displace output..

————–(x-f)———->  <———(x+f)—————–

<—————————-(g+e) /p    ————————->

format of a (x+1)/(x-1) as -x alterable on h basis…..

the formats for relations are definetly designated by a.i

responders….

 

(b+P2) -S ( R +P2) cubed = 3(7x + y) to the 3.z

….on basis of continued simulations of a.i responses;

of the multiple displace;

 

A SEQUENCE START FORMULATION…

 

——————————————————————————————–

h= -S (vol + Cyliner volume ) – Vol .x / 10 (( – F ( Vol ))

3 = vol / x – ( S.A +B)

(S + B ) = h / ( g + 1)

defining the reasons for clarity;

A SEQUENCE END PROCESSOR

 

divisive fine force

 

In physics, a force is a push or pull that can cause an object with mass to change its velocity.[1] Force has both magnitude and direction, making it a vector quantity. Newton’s second law states that an object with a constant mass will accelerate in proportion to the net force acting upon and in inverse proportion to its mass. Equivalently, the net force on an object equals the rate at which its momentum changes.[2] See also thrust.

Forces acting on three-dimensional objects may also cause them to rotate or deform, or result in a change in pressure or even change volume in some cases. The tendency of a force to cause changes in rotational speed about an axis is called torque. Deformation and pressure are the result of stress forces within an object.[3][4]

\vec{F} = \frac{\mathrm{d}}{\mathrm{d}t}(m \vec{v})
Newton’s Second

 

 in a flying car must have altered x value

altered multiples in response by

definition CONNECT

= response to (Connect / alter )

the spacial value Response

to Kinetic—————>connect = response by Lim x = Dimensionality .e-/vector equalisations

A TUBULAR DELIVERY SYSTEM

 

 

In classical mechanics, the kinetic energy of a point object (an object so small that its mass can be assumed to exist at one point), or a non-rotating rigid body, is given by the equation

E_k =\tfrac{1}{2} mv^2

where m\; is the mass and v\; is the speed of the body. In SI units (used for most modern scientific work), mass is measured in kilograms, speed in metres per second, and the resulting kinetic energy is in joules.

For example, one would calculate the kinetic energy of an 80 kg mass traveling at 18 meters per second (40 mph) as

E_k =\tfrac{1}{2} \cdot 80 \cdot 18^2 = 12,960 \ \mathrm{joules}.

Note that the kinetic energy increases with the square of the speed. This means, for example, that an object traveling twice as fast will have four times as much kinetic energy. As a result of this, a car traveling twice as fast requires four times as much distance to stop (assuming a constant braking force. See mechanical work).

The kinetic energy of an object is related to its momentum by the equation:

E_k = \frac{p^2}{2m}

where:

p\; is momentum
m\; is mass of the body

For the translational kinetic energy, that is the kinetic energy associated with rectilinear motion, of a body with constant mass m\;, whose center of mass is moving in a straight line with speed v\;, as seen above is equal to

E_t =\tfrac{1}{2} mv^2

where:

m\; is mass of the body
v\; is speed of the center of mass of the body.

as concerns linearity..

In Boolean algebra, a linear function is a function f for which there exist a_0, a_1, \ldots, a_n \in \{0,1\} such that f(b_1, \ldots, b_n) = a_0 \oplus (a_1 \land b_1) \oplus \ldots \oplus (a_n \land b_n) for all b_1, \ldots, b_n \in \{0,1\}.

A Boolean function is linear if A) In every row of the truth table in which the value of the function is ‘T’, there are an even number of ‘T’s assigned to the arguments of the function; and in every row in which the truth value of the function is ‘F’, there are an odd number of ‘T’s assigned to arguments; or B) In every row in which the truth value of the function is ‘T’, there are an odd number of ‘T’s assigned to the arguments and in every row in which the function is ‘F’ there is an even number of ‘T’s assigned to arguments.

Another way to express this is that each variable always makes a difference in the truth-value of the operation or it never makes a difference.

Negation, Logical biconditional, exclusive or, tautology, and contradiction are linear binary functions.

 

data that is connected to substrates of functions on levels with the designated altered occular (video ) rersdponses on devices with high definintions of the daze real active designations lift by diagrammatic off shoot fuses made in tough definitions vortex terminology off the planarity of sphericality in process to alter diagrammatic zizzyness in samall effected alterations of the process to use data on possible realisations of the connectives used to designate or derive values of processesss in a ny case scenario by redefined processings of the designated point active values of lift..

 

 

data on why the processes of the left 7right hemispheres have a lift basis on the hemisopherical limitations of x values = to alterations of curvature based similarity within the universe fields at such points in simulations with the curvature and why a possible processing of data would be actively implying positionality of a resistant process to the designations of embankements on the fluid sections of the universe with lavae type molten seas of activity of metal in fluid states as accounting for most of the universes volume and also simulations of molten interactions with type 1 civilisations in embankement usage of a type Beach response to using stars and their energy usability..