teoreme

proof., or solution Pythagorean theorem.
according to the ratio ... quadro equality
,, .. a ; a (+) b ; b = c ; c`
- the first action is: `a ; a (.
..the same way the equality of the relations of the parties is multiplied.
their given segment is straight., which in their case = equal,
-as a square is given in the problem.
- (suum equality:) - the number of `squared` always has its multiplied =
.and this = the number given.summa..the very number - about
-. (4 ; 4) = (4 + 4 + 4 + 4) .-. (5 ; 5) = (5 + 5 + 5 + 5). = this category
before he sees exactly his equality.
- so we get the.-action related. with amounts.
the number itself in the nominal, its ..sequential relationship.,
near to the unit.
--...
= yielding result = equal digital, radius, equality relations,
. It is adjacent to the unit number (1). That is: quadro equality.
Equal relations of a square digital field.
.in its equality unit.
. The relative area of ;;a square unit.
...,
- If you follow the example -: (take the number-five- (5).
. reproducing the first of the available actions `a ; a (. = (5 ; 5 = 25).
and get your own, relative, square with function.
. Its approximation, or rather equality. Applied to the unit- (1) number.
- (`iste novissimus exossavit`) -or thus-:
: - own consecutive unit of your number-
-'Fast given ..
- (25 =) - (`a ; a`) = (b ; b`) ~` a ratio numers aequalitatem .`
// decision //:
1): decompose this square with its stranami in the existing coordinate system.
-> that is, each side is equal to = 5. the number of. one in each of its direction.
2): connect the .diagonals. points of no contact ..
3): we see in such a way that we have received. Equal relative .-
“Equality square” / square ratio.
4): when multiplying the sides, we assume = (`` a ; `` b) - we get the full square of the equality.
= it is already inscribed. in the floor of the function .. and this is ~ (q, y, s) i..umnohgaem / (a`` ; b``) -i-
i poluchaem sleduchee sootnohcen = (s, n, q).
..nu .i vsё -poidii to chto ..!
// (5 ; 5 = 25) + (5 ; 5 = 25) = ..
= (25 + 25) = 50 = `c ; c`
5) :( `c ; c` = 50) (c = ;50), then there are two identical squares inscribed in the equal square.
and their numerical quadratic relation .. is equal to == the number of equal ratio.
squares. ~ analog sledyushego zifrovogo poradka *
..that requires a clear explanation .. -and not a single person -for the solution and others ..
.. message ..
 the most interesting thing is that the square is a rhombus or vice versa ..
and the fact that the two sides of a given square are put together give
the diagonal of the subsequent is analogous .. = (n, q, y, s).
correlative \ eedeticheskogo .. squared relations of equality.
and still ~ it is analog- (n, q, y, s) - and it is doubled evenly. from the square- (ab) -
and it has exactly the same numerical ratio = equal to two (2) flattened data
squares of equality (on the basis of areas).
and thus ~ (a + b) = diagonal kvadrata- (n, q, y, s). and + many analogues increased,
reduced, and most importantly equal in their anolag.
.-.-.-.-.-.-.-.-.-.-.-.-.-.-.-.-.-.-
~> .. qy ; sy = ns ; xs (+) yx ; yq ..
........................................
~ ; ;50 ; ;50 = ;50 ; (;50: 2) + (;50: 2) ; ;50 ~ = ~
~ ; ;50 ; ;50 = `7.071067811865475`x`7.071067811865475` = 50` = ; ;50 ; ; ;50.
.................................................. ................
-.-.-.-.-.-.-.-.-.-.-.-.-.-.-.-.-.-.-
`` ;50 = 7.071067811865475`` = `qy`
`` (;50: /: 2) = 3.535533905932738`` = `sx` -.-.-.-..-.
; ;50 /: 2 = `7.071067811865475`: del:` 2` = `3.535533905932738` ... =` yx` = `sx` = ns: 2`
-.quartam .-. `` yx sx`` .-. =. `3.535533905932738` (x)` 3.535339059327373` = `12.5` ---.
- ; hwqn- ; 2 = ; ab-
- ; hwqn- ; 4 = ; qysn-
-.quartam .-- ; hwqn-
-diagonal ; hwqn (x ;) 2 = diagonal ; qysn-
-storona ; hwqn = nh = wh = qn = qw = ns: 2 = ys: 2 = xw`` = diagonal (; ab): 2``
-dagonal-nw- = storone - ; ab-
.-.-.-.-.-.-.-.-.-.-.-.-.-.-.-.-.-.-.-.-.
`` 07.071067811865475 (x) 3.535533905932738 = 25`` = a = b
~ `.a. =. b. =. q ;.` ~
~~~ .` (a + b) `; q ;` = `2 ; (a ; b)`. ~~~
..
~> (a + b): del: two = equality quadrato.

thus: (;50 +): del: 2 =
, the addition of the multiplied sides of a given. (where ..). numeric square (- ; ab-)
gives .n. SOMO quadro equaliry - quadro equality - ((diagonal -storonu analogova kratichnogo ravenstva))
- (umnoghennogo v dvoe)
~ c ; c = qy = a ; a (+) b ; b ~
~ c = ; ; a ; a (+) b ; b = ; ; qy ~
~ nw = wy = xh ~
~ eto funkzii - quadro
quadro functions
i vsegda libo storina est diagonale end est diagonale ens storonoy // ravenstva .i. ~ vsegda ; ;.
system two:
numerical ratio - we get the number ratio - `c ; c` =` qy ; ys`
~ tut vse ..
..............................................

~ .. ; ;50 = ; ;25 ; 2 = 5 ; ;2 .. ~ ;5 ; 5 ; 2 ~ ;5 ; ;5 ; ;2 =
~ ;5 = `2.23606797749979`
------
; ;5 ; ; ;5 =
= `2.23606797749979`x`2.23606797749979` =` 5.000000000000001`
---------
; ;2 = `1.414213562373095`.