Draft:Nivit formula

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Template:Nivit formula the nivit formula is a phormula that proves that 2+2=5 or 4+4=10.

nivit formula proves that 2+2=5

beacuse of the pythagoras theorem

we know that 3^2+4^2=5^2.

so that means 2^2+4^8 = 104^1.5

so it equals to 2^1 = 2.5.

2^2 = 2.5^2 so 2+2 = 5

and beacuse that 1 devided by 3 is equals to ¹⁄₃ so

1 devided by 3 is equals to 0.3333333... and times 3 means

1 = 0.999999999...

and that prove that 1000 = 999

so id we decrees both of them we get 5 = 4

so 2+2=5

and beacuse:

In elementary algebra, the quadratic formula is a closed-form expression describing the solutions of a quadratic equation. Other ways of solving quadratic equations, such as completing the square, yield the same solutions.

Given a general quadratic equation of the form ⁠⁠, with ⁠⁠ representing an unknown, and coefficients ⁠⁠, ⁠⁠, and ⁠⁠ representing known real or complex numbers with ⁠⁠, the values of ⁠⁠ satisfying the equation, called the roots or zeros, can be found using the quadratic formula,

where the plus–minus symbol "⁠⁠" indicates that the equation has two roots. Written separately, these are:

The quantity ⁠⁠ is known as the discriminant of the quadratic equation. If the coefficients ⁠⁠, ⁠⁠, and ⁠⁠ are real numbers then when ⁠⁠, the equation has two distinct real roots; when ⁠⁠, the equation has one repeated real root; and when ⁠⁠, the equation has no real roots but has two distinct complex roots, which are complex conjugates of each other.

Geometrically, the roots represent the ⁠⁠ values at which the graph of the quadratic function ⁠⁠, a parabola, crosses the ⁠⁠-axis: the graph's ⁠⁠-intercepts. The quadratic formula can also be used to identify the parabola's axis of symmetry.

the quadratic formula shows that a+b = a+b+1 so 2+2=5 and 1+1=3