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Factoring and product formulas
Quadratic equations
Progressions
Trigonometry
Probability theory
Statistics
Circle
Triangles
Quadrangles, polygons
Shape Areas
Solid figures
Equations of geometric shapes
Various
Combinatorics
Vectors
Logarithms
Factoring and product formulas
Quadratic equations
Progressions
Trigonometry
Probability theory
Statistics
Circle
Triangles
Quadrangles, polygons
Shape Areas
Solid figures
Equations of geometric shapes
Various
Combinatorics
Vectors
Logarithms
Math formulas
Progressions
Sum of the members of an arithmetic progression (arithmetic series)
Sum of the members of an arithmetic progression (arithmetic series)
$$S_{n} = \frac{(2\cdot a_{1}+d\cdot (n-1))\cdot n}{2}$$
a1 - first member
d - common difference of an arithmetical progression
n - member number
Find
S_n
S_n
a_1
d
n
It is known that:
S_n
a_1
d
n
=
x
Calculate '
S_n
'
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