Statistics Math Formulas for Competitive Exams |Ias Banenge
Statistics Math Formulas
Statistics Math Formulas :
SETS :
A = 2, 3, 4, 7, 8, 9, 12
3 ∈ A
5 ∉ A
SUBSET:
B = 3, 8, 9 ⇒ B ⊆ A
C = 1, 5 ⇒ C ⊄ A
STATISTICS :
MEAN : The mean value is obtained the arithmetic mean or average of a set of numbers is expected value.
The mean value is calculated by adding up all the values, and then dividing that sum by the number of values .
Mean = Sum of all data values / Number of data values
Symbolically ,
Where (read as ” x bar”) is the mean of the set of x values, Σ x is the sum of all the x values, and n is the number of x values.
MEDIAN : The median is the middle value in a set of values. So to find the midian you need to order the numbers from largest to smallest and then you have to choose the value in the middle.
MODE : Mode is the value that the highest frequency in the data set.means values that occur most frequently and there can be more than one mode in a set.
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numerical value that occurs most of the times.
F (Xmode) = max
INTERSECTION :
In intersection A ∩ B of two sets A and B is the set that contains all elements of B also belong to A (or similarly all elements of B that also belong to A) but no other elements. The symbol intersection is inverted U.
If Set A contain element A = 1,2,3 and set B contains B = 2,3,4 and the element in having common ares 2 and 3 and this intersection area formed a new set containing 2 and 3.
UNION :
The union of two sets A and B includes all elements which are members of either A or B. If sets A and B have any elements in common then this elements which are members of both sets are only include one in the union.
For example : If sets A contains the elements 1,2, and 3 and set B contains 2,3 and 4 the elements which are members of A or B are 1,2,3 and 4. This form a new set containing 1,2,3 and 4. when we write the union 2 and 3 are only listed once.
RELATIVE COMPLEMENT OF A IN B :
The relative complement of A in B denoted, B \ A, is the set of elements in B but not in A.
Symbolically :B \ A = x
ABSOLUTE COMPLEMENT :
In a Set theory a complement of a set A refers to things not in A.
SYMMETRIC DIFFERENCE :
Operations on sets :
A ∪ A = A
A ∩ A = A
A ∪ B = B ∩ A
A ∩ B = B ∩ A
(A ∪ B) ∪ C = A ∪ (B ∪ C)
(A ∩ B) ∩ C = A ∩ (B ∩ C)
∪′ = ø
(A′)′ = A
A ∩ ø = ø
A ∩ U = A
A ∩ A′ = ø
(A ∪ B)′ = A′ ∩ B′
(A ∩ B)′ = A′ ∪ B′
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