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Teorema 2.3 Jika dua garis sejajar dipotong oleh sebuah transversal maka sudut dalam sepihaknya berjumlah 180° (berpelurus) Teorema 3.6 Jika sebuah titik mempunyai jarak yang sama terhadap kaki-...
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Teorema 2.3 Jika dua garis sejajar dipotong oleh sebuah transversal maka sudut dalam sepihaknya berjumlah 180° (berpelurus) Teorema 3.6 Jika sebuah titik mempunyai jarak yang sama terhada…Full description
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FORMULA ESSENTIAL FUNCTIONS OF THE GAMMA
At previous meetings, we have learned the definition of the gamma function is (n)=
∫
. We also have obtained the values of the gamma function when n positive
integers and in fact form the factorial function. In this discussion, we tried to find the value of the gamma function is not unanimously positive, in this case is the gamma function when n = 1 / 2. Of course if we put on the definition of gamma function, then we will write it as follows. (
) = ∫ = ∫
To solve the above functions are not as easy as completing the gamma function is the value of n is a positive integer. Integral on the above functions can be completed by setting up two equations in u and v, namely
To solve the above integral, we need the help of polar integral in the first quadrant. So the next step is you have to change the integral model Cartesian above the polar integral. As such, then you must change the x, y, and dy dx into polar form, ie
Substitution of the above values in equation (4) and use the first quadrant is the limit for θ = 0 to θ = π / 2. If you do it right, then obtained the following form