Use the recursion relations of Section 15 (and, as needed, Sections 12, 13, 17, and 20) to verify the formulas in Problems 10 to 14. ∫ 0 ∞ x − p J p + 1 ( x ) d x = 1 2 p Γ ( 1 + p ) .
Use the recursion relations of Section 15 (and, as needed, Sections 12, 13, 17, and 20) to verify the formulas in Problems 10 to 14. ∫ 0 ∞ x − p J p + 1 ( x ) d x = 1 2 p Γ ( 1 + p ) .
QUESTION 2
Simplify the following completely:
2.1
2p+:
2p
P.
2.2
(2y+3)(7y -6y-8)
2.3
12x
-3(x-2y)- (3y)
(2* + y)-(x+ y)
2.4
2(x-2)(x+3)-3(x-1)
2.5
In this problem, your task is to list all the constants, free variables and bound variables in each of these formulas in the appropriate columns (if there are any). If there are none, write “NONE” under the appropriate column.
(The image with the chart is the question)
(The other image is just formulas if your not familiar with this)
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