1. Introduction
Recently, many mathematicians have studied in the area of the Bernoulli numbers, Euler numbers, Genocchi numbers, and tangent numbers (see [1,2,3,4,5,8,9 10,11]). Throughout this paper, we always make use of the following notations: ℕ denotes the set of natural numbers and ℤ+ = ℕ ∪ {0} , and ℂ denotes the set of complex numbers. The tangent numbers Tn are defined by the generating function:
where we use the technique method notation by replacing Tn by Tn(n ≥ 0) symbolically [6,7]. We consider the tangent polynomials Tn(x) as follows:
Note that Numerous properties of tangent number are known. More studies and results in this subject we may see references [6,7,8]. About extensions for the tangent numbers can be found in [6,7,8]. Because
it follows the important relation
Since
we see that
Since Tn(0) = Tn, by (1.2), we have the following theorem.
Theorem 1.1. For n ∈ ℕ, we have
From (1.1), we can derive the following equation:
By comparing the coefficients on both sides of (1.3), we have the following theorem.
Theorem 1.2. For any positive integer n, we have
Now we observed that
By (1.5), we have the following theorem.
Theorem 1.3. For any positive integer n, we have
The beta integral is defined for Re(x) > 0, Re(y) > 0 by
For Re(x) > 0, the gamma function Γ(x) is defined by
The above integral for Γ(x) is sometimes called the Eulerian integral of the second kind. Thus, by (1.7) and (1.8), we have
Our aim in this paper is to give some properties, explicit formulas, several identities, a connection with tangent numbers and polynomials, and some integral formulas.
2. Identities involving tangent numbers and polynomials
In this section, we obtain several new and interesting identities involving tangent numbers and polynomials.
By (1.6), we get
Since
we have the following theorem.
Theorem 2.1. For n ∈ ℤ+, we have
By (2.2), we note that
From (1.4) and (2.3), we note that
Therefore, by (2.3) and (2.4), we obtain the following theorem.
Theorem 2.2. For n ∈ ℤ+, we have
For n ∈ ℕ with n ≥ 4, we obtain
Continuing this process, we obtain
Hence, by (2.3) and (2.5), we have the following theorem.
Theorem 2.3. For n ∈ ℕ with n ≥ 2, we have
By Theorem 2.2 and Theorem 2.3, we have the following corollary.
Corollary 2.4. For n ∈ ℕ with n ≥ 2, we have
From (1.4), we have (-1)nTn = Tn(2). Putting x = 1 in Theorem 2.3 gives the identity
Hence we have the following corollary.
Corollary 2.5. For n ∈ ℕ with n ≥ 2, we have
Putting x = 1 in Corollary 2.4 yields an identity
Now we observe that
For m, n ∈ ℕ with m, n ≥ 2, we have
Continuing this process, we get
By (2.6) and (2.7), we have the following theorem.
Theorem 2.6. For m, n ∈ ℕ, we have
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