The graduate unemployment rate is one of the current issues being discussed by higher education scholars. College and university students often face unemployment after spending their valuable time and money in order to receive educational advantages. It makes them are more vulnerable to unfavourable economic conditions as those students have spent a lot of their resources while having the higher education. This paper examines the reasons and factors why fresh graduates are facing unemployment in the competitive market in Klang Vally, Malaysia. 200 data of fresh graduate was collected and analysed by SPSS20. There are several factors that explain their unemployment status, and this paper identifies each component at an individual level. With specific analysis of the unemployment phenomena, this paper provides direction for further research. The study establishes that the fresh graduates need to change their demanding attitude and at the same time, they must adopt more employability skills in order to get a job placement.
In this paper, we introduce a generalization of the Bleimann-Butzer-Hahn operators based on (p, q)-integers and obtain Korovkin's type approximation theorem for these operators. Furthermore, we compute convergence of these operators by using the modulus of continuity.Let us recall certain notations on (p, q)-calculus. The (p, q) integers [n] p,q are defined by [n] p,q = p n − q n p − q , n = 0, 1, 2, · · · , 0 < q < p ≤ 1.
Recently, Mursaleen et al. (On (p, q)-analogue of Bernstein operators, arXiv:1503.07404) introduced and studied the (p, q)-analog of Bernstein operators by using the idea of (p, q)-integers. In this paper, we generalize the q-Bernstein-Schurer operators using (p, q)-integers and obtain a Korovkin type approximation theorem. Furthermore, we obtain the convergence of the operators by using the modulus of continuity and prove some direct theorems.
MSC: 41A10; 41A25; 41A36
Communicated by W. SprößigThe purpose of this paper is to introduce a family of q-Szász-Mirakjan-Kantorovich type positive linear operators that are generated by Dunkl's generalization of the exponential function. We present approximation properties with the help of well-known Korovkin's theorem and determine the rate of convergence in terms of classical modulus of continuity, the class of Lipschitz functions, Peetre's K-functional, and the second-order modulus of continuity. Furthermore, we obtain the approximation results for bivariate q-Szász-Mirakjan-Kantorovich type operators that are also generated by the aforementioned Dunkl generalization of the exponential function. Keywords: basic (or q-) integers; basic (or q-) hypergeometric functions; basic (or q-) exponential functions; q-Dunkl's analogue; Szász operator; q-Szász-Mirakjan-Kantorovich operator; rate of convergence; modulus of continuity; Peetre's K-functionalDuring the past two decades or so, applications of basic (or q-) calculus emerged as a new area in the field of approximation theory. Lupaş [3] was the first who (in the year 1987) introduced a q-analogue of the well-known Bernstein polynomials in (1.1) and investigated their approximating and shape-preserving properties. In the year 1997, Phillips [4] considered another q-analogue of the classical Bernstein polynomials. Later on, many authors introduced q-generalizations of various operators and investigated several approximation and other interesting properties in each case (see, for example, [5-13] and [14]).We begin our present sequel to some of the aforementioned investigations by a number of basic definitions and concept details of the q-calculus, which are used in this paper.In this section, we derive the Korovkin type and weighted Korovkin type approximation properties for the q-operator Q K n,q .f ; x/ defined by (2.1). Korovkin-type theorems furnish simple and useful tools for ascertaining whether a given sequence of positive linear operators, acting on some given function space, is an approximation process.
The object of this paper to construct Dunkl type Szász operators via post-quantum calculus. We obtain some approximation results for these new operators and compute convergence of the operators by using the modulus of continuity. Furthermore, we obtain the rate of convergence of these operators for functions belonging to the Lipschitz class. We also study the bivariate version of these operators.
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