@article{Alongkot Suvarnamani_Mongkol Tatong_2016, title={SOME PROPERTIES OF THE PRODUCT OF (P,Q) – FIBONACCI AND (P,Q) - LUCAS NUMBER}, volume={13}, url={https://geomatejournal.com/geomate/article/view/1499}, abstractNote={<p>Some mathematicians study the basic concept of the generalized Fibonacci sequence and <br>Lucas sequence which are the (p,q) – Fibonacci sequence and the (p,q) – Lucas sequence. For example, <br>Singh, Sisodiya and Ahmad studied the product of the k-Fibonacci and k-Lucas numbers. Moreover, <br>Suvarnamani and Tatong showed some results of the (p, q) - Fibonacci number. They found some properties <br>of the (p,q) – Fibonacci number and the (p,q) – Lucas number. There are a lot of open problem about them. <br>Moreover, the example for the application of the Fibonacci number to the generalized function was showed <br>by Djordjevicand Srivastava. In this paper, we consider the (p,q) – Fibonacci sequence and the (p,q) – Lucas <br>sequence. We used the Binet’s formulas to show that some properties of the product of the (p,q) – Fibonacci <br>number and the (p,q) – Lucas number. We get some generalized properties on the product of the (p,q) – <br>Fibonacci number and the (p,q) – Lucas number.</p>}, number={37}, journal={GEOMATE Journal}, author={Alongkot Suvarnamani and Mongkol Tatong}, year={2016}, month={Nov.}, pages={16–19} }