A hybrid iterative method for common solutions of variational inequality problems and fixed point problems for single-valued and multi-valued mappings with applications

Table 2 The values of the sequences \(\pmb{\{\mathbf{x}_{n}\}}\) , \(\pmb{\{\mathbf{y}_{n}\}}\) , and \(\pmb{\{\mathbf{z}_{n}\}}\) with the initial point \(\pmb{\mathbf{x}_{1}=(7.5,9.1)}\) in Example 5.2

n	\(\boldsymbol {x_{n}}\)	\(\boldsymbol {y_{n}}\)	\(\boldsymbol {z_{n}}\)
1	(7.5000000,9.1000000)	(6.3029396,7.6067234)	(3.0687437,3.7035235)
2	(4.6619648,5.6749079)	(3.8840555,4.7013476)	(1.7741233,2.1474385)
3	(2.8183693,3.4332496)	(2.3412722,2.8357215)	(1.0459308,1.2668192)
4	(1.6857031,2.0577916)	(1.3983068,1.6970922)	(0.6176583,0.7496374)
5	(1.0092457,1.2223240)	(0.8364468,1.0071576)	(0.3669562,0.4418484)
6	(0.5676300,0.7527995)	(0.4701681,0.6199094)	(0.2053231,0.2707153)
7	(0.7174567,0.1573218)	(0.5940218,0.1294942)	(0.2585586,0.0563647)
8	(0.3517952,0.4346565)	(0.2911794,0.3576574)	(0.1264280,0.1552922)
9	(0.4298726,0.0764960)	(0.3557172,0.0629290)	(0.1541523,0.0272707)
⋮	⋮	⋮	⋮
45	(0.0000963,0.0000292)	(0.0000795,0.0000240)	(0.0000340,0.0000103)
⋮	⋮	⋮	⋮
55	(0.0000088,0.0000042)	(0.0000072,0.0000034)	(0.0000031,0.0000015)
56	(0.0000033,0.0000065)	(0.0000027,0.0000053)	(0.0000012,0.0000023)
57	(0.0000054,0.0000020)	(0.0000044,0.0000017)	(0.0000019,0.0000007)
58	(0.0000022,0.0000036)	(0.0000018,0.0000030)	(0.0000008,0.0000013)
59	(0.0000033,0.0000009)	(0.0000030,0.0000008)	(0.0000012,0.0000003)
60	(0.0000015,0.0000020)	(0.0000012,0.0000017)	(0.0000005,0.0000007)
61	(0.0000020,0.0000004)	(0.0000016,0.0000003)	(0.0000007,0.0000001)
62	(0.0000010,0.0000011)	(0.0000008,0.0000009)	(0.0000004,0.0000004)