Answer:
The given function is a nonlinear function because the degree of the function is 2 and we get same value of y for more than one values of x.
Step-by-step explanation:
The given function is
[tex]y=2x^2-5[/tex]
To find the points which lie on the function, put difference values of x in the given function and find the values of y.
Put x= -2
[tex]y=2(-2)^2-5=2(4)-5=8-5=3[/tex]
Put x= -1
[tex]y=2(-1)^2-5=2(1)-5=2-5=-3[/tex]
Put x= 0
[tex]y=2(0)^2-5=2(0)-5=-5=-5[/tex]
Put x=1
[tex]y=2(1)^2-5=2(1)-5=2-5=-3[/tex]
Put x= 2
[tex]y=2(2)^2-5=2(4)-5=8-5=3[/tex]
The table of values is shown below.
Plot these points on a coordinate plane and connect them by a free hand curve.
The given function is a nonlinear function because the degree of the function is 2 and we get same value of y for more than one values of x.
The graph of function is shown below.
