Write down 4 noncollinear points ( 1 , y 1 ) , ( 2 , y 2 ) , ( 3 , y 3 ) , ( 4 , y 4 ) that do not lie on any polynomial y = P 3 ( x ) of degree exactly three.
Write down 4 noncollinear points ( 1 , y 1 ) , ( 2 , y 2 ) , ( 3 , y 3 ) , ( 4 , y 4 ) that do not lie on any polynomial y = P 3 ( x ) of degree exactly three.
Solution Summary: The author describes the four noncollinear points that do not lie on any polynomial of degree exactly three.
Write down 4 noncollinear points
(
1
,
y
1
)
,
(
2
,
y
2
)
,
(
3
,
y
3
)
,
(
4
,
y
4
)
that do not lie on any polynomial
y
=
P
3
(
x
)
of degree exactly three.
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