2 Answers

Cyan Baltazar · Answer 1 · 2020-07-29T14:20:09+0000

The end behavior of a polynomial is determined entirely by the leading term. For example,
2x^4-x+1 behaves the same way as
2x^4 when
is very large in magnitude. All the problems in the picture are more or less the same. I'll pick out two examples:

1a)
f(x)=5x^6-3x^3-4x^2+8x behaves like
5x^6 .
x^6 will be positive regardless of the value of
, so to either the left or right, the graph of
f(x) will approach positive infinity or "rise" on both the left and right sides.

1c)
f(x)=-4x(x-4)(x+2) has a leading term of
-4x^3 , so
f(x) behaves like
-4x^3 . When
x<0 , we have
x^3<0 , so that
-4x^3>0 . This means
f(x) rises to the left. If
x>0 , then
-4x^3<0 , so
f(x) falls to the right.