291,157 views
35 votes
35 votes
How many inflection point(s) do you see ?

How many inflection point(s) do you see ?-example-1
User Nika Kasradze
by
2.8k points

2 Answers

11 votes
11 votes

Answer:

7 inflection points

Explanation:

The given function
f(x)=sinx+2 has a midline of y=2 where each point of the function that intersects the line is an inflection point. Inflection points are where the concavity changes, defined by when the second derivative is equal to 0 or undefined.


f(x)=sin(x)+2


f'(x)=cos(x)


f''(x)=-sin(x)


0=-sin(x)


x=\pi n for any integer
n

From
[-10,10], there are 7 inflection points, which are
x=-3\pi,-2\pi,-\pi,0,\pi,2\pi,3\pi

User Onof
by
2.6k points
11 votes
11 votes

Answer:

7

Explanation:

There is a point of inflection at each point where the graph crosses the line y=2. There are 7 points of inflection shown.

__

A point of inflection is where the graph changes from being concave downward to concave upward, or vice versa. For a sine function, that is everywhere the function crosses its midline.

User Condit
by
3.2k points