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The graph of f(x) consists of 14 points. Six of the points lie in Quadrant I of the coordinate plane. If f(x) is an odd function, what is the greatest number of points that can lie in Quadrant II?
one
two
six
eight

Respuesta :

Medunno13

Answer: 1

Step-by-step explanation:

If f(x) is an odd function, this means that f(x)=-f(-x). So, if 6 points lie in Quadrant I, then this means that 6 points must lie in Quadrant III.

This leaves us with 2 points.

Similarly, we know that for every point in Quadrant II, there must be a corresponding point in Quadrant IV.

This gives us 2/2 = 1 point.

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