The function's value will always be greater than or equal to the local linear approximation of a function f if, for all x in an interval containing the point of tangency,

f'' > 0

A positive second derivative implies that the function is concave up in the interval, which means it's greater or equal to the tangent line at any point in the interval.

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Professor1994 Professor1994 · Answer 2 · 2018-11-30T16:42:52+01:00

Answer:

The function's value will always be greater than or equal to the local linear approximation of a function f if, for all x in an interval containing the point of tangency, f''>0 (first option)

Step-by-step explanation:

When the second derivative f'' is greater than zero (f''>0), the graph of the function f is concave up, and all x in an interval containing the point of tangency are above the tangent line in the point of tangency; that means the function's value will always be greater than or equal to the local linear approximation of a function f if, for all x in an interval containing the point of tangency.