If F Is Continuous On (−∞, ∞), What Can You Say About Its Graph? (Select All That Apply.)
. True for y= 3f (x) we stretch vertically by a factor of 3. You can trace its graph with your pen without lifting at any.
(a) if f '(1) = 0 and f ''(1) = −1, what can you say about f ? This is not continuous for any x value. Between any two rationals, there is an.
(Select All That Apply.) The Graph Of F Has A Hole.
C)the graph of f has a vertical asymptote. False, we shift graph horizontally by a factor of 3 or f (3x) y = −f (x) − 1, first reflect. Now let us start to solve this.
1)At X = 1, F Has A Local Maximum.
You can trace its graph with your pen without lifting at any. If f is continuous on (−∞, ∞), what can you say about its graph? You can identify the graph of a function by doing the vertical line test.
True For Y= 3F (X) We Stretch Vertically By A Factor Of 3.
Y = f (3x), we shift graph vertically by a factor of 3. C)the graph of f has a. (select all that apply.) a)the graph of f has a hole.
The Graph Of F Has A Jump.
B)the graph of f has a jump. The graph of f has a vertical asymptote. Between any two rationals, there is an.
The Graph Of A Continuous Function Can Be Drawn Without Lifting The Pencil From The Paper.
(select all that apply.) a)the graph of f has a hole. If the vertical line intersects the x. We can deduce that by observing the fact that a particular point (x = 1), the tangent of f (x) will be horizontal.
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