Curve sketching review

Authored by Christine Bowen

Mathematics

11th - 12th Grade

CCSS covered

Used 439+ times

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16 questions

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MULTIPLE CHOICE QUESTION

1 min • 1 pt

If f '(3) = 0 and f"(3) < 0, then which of the following must be true?

There is a local max at x=3

There is a local min at x = 3

There is an inflection point at x = 3

There is an x-intercept at x = 3

MULTIPLE CHOICE QUESTION

3 mins • 1 pt

The graph shown is the DERIVATIVE of f. From the derivative's graph, identify the interval graph where f (the original function) is concave up.

(-1,1) & (3,4)

(-3,-2)

(-2,-1)

(-3,-1) & (1,3)

MULTIPLE CHOICE QUESTION

30 sec • 1 pt

The concavity of a function is described by its _______________.

first derivative

second derivative

third derivative

expression

MULTIPLE CHOICE QUESTION

2 mins • 1 pt

For a function g(x), g''(3)=-8 indicates that g(x) is ____________ at x=3.

increasing

decreasing

concave up

concave down

MULTIPLE CHOICE QUESTION

2 mins • 1 pt

For a function f(x), f'(-3) = 5 indicates f(x) is ___________ at x=-3.

increasing

decreasing

concave up

concave down

MULTIPLE CHOICE QUESTION

2 mins • 1 pt

If a function's FIRST derivative is negative at a certain point, what does that tell you?

The function is increasing at that point

The function is decreasing at that point

The concavity of the function is up at that point

The concavity of the function is down at that point

What are the intervals of the graph increasing for f(x) = 2x⁴- 4x² + 1

(-1,0)

(0,1)

(-∞,-1) and (0,1)

(1,∞) and (-1,0)

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Curve sketching review

If f '(3) = 0 and f"(3) < 0, then which of the following must be true?

The graph shown is the DERIVATIVE of f. From the derivative's graph, identify the interval graph where f (the original function) is concave up.

The concavity of a function is described by its _______________.

For a function g(x), g''(3)=-8 indicates that g(x) is ____________ at x=3.

For a function f(x), f'(-3) = 5 indicates f(x) is ___________ at x=-3.

If a function's FIRST derivative is negative at a certain point, what does that tell you?

What are the intervals of the graph increasing for f(x) = 2x⁴- 4x² + 1

What is the maximum value of f(x) = x³ - 3x² - 1 on the interval [-3, 2]?

Which graph is the derivative of the top graph?

f' is given, which could be f?

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Discover more resources for Mathematics

Curve sketching review

If f '(3) = 0 and f"(3) < 0, then which of the following must be true?

The graph shown is the DERIVATIVE of f. From the derivative's graph, identify the interval graph where f (the original function) is concave up.

The concavity of a function is described by its _______________.

For a function g(x), g''(3)=-8 indicates that g(x) is ____________ at x=3.

For a function f(x), f'(-3) = 5 indicates f(x) is ___________ at x=-3.

If a function's FIRST derivative is negative at a certain point, what does that tell you?

What are the intervals of the graph increasing for f(x) = 2x4- 4x2 + 1

What is the maximum value of f(x) = x3 - 3x2 - 1 on the interval [-3, 2]?

Which graph is the derivative of the top graph?

f' is given, which could be f?

Access all questions and much more by creating a free account

Similar Resources on Wayground

Popular Resources on Wayground

Discover more resources for Mathematics

What are the intervals of the graph increasing for f(x) = 2x⁴- 4x² + 1

What is the maximum value of f(x) = x³ - 3x² - 1 on the interval [-3, 2]?