What behavior is observed in the third example that causes the limit to not exist?

The function oscillates between two values as x approaches 0.

What is the behavior of the sine of 1/x as x approaches 0 in the third example?

It oscillates between positive and negative values.

Understanding Limits That Fail to Exist

Interactive Video

•

Mathematics

•

10th - 12th Grade

•

Practice Problem

•

Hard

•

CCSS

HSF-IF.C.7E, HSF.IF.A.2, HSF-IF.C.7D

Standards-aligned

Liam Anderson

FREE Resource

Standards-aligned

CCSS.HSF-IF.C.7E

CCSS.HSF.IF.A.2

CCSS.HSF-IF.C.7D

Mr. Baker explains limits that fail to exist, covering three scenarios: differing left and right approaches, unbounded growth, and oscillation. He provides examples for each case, demonstrating how limits can fail to exist when approaching a specific constant. The video includes practical examples and graphical representations to illustrate these concepts.

10 questions

Show all answers

MULTIPLE CHOICE QUESTION

30 sec • 1 pt

What is one condition that can cause a limit to not exist?

The function is differentiable at the point.

The function is continuous at the point.

The function approaches the same value from both sides.

The function approaches different values from the left and right.

Tags

CCSS.HSF-IF.C.7D

MULTIPLE CHOICE QUESTION

30 sec • 1 pt

Which of the following is NOT a reason for a limit to fail to exist?

The function is continuous at the point.

The function oscillates between two values.

The function approaches different values from the left and right.

The function grows without bound.

Tags

CCSS.HSF-IF.C.7E

MULTIPLE CHOICE QUESTION

30 sec • 1 pt

In the first example, what happens to the limit of the absolute value of x divided by x as x approaches 0?

The limit exists and equals 0.

The limit does not exist because the function is continuous.

The limit does not exist because the function approaches different values from each side.

The limit exists and equals 1.

Tags

CCSS.HSF-IF.C.7E

MULTIPLE CHOICE QUESTION

30 sec • 1 pt

In the first example, what value does the function approach from the left as x approaches 0?

-1

Infinity

MULTIPLE CHOICE QUESTION

30 sec • 1 pt

Why does the limit of the function in the second example not exist?

The function grows without bound as x approaches 0.

The function approaches the same value from both sides.

The function is continuous at the point.

The function is differentiable at the point.

Tags

CCSS.HSF.IF.A.2

MULTIPLE CHOICE QUESTION

30 sec • 1 pt

In the second example, what happens to the function values as x approaches 0?

They approach a finite number.

They remain constant.

They oscillate between two values.

They grow larger without bound.

Tags

CCSS.HSF.IF.A.2

MULTIPLE CHOICE QUESTION

30 sec • 1 pt

In the second example, what is the result when plugging in smaller and smaller values for x?

The function values grow larger.

The function values decrease.

The function values oscillate.

The function values remain constant.

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Understanding Limits That Fail to Exist

10 questions

What is one condition that can cause a limit to not exist?

Which of the following is NOT a reason for a limit to fail to exist?

In the first example, what happens to the limit of the absolute value of x divided by x as x approaches 0?

In the first example, what value does the function approach from the left as x approaches 0?

Why does the limit of the function in the second example not exist?

In the second example, what happens to the function values as x approaches 0?

In the second example, what is the result when plugging in smaller and smaller values for x?

What behavior is observed in the third example that causes the limit to not exist?

What is the behavior of the sine of 1/x as x approaches 0 in the third example?

Which example demonstrates a limit that does not exist due to oscillation?

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