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Mathematics /AP Calculus AB: 12.2.4 Another Example of One to the Infinite Power

AP Calculus AB: 12.2.4 Another Example of One to the Infinite Power

Mathematics10 CardsCreated 7 months ago

This content explains how to evaluate limits that result in the indeterminate form 1∞. It demonstrates the use of exponential and logarithmic identities to transform the expression: rewrite it as limit of the exponent limit of the exponent, where the exponent involves a logarithm. The transformed expression is easier to work with and often results in an indeterminate quotient, allowing the use of L’Hôpital’s Rule. The solution to this intermediate limit is then substituted back into the exponential to get the final result.

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Another Example of One to the Infinite Power

Some indeterminate forms have to be transformed before you can apply L’Hôpital’s rule.
In order to apply L’Hôpital’s rule to a limit of the form , use the properties of logarithms to rewrite the exponent as a logarithm.

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Definition

Another Example of One to the Infinite Power

Some indeterminate forms have to be transformed before you can apply L’Hôpital’s rule.
In order to apply L’Hôpital’s rule to...

note

When you encounter the indeterminate form , you will need to make use of two facts about exponents and logarithms.
The first...

Evaluate limx→0+ x^tanx

1

Evaluate limx→0+ (cotx)^sinx

1

Evaluate limx→0 (1–x)^1/5x.

e^ −1/5

Evaluate limx→2 (x^2)^1/ln(x–1).

√e

Evaluate limx→0+ x^1/1+lnx.

e

Evaluate limx→1+ (x – 1)^lnx.

1

Evaluate limx→∞ (lnx)^1/x.

1

Evaluate limx→0+ x^sinx.

1

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AP Calculus AB: 12.2.4 Another Example of One to the Infinite Power

Term	Definition
Another Example of One to the Infinite Power	Some indeterminate forms have to be transformed before you can apply L’Hôpital’s rule. In order to apply L’Hôpital’s rule to a limit of the form , use the properties of logarithms to rewrite the exponent as a logarithm.
note	When you encounter the indeterminate form , you will need to make use of two facts about exponents and logarithms. The first is that e raised to the natural log of any expression is equal to that same expression. The second is that when there is an exponent inside a natural log expression, it can be moved to the outside as a factor. Now that you have rewritten the expression, you can evaluate an easier limit. Forget about e and take the limit of its exponent. Remember that this sub-problem is not equal to the original limit. It is just a side calculation. To evaluate the limit in the sub-problem, you will have to transform the expression to produce an indeterminate quotient. Then you can apply L’Hôpital’s rule. The limit from the sub-problem is equal to –1, but that is not the value of the original limit! When you plug in the result of the side calculation, you get the value of the original limit.
Evaluate limx→0+ x^tanx	1
Evaluate limx→0+ (cotx)^sinx	1
Evaluate limx→0 (1–x)^1/5x.	e^ −1/5
Evaluate limx→2 (x^2)^1/ln(x–1).	√e
Evaluate limx→0+ x^1/1+lnx.	e
Evaluate limx→1+ (x – 1)^lnx.	1
Evaluate limx→∞ (lnx)^1/x.	1
Evaluate limx→0+ x^sinx.	1