Explanation Given Information: The provided expression is: lim x → 0 1 + x − 1 x Formula used: 1 . Finding limits when the limit of the denominator is zero includes following steps: Step 1 - Find the limit of the denominator. If this limit is not zero, apply the quotient property. Step 2 - If the limit of the denominator is zero, the quotient property cannot be used. Thus, re-write the expression by rationalizing the numerator. 2 . The limit of a quotient or quotient property: If lim x → a f ( x ) = L and lim x → a g ( x ) = M ; M ≠ 0 , then lim x → a f ( x ) g ( x ) = lim x → a f ( x ) lim x → a g ( x ) = L M ; M ≠ 0 The limit of the quotient of two functions equals the quotient of their limits. Also, the limit of the denominator is not zero. 3 . The limit of a sum: If lim x → a f ( x ) = L and lim x → a g ( x ) = M , then lim x → a [ f ( x ) + g ( x ) ] = lim x → a f ( x ) + lim x → a g ( x ) = L + M . The limit of the sum of two functions equals the sum of their limits. 4 . The limit of a root: If lim x → a f ( x ) = L and n is a positive integer greater than or equal to 2 , then lim x → a f ( x ) n = lim x → a f ( x ) n = L n Where, all roots represent real numbers. The limit of the n th root of a function is found by taking the limit of the function and then taking the n th root of this limit. And, 5. The difference of squares is given by ( a + b ) ( a − b ) = a 2 − b 2 . Calculation: Consider the expression: lim x → 0 1 + x − 1 x The two functions in this limit problem are f ( x ) = 1 + x − 1 and g ( x ) = x . First step is to find the limit of the denominator, g ( x ) . lim x → 0 x = 0 Since the limit of the denominator is zero, the quotient property for limits cannot be used. Thus, Re-write the expression lim x → 0 1 + x − 1 x by rationalizing the numerator. And for this, multiply the numerator and denominator by 1 + x + 1 so that the numerator will not contain any radicals. That is, lim x → 0 1 + x − 1 x = lim x → 0 1 + x − 1 x ⋅ 1 + x + 1 1 + x + 1 = lim x → 0 ( 1 + x − 1 ) ( 1 + x + 1 ) x ( 1 + x + 1 ) Now apply the formula: ( a + b ) ( a − b ) = a 2 − b 2 Thus the expression becomes: lim x → 0 1 + x − 1 x ⋅ 1 + x + 1 1 + x + 1 = lim x → 0 ( 1 + x − 1 ) ( 1 + x + 1 ) x ( 1 + x + 1 ) = lim x → 0 ( 1 + x ) 2 − ( 1 ) 2 x ( 1 + x + 1 ) The square and the square root in the numerator will cancel out. lim x → 0 ( 1 + x ) 2 − ( 1 ) 2 x ( 1 + x + 1 ) = lim x → 0 1 + x − 1 x ( 1 + x + 1 ) Simplify the expression

6th Edition

ISBN: 9780135963173

Author: Blitzer

Publisher: PEARSON CO

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Limits

When it comes to calculus, limits are considered to be a very important topic of discussion. The main importance of limit lies in expressing the value of a function as it gets closer to a certain value. Also, limits can help you to understand other topic…

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Chapter 11.2, Problem 29PE

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To Calculate: The indicated limit using the properties of limits of expression limx→0 1+x−1x.

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Chapter 11.2, Problem 28PE

Chapter 11.2, Problem 30PE

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Chapter 11 Solutions

EP PRECALCULUS-MYLABMATH+ETEXT ACCESS

Ch. 11.1 - Check Point 1 Find: . Ch. 11.1 - Prob. 2CP Ch. 11.1 - Prob. 3CP Ch. 11.1 - Prob. 4CP Ch. 11.1 - Prob. 5CP Ch. 11.1 - Prob. 1CVC Ch. 11.1 - Prob. 2CVC Ch. 11.1 - Prob. 3CVC Ch. 11.1 - Fill in each blank so that the resulting statement...Ch. 11.1 - Fill in each blank so that the resulting statement...

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The indicated limit using the properties of limits of expression lim x → 0 1 + x − 1 x .

Solution Summary: The author calculates the indicated limit using the properties of limits of expression undersetxto 0mathrmlimsqrt

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To Calculate: The indicated limit using the properties of limits of expression limx→0 1+x−1x.

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Chapter 11 Solutions