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Use a calculator to estimate the values of the limits correctly to two decimal places.

*h is approaching 0 in both of these limits

\lim_(h \to \0) (2.7^h-1)/(h) \\\\ \lim_(h \to \0) (2.8^h-1)/(h)

User Pqvst
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1 Answer

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Try this option ↓

Explanation:

1) if to evaluate the given limits using math methods, then:


\lim_(h \to 0) (2.7^h-1)/(h)=[(0)/(0)]= \lim_(h \to 0) ((2.7^h-1)')/((h)')= \lim_(h \to 0) (2.7^h*ln2.7)/(1) =ln2.7;

and


\lim_(h \to 0) (2.8^h-1)/(h)=[(0)/(0)]= \lim_(h \to 0) ((2.8^h-1)')/((h)')= \lim_(h \to 0) (2.8^h*ln2.8)/(1) =ln2.8;

2) for more info see the attached graphs; note, ln2.7≈0.993252, ln2.8≈1.029619 and the function is undefined in the points where x=0.

Use a calculator to estimate the values of the limits correctly to two decimal places-example-1
User Skynyrd
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