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There is a famous irrational number called Euler's number, symbolized with an e. Like π , its decimal fo rm never ends or repeats. The first few digits of e are 2.7182818284. A. Between which two square roots of integers could you find this number? _. B. Between which two square roots of integers can you find

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[tex]\sqrt{7} < e < \sqrt{8}=2\sqrt{2}[/tex]

Answer:

Step-by-step explanation:

Given that in Mathematics there is a famous irrational number called Euler's number, symbolized with an e.

This number lies between 2 and 3 and have approximate value as

2.7182818281

Since this lies between 2 and 3, the required integers would be between 4 and 9

Let us find square root of all integers from 4 to 9

[tex]\sqrt{4} =2\\\sqrt{5} =2.236\\\sqrt{6} =2.449\\\sqrt{8} =2.828[/tex]

Thus this irrational numbers lies between square root of 7 and square root of 8.

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