Evaluating Limits With Fractions and Square Roots | Summary and Q&A

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February 20, 2018
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The Organic Chemistry Tutor
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Evaluating Limits With Fractions and Square Roots

TL;DR

This video explains how to calculate limits involving fractions and square roots using multiplication by the common denominator and conjugates.

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Key Insights

  • 🫚 Rational functions with fractions and square roots can be simplified using multiplication by the common denominator and conjugates.
  • 😑 Canceling out common terms is an important step in simplifying limit expressions.
  • 😚 Direct substitution of a value close to the limit can be used to confirm the calculated answer.

Transcript

now what about the limit as x approaches 4 of 1 over square root x minus 1 over 2 divided by x minus 4. so this time we have a rational function we have fractions and we have a square root so typically when we have a square root we would multiply the top and the bottom by the conjugate and when we have fractions we need to multiply the top and the ... Read More

Questions & Answers

Q: How do you simplify a limit expression with fractions and square roots?

To simplify a limit expression with fractions and square roots, you can multiply the top and bottom by the common denominator to eliminate the fractions. Then, you can multiply the numerator and denominator by the conjugate to simplify the expression further.

Q: What is the purpose of multiplying by the common denominator?

Multiplying by the common denominator helps to eliminate the fractions in the limit expression. This allows for easier manipulation and simplification of the expression.

Q: How do you use the conjugate to simplify the expression?

By multiplying the numerator and denominator by the conjugate, you can eliminate square roots and simplify the expression. In the numerator, you use the FOIL method to expand the conjugate, and in the denominator, the middle terms cancel out.

Q: Why is direct substitution used to confirm the answer?

Direct substitution involves plugging in a value very close to the limit value and calculating the expression. If the result is close to the calculated answer, it confirms the accuracy of the calculated limit.

Summary & Key Takeaways

  • The video demonstrates how to calculate the limit as x approaches 4 of a rational function with fractions and a square root. The common denominator is used to eliminate the fractions, and the conjugate is used to simplify the expression.

  • Another example is given for calculating the limit as x approaches 6 of a fraction with a square root. The same techniques of multiplying by the common denominator and conjugate are employed.

  • The video emphasizes the importance of canceling out common terms and using direct substitution to confirm the calculated answer.

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