Textbook Question
Graphing Simple Rational Functions
Graph the rational functions in Exercises 63–68. Include the graphs and equations of the asymptotes and dominant terms.
y = (x + 3)/(x + 2)
1. Limits and Continuity
Introduction to Limits
6:52 minutesProblem 2.6.87
Textbook Question
Finding Limits of Differences When x → ±∞
Find the limits in Exercises 84–90. (Hint: Try multiplying and dividing by the conjugate.)
lim x → −∞ (2x + √(4x² + 3x − 2))
Verified step by step guidance1
Identify the expression for which you need to find the limit: \( \lim_{x \to -\infty} (2x + \sqrt{4x^2 + 3x - 2}) \).
To simplify the expression, multiply and divide by the conjugate: \( \frac{(2x + \sqrt{4x^2 + 3x - 2})(2x - \sqrt{4x^2 + 3x - 2})}{2x - \sqrt{4x^2 + 3x - 2}} \).
The numerator becomes a difference of squares: \((2x)^2 - (\sqrt{4x^2 + 3x - 2})^2 = 4x^2 - (4x^2 + 3x - 2)\). Simplify this to \(-3x + 2\).
Now, the expression is \( \frac{-3x + 2}{2x - \sqrt{4x^2 + 3x - 2}} \). Divide every term by \(x\) to simplify: \( \frac{-3 + \frac{2}{x}}{2 - \sqrt{4 + \frac{3}{x} - \frac{2}{x^2}}} \).
Evaluate the limit as \(x \to -\infty\). The terms \(\frac{2}{x}\), \(\frac{3}{x}\), and \(\frac{2}{x^2}\) approach zero, simplifying the expression to \( \frac{-3}{2 - 2} \).
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Key Concepts
Here are the essential concepts you must grasp in order to answer the question correctly.
Limits at Infinity
Limits at infinity involve finding the behavior of a function as the variable approaches positive or negative infinity. This concept is crucial for understanding how functions behave asymptotically, often simplifying expressions to determine dominant terms that dictate the limit. In this problem, we analyze the expression as x approaches negative infinity.
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Conjugate Multiplication
Multiplying and dividing by the conjugate is a technique used to simplify expressions, especially those involving square roots. The conjugate of a binomial expression like a + b√c is a - b√c, and using it can help eliminate radicals or simplify complex fractions. This method is suggested in the hint to tackle the given limit problem.
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Dominant Term Analysis
Dominant term analysis involves identifying the term in an expression that grows fastest as the variable approaches infinity. This helps in approximating the limit by focusing on the most significant contributors to the function's behavior. In the given problem, analyzing the dominant terms in the expression 2x + √(4x² + 3x − 2) is essential for finding the limit as x approaches negative infinity.
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