Find the limit. \lim_{x \rightarrow 9}3\sqrt{x}

Question:

Find the limit.

{eq}\displaystyle \lim_{x \rightarrow 9}3\sqrt{x} {/eq}

Limits:

Let {eq}f {/eq} be a function of a real variable {eq}x {/eq}. Let {eq}c, l {/eq} be two fixed numbers. If {eq}f(x) {/eq} approaches the value {eq}l {/eq} as {eq}x {/eq} approaches {eq}c {/eq}, we say {eq}l {/eq} is the limit of the function {eq}f(x) {/eq} as {eq}x {/eq} tends to {eq}c {/eq}. This is written as {eq}\displaystyle \lim_{x\to c} f(x) = l {/eq}. The given limit can be simplified by the substitution of the given values of x.

Answer and Explanation:

{eq}\begin{align*} \lim_{x \rightarrow 9}3\sqrt{x}&=3\sqrt 9&\text{[Substitute the given limits]}\\ &=3(3)\\ &=9 \end{align*} {/eq}


Learn more about this topic:

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How to Determine the Limits of Functions

from Math 104: Calculus

Chapter 6 / Lesson 4
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