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Chapter 5: Problem 35

Perform the indicated operation. Simplify the answer when possible. \(\frac{\sqrt{90}}{\sqrt{2}}\)

Short Answer

Expert verified
The simplified expression is \( 3\sqrt{5} \).

Step by step solution

01

Simplify the square roots

First, simplify each individual square root. For \( \sqrt{90} \), we can write it as \( \sqrt{9 \cdot 10} \) which simplifies to \( 3\sqrt{10} \). For \( \sqrt{2} \), it is already in its simplest form.
02

Divide the simplified expressions

For the next step divide \( 3\sqrt{10} \) by \( \sqrt{2} \). Which will give you \( \frac{3\sqrt{10}}{\sqrt{2}} \).
03

Further simplification

Ideally, we don't like to leave a square root in the denominator of a fraction. We can eliminate it by multiplying both the numerator and denominator by \( \sqrt{2} \). This results in \( \frac{3\sqrt{20}}{2} \).
04

Simplify final expression

The numerator \( \sqrt{20} \) can be simplified to \( 2\sqrt{5} \), so \( \frac{3\sqrt{20}}{2} \) becomes \( \frac{6\sqrt{5}}{2} \). Finally, we simplify by dividing the numerator and the denominator by 2 to get \( 3\sqrt{5} \).

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Most popular questions from this chapter

Write the first six terms of the geometric sequence with the first term, \(a_{1}\), and common ratio, \(r\). \(a_{1}=2, r=-3\)

Find the indicated term for the geometric sequence with first term, \(a_{1}\), and common ratio, \(r\). Find \(a_{8}\), when \(a_{1}=40,000, r=0.1\).

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You will develop geometric sequences that model the population growth for California and Texas, the two most populated U.S. states. The table shows the population of Texas for 2000 and 2010 , with estimates given by the U.S. Census Bureau for 2001 through \(2009 .\) $$ \begin{array}{|l|l|l|l|l|l|l|} \hline \text { Year } & \mathbf{2 0 0 0} & \mathbf{2 0 0 1} & \mathbf{2 0 0 2} & \mathbf{2 0 0 3} & \mathbf{2 0 0 4} & \mathbf{2 0 0 5} \\ \hline \begin{array}{l} \text { Population } \\ \text { in millions } \end{array} & 20.85 & 21.27 & 21.70 & 22.13 & 22.57 & 23.02 \\ \hline \end{array} $$ $$ \begin{array}{|l|c|c|c|c|c|} \hline \text { Year } & \mathbf{2 0 0 6} & \mathbf{2 0 0 7} & \mathbf{2 0 0 8} & \mathbf{2 0 0 9} & \mathbf{2 0 1 0} \\ \hline \begin{array}{l} \text { Population } \\ \text { in millions } \end{array} & 23.48 & 23.95 & 24.43 & 24.92 & 25.15 \\ \hline \end{array} $$ a. Divide the population for each year by the population in the preceding year. Round to two decimal places and show that Texas has a population increase that is approximately geometric. b. Write the general term of the geometric sequence modeling Texas's population, in millions, \(n\) years after \(1999 .\) c. Use your model from part (b) to project Texas's population, in millions, for the year 2020 . Round to two decimal places.

Write the first six terms of the geometric sequence with the first term, \(a_{1}\), and common ratio, \(r\). \(a_{1}=2, r=3\)
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