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Chapter 5: Problem 17

Perform the indicated operation. \(-5 \frac{2}{5}+\left(-6 \frac{4}{9}\right)\)

Short Answer

Expert verified
Answer: The sum of the two negative mixed numbers -5 2/5 and -6 4/9 is -457/45.

Step by step solution

01

Convert mixed numbers to improper fractions

To convert the mixed numbers into improper fractions, use the following formula: (whole number × denominator) + numerator. For the first mixed number (-5 2/5), it will be: \((-5) × 5 + 2 = -25 + 2 = -23\) So, the first improper fraction is: \(\frac{-23}{5}\). For the second mixed number (-6 4/9), it will be: \((-6) × 9 + 4 = -54 + 4 = -50\) So, the second improper fraction is: \(\frac{-50}{9}\).
02

Add the two improper fractions

To add the two fractions, you will need a common denominator, which is the least common multiple (LCM) of the denominators. The LCM of 5 and 9 is 45. Next, find the equivalent fractions for both fractions with the denominator of 45: \(\frac{-23}{5}*\frac{9}{9}=\frac{-207}{45}\) \(\frac{-50}{9}*\frac{5}{5}=\frac{-250}{45}\) Now, add the numerators and keep the common denominator: \(\frac{-207}{45}+\frac{-250}{45}=\frac{-207 + (-250)}{45}=\frac{-457}{45}\) Therefore, \(-5 \frac{2}{5}+(-6 \frac{4}{9}) = \frac{-457}{45}\).

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Most popular questions from this chapter

a. The Canadian dollar was recently worth \(\$ 0.9549 .\) Round this value to the nearest cent. b. Round the value of the Canadian dollar to the nearest dime.
\- A mixed number represents the sum of an integer and a proper fraction. This sum is implied, meaning that the sum sign, "+," is not written between the integer and the fraction. For example, the positive mixed number $4 \frac{3}{7}\( represents \)4+\frac{3}{7}\( and the negative mixed number \)-4 \frac{3}{7}$ represents the sum of a negative integer and a negative proper fraction, \(-4+\left(-\frac{3}{7}\right)\) or \(-4-\frac{3}{7}\).
In \(1992,\) the NEC SX-3/44 supercomputer had a speed of 0.02 teraflops (trillions of mathematical operations per second. In \(2009,\) IBM announced that it was building a new supercomputer, dubbed the Sequoia, for the U.S. Department of Energy's National Nuclear Security Administration to simulate nuclear tests and explosions. The Sequoia will be able to achieve processing speeds close to 20 petaflops, or quadrillions of mathematical operations per second. Twenty petaflops are equivalent to \(20,000\) teraflops. How many times faster will the Sequoia be than the NEC SX-3/44?
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