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		<title>Go Math Grade 8 Texas 1st Edition Solutions Chapter 2 Scientific Notation Exercise 2.1 Essential Questions</title>
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					<description><![CDATA[<p>Go Math Grade 8 Texas 1st Edition Solutions Chapter 2 Scientific Notation Exercise 2.1 Essential Questions &#160; Go Math Grade 8 Texas 1st Edition Chapter 2 Exercise 2.1 Essential Questions Solution Page 33  Exercise 1  Problem 1 To Find &#8211; Explanation how we can use scientific notation to express very large quantities. Scientific notation is a ... <a title="Go Math Grade 8 Texas 1st Edition Solutions Chapter 2 Scientific Notation Exercise 2.1 Essential Questions" class="read-more" href="https://answerkeyformath.com/go-math-grade-8-texas-1st-edition-solutions-chapter-2-scientific-notation-ex-2-1-essential-questions/" aria-label="More on Go Math Grade 8 Texas 1st Edition Solutions Chapter 2 Scientific Notation Exercise 2.1 Essential Questions">Read more</a></p>
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										<content:encoded><![CDATA[<h2>Go Math Grade 8 Texas 1st Edition Solutions Chapter 2 Scientific Notation Exercise 2.1 Essential Questions</h2>
<p>&nbsp;</p>
<p><span style="font-size: inherit;"><b>Go Math Grade 8 Texas 1st Edition Chapter 2 Exercise 2.1 Essential Questions Solution Page 33  Exercise 1  Problem 1</b></span></p>
<p><b>To Find &#8211; </b>Explanation how we can use scientific notation to express very large quantities.</p>
<p>Scientific notation is a form of presenting very large numbers or very small numbers in a simpler form.</p>
<p><b>Scientific notation form is:  </b>a × 10<span style="vertical-align: super; font-size: inherit;">± b</span></p>
<p>We can assume a very large quantities to explain scientific number</p>
<p>Lets assuming number is ⇒ 9000000</p>
<p>We can adjust all zeros in power of 10 , and main number written by multiply of 10<span style="vertical-align: super; font-size: inherit;">± b</span></p>
<p>So, in scientific notation &#8211; 9000000 = 9 × 10<sup>6</sup></p>
<p><b>So, we can use scientific notation is the form of  a × 10<sup>± b</sup> to express the very large quantities.</b></p>
<p>&nbsp;</p>
<p><b>Page 33  Exercise 2  Problem 2</b></p>
<p><b>Given &#8211;</b> A standard number 41,200.</p>
<p>We need to find the number of places to the left which we can move the decimal point to write scientific notation.</p>
<p>Convert the given number into the scientific notation and then the power of ten will give a number of places to the left to move the decimal point to write scientific notation.</p>
<p><b>Given value is ⇒  </b>41,200</p>
<p>We can change into scientific notation</p>
<p>⇒  4.1 × 10<sup>4</sup></p>
<p>The power of 10 is represents how many places to the left we moved the decimal point to write scientific notation.</p>
<p>So, we moved the decimal 4 places to the left to write scientific notation.</p>
<p><b>We moved the decimal 14 places to the left did to write  41,200  in scientific notation.</b></p>
<p><span style="font-size: inherit;"> </span></p>
<p><span style="font-size: inherit;"><b>Page 33  Exercise 3  Problem 3</b></span></p>
<p><b>Given:</b> A standard number 41,200</p>
<p><b>To Find &#8211; </b>Exponent on 10 when we write 41,200 in scientific notation.</p>
<p>Convert the given number into the scientific notation and then the power of ten will give the exponent.</p>
<p><b>Given value is ⇒ </b> 41,200</p>
<p>We can change into scientific notation</p>
<p>⇒     4.1 × 10<sup>4</sup></p>
<p><b>So, the exponent on 10when we write  41,200  in scientific notation is 4</b></p>
<p><b> </b></p>
<p><b>Page 34  Exercise 4  Problem 4</b></p>
<p><b>Given: </b>A standard number 6,400</p>
<p><b>To Find &#8211; </b>Change into scientific number.</p>
<p>Convert the given standard number into simplest possible.</p>
<p>Move the decimal point to the left until we left with number greater than one and less than ten.</p>
<p><b>Given value is ⇒  </b>6,400</p>
<p>W e can change into scientific notation in the form of a  × 10<span style="vertical-align: super; font-size: inherit;">± b</span></p>
<p>Now, move the decimal point to the left.</p>
<p>So, comparing it with standard forma is greater than one and less than ten.</p>
<p>So, standard notation is</p>
<p>⇒  6.4 × 10<sup>3</sup></p>
<p><b>In scientific notation  6.4 × 10<sup>3</sup></b></p>
<p>&nbsp;</p>
<h2>Solutions For Scientific Notation Exercise 2.1 Essential Questions In Go Math Grade 8 Texas Page 34  Exercise 5  Problem 5</h2>
<p><b>Given: </b>A standard number 570,000,000,000.</p>
<p><b>To Find &#8211;</b> Change into scientific number Convert the given standard number into simplest possible.</p>
<p>Move the decimal point to the left until we left with number greater than one and less than ten.</p>
<p><b>Given value is ⇒ </b> 570,000,000,000</p>
<p>We can change into scientific notation in the form of  a × 10<span style="vertical-align: super; font-size: inherit;">± b</span></p>
<p>Now, move the decimal point to the left.</p>
<p>So, comparing it with standard form such that a is greater than one and less than ten.</p>
<p>So, standard notation is ⇒  5.7 × <span style="font-size: inherit;">10<sup>11</sup></span></p>
<p><b>In scientific notation of   570,000,000,000  is 5.7 × </b><strong style="font-size: inherit;">10<sup>11</sup></strong></p>
<p><b> </b></p>
<p><b>Page 34  Exercise 6  Problem 6</b></p>
<p><b>Given:  </b>A standard number 9,461,000,000,000</p>
<p><b>To Find &#8211;</b> Change into scientific number Convert the given standard number into simplest possible.</p>
<p>Move the decimal point to the left until we left with number greater than one and less than ten.</p>
<p><b>Given value is ⇒ </b> 9,461,000,000,000</p>
<p>We can change into scientific notation in the form o f  a × <span style="font-size: inherit;">10</span><sup> ± b</sup></p>
<p>w, move the decimal point to the left.</p>
<p>So, comparing it with standard form such that a is greater than one and less than ten.</p>
<p>So, standard notation is  ⇒  9.461 ×10<sup>12</sup></p>
<p><b>In scientific notation  9.461 × 10<sup>12</sup></b></p>
<p><b><sup> </sup></b></p>
<p><b>Page 34  Exercise 7   Problem 7</b></p>
<p><b>Given: </b>A scientific number 3.5 × 10<sup>6</sup></p>
<p>To explain why the exponent in 3.5 × 10<sup>6 </sup>is 6 , while there are only 5 zeros in 3,500,000.</p>
<p>Move the decimal point to the left until we left with number greater than one and less than ten.</p>
<p><b>Given scientific number</b> ⇒  3.5 × 10<sup>6</sup></p>
<p>Changing into standard form</p>
<p>⇒  3.5 × 10<sup>6</sup></p>
<p>⇒  3.5 × 1,000,000</p>
<p>⇒  3,500,000</p>
<p>So, the this way there are only 5 zeros in 3,500,000</p>
<p>3.5 × 10<sup>6 </sup> means that decimal should be moved 6 decimals.</p>
<p>Moving one decimal gives 35 and the remaining five zeros are represented by placeholder zeros.</p>
<p><b>Moving one decimal gives 35 and the remaining five zeros are represented by placeholder zeros.</b></p>
<p>&nbsp;</p>
<p><b>Page 35  Exercise 8  Problem 8</b></p>
<p><b>Given:</b>  A scientific number 5.3</p>
<p><b>To Find &#8211;</b> Change into scientific number Convert the given standard number into its standard form</p>
<p><b>Given scientific notation is ⇒</b>  5.3</p>
<p>On the other way to write this</p>
<p>⇒  5.3</p>
<p>⇒  5.3 × 10<sup>0</sup></p>
<p>The exponent on 10 when we write 5.3 in scientific notation is 0</p>
<p><b>The exponent on 10 when we write 5.3 in scientific notation is 0</b></p>
<p>&nbsp;</p>
<p><b>Page 35  Exercise 9  Problem 9</b></p>
<p><b>Given: </b>A standard number.</p>
<p><b>To Find &#8211; </b>Change into scientific number Move the decimal to right by inspecting the exponent of ten.</p>
<p><b>Given scientific notation is ⇒ </b> 7.034 × <span style="font-size: inherit;"> 10</span><sup>9</sup></p>
<p>Move the decimal to right by inspecting the exponent of ten.</p>
<p>So, move the decimal nine place right.</p>
<p>Change into standard number</p>
<p>⇒  7.034 ×<span style="font-size: inherit;"> 10</span><sup>9</sup></p>
<p>⇒  7,034,000,000</p>
<p><b>The standard number is  7,034,000,000</b></p>
<p><span style="font-size: inherit;"> </span></p>
<h2><span style="font-size: inherit;">Go Math Grade 8 Chapter 2 Exercise 2.1 Scientific Notation Solutions Page 35  Exercise 10  Problem 10</span></h2>
<p><b>Given:</b> A scientific number 2.36 × 10<sup>5</sup></p>
<p><b>To Find &#8211; </b>Change into standard number.</p>
<p>The definition of the standard form of a number is representing the very large expanded number in a small number.</p>
<p><b>Given scientific notation is  ⇒ </b>   2.36 × 10<sup>5</sup></p>
<p>Change into standard number</p>
<p>⇒  2.36 × 105</p>
<p>⇒  2.36 × 100000</p>
<p>⇒  236,000</p>
<p><b>The standard number is  236,000</b></p>
<p><span style="font-size: inherit;"> </span></p>
<p><span style="font-size: inherit;"><b>Page 35 Exercise 11 Problem 11</b></span></p>
<p><b>Given:</b> A scientific number5×106</p>
<p><b>To Find &#8211; </b>Change into standard number.</p>
<p>The definition of the standard form of a number is representing the very large expanded number in a small number.</p>
<p><b>Given scientific notation is  ⇒</b>   5 × 10<sup>6</sup></p>
<p>Changing into standard number</p>
<p>⇒   5 × 10<sup>6</sup></p>
<p>⇒   5 × 1,000,000</p>
<p>⇒  5,000,000</p>
<p><b>The mass of one roosting colony of Monarch butterflies in Mexico in standard notation is  5,000,000  gram</b></p>
<p><b style="font-size: inherit;"> </b></p>
<p><b style="font-size: inherit;">Page 36  Exercise 12  Problem 12</b></p>
<p><b>Given:  </b>A standard number 1,304,000,000.</p>
<p><b>To Find &#8211; </b>Change into scientific number.</p>
<p>Move the decimal point to the left until we left with number greater than one and less than ten.</p>
<p><b>Given standard number is   ⇒   </b>1,304,000,000</p>
<p>Move the decimal point to the left until we left with number greater than one and less than ten.</p>
<p>Changing into scientific notation is</p>
<p>⇒  1,304,000,000</p>
<p>⇒  1.304 × 10<sup>9</sup></p>
<p><b>The scientific notation is  1.304 × 10<sup>9</sup></b></p>
<p>&nbsp;</p>
<p><b>Page 36  Exercise 13  Problem 13</b></p>
<p><b>Given: </b> A standard number 6,730,000.</p>
<p><b>To Find &#8211;</b> Change into scientific number.</p>
<p>Move the decimal point to the left until we left with number greater than one and less than ten.</p>
<p><b>Given standard number is  ⇒ </b>  6,730,000</p>
<p>Move the decimal point to the left until we left with number greater than one and less than ten.</p>
<p>Changing into standard number is</p>
<p>⇒  6,730,000</p>
<p>⇒  6.730 × 10<sup>6</sup></p>
<p><b>The scientific notation is  6.730 × 10<sup>6</sup></b></p>
<p><span style="font-size: inherit;"> </span></p>
<p><span style="font-size: inherit;"><b>Page 36  Exercise 14  Problem 14</b></span></p>
<p><b>Given: </b>A standard number 13,300.</p>
<p><b>To Find &#8211; </b>Change into scientific number.</p>
<p>Move the decimal point to the left until we left with number greater than one and less than ten</p>
<p><b>Given standard number is  ⇒  </b> 13,300</p>
<p>Move the decimal point to the left until we left with number greater than one and less than ten</p>
<p>Changing into scientific number is</p>
<p>⇒  13,300</p>
<p>⇒  1.33 × 10<sup>4</sup></p>
<p><b>The scientific number is 1.33 × 10<sup>4</sup></b></p>
<p><span style="font-size: inherit;"> </span></p>
<p><span style="font-size: inherit;"><b>Page 36 Exercise 15 Problem 15</b></span></p>
<p><b>Given:</b> An ordinary quarter contains about 97,700,000,000,000,000,000,000 atoms.</p>
<p>To Write number in scientific notation.</p>
<p>Simplify the given number in scientific notation.</p>
<p>Given number is 97,700,000,000,000,000,000,000 97,700,000,000,000,000,000,000</p>
<p>Move decimal 22 places to left side 97,700,000,000,000,000,000,000 = 9.77 × <span style="font-size: inherit;">10</span><sup>22</sup></p>
<p><b>Scientific notation of 97,700,000,000,000,000,000,000 is  9.77 × <span style="font-size: inherit;">10</span><sup>22</sup><span style="font-size: inherit;"> atoms.</span></b></p>
<p><span style="font-size: inherit;"> </span></p>
<h2><span style="font-size: inherit;">Essential Questions Solutions Exercise 2.1 Go Math Grade 8 Texas Page 36 Exercise 16 Problem 16</span></h2>
<p><b>Given: </b>The distance from Earth to the Moon is about 384,000 kilometers.</p>
<p>To Write number in scientific notation.</p>
<p>Simplify the given number in scientific notation.</p>
<p>Given number is  384,000</p>
<p>⇒  384,000</p>
<p>Move decimal 5 places to left side &#8211; 384,000 = 3.84 × 105</p>
<p><b>Scientific notation of  384,000  is  3.84 × 105  kilometers.</b></p>
<p>&nbsp;</p>
<p><b>Page 36  Exercise 17  Problem 17</b></p>
<p><b>Given: </b>Number is 4 × 10<sup>5</sup></p>
<p>To Write number in standard notation.</p>
<p>Simplify the given number in standard notation.</p>
<p>Given number is  4 × 10<sup>5</sup></p>
<p>⇒  4 × 10<sup>5</sup></p>
<p>Move decimal 5 places to right side 4 × 10<sup>5</sup></p>
<p>4 × 10<sup>5 </sup>= 400,000</p>
<p><b>Standard notation of 4 × 10<sup>5 </sup> is  400,000</b></p>
<p>&nbsp;</p>
<p><b>Page 36  Exercise 18  Problem 18</b></p>
<p><b>Given: </b>Number is 1.8499 × 10<sup>9</sup></p>
<p>To Write number in standard notation.</p>
<p>Simplify the given number in standard notation.</p>
<p>Given number is 1.8499 × 10<sup>9</sup></p>
<p>⇒ 1.8499 × 10<sup>9</sup></p>
<p>Move decimal 9 places to right side  1.8499 × 10<sup>9</sup></p>
<p>1.8499 × 10<sup>9 </sup>= 1,849,900,000</p>
<p><b>Standard notation of 1.8499 × 10<sup>9 </sup> is 1,849,900,000</b></p>
<p><span style="font-size: inherit;"> </span></p>
<p><span style="font-size: inherit;"><b>Page 36  Exercise 19  Problem 19</b></span></p>
<p><b>Given: </b> Number is 6.41 × 10<sup>3</sup></p>
<p>To Write number in standard notation.</p>
<p>Simplify the given number in standard notation.</p>
<p>Given number is  6.41 × 10<sup>3</sup></p>
<p>⇒ 6.41 × 10<sup>3</sup></p>
<p>Move decimal 3 places to right side  6.41 × 10<sup>3</sup></p>
<p>6.41 × 10<sup>3 </sup>= 6,410</p>
<p><b>Standard notation of 6.41 × 10<sup>3 </sup> is 6,410</b></p>
<p>&nbsp;</p>
<p><b>Step-By-Step Solutions For Go Math Grade 8 Chapter 2 Exercise 2.1 Essential Questions Page 36  Exercise 20  Problem 20</b></p>
<p><b>Given:</b> Number is 8.456 × 10<sup>7</sup></p>
<p>To Write number in standard notation.</p>
<p>Simplify the given number in standard notation.</p>
<p>Given number is 8.456 × 10<sup>7</sup></p>
<p>⇒  8.456 × 10<sup>7</sup></p>
<p>Move decimal 7 places to right side  8.456 × 10<sup>7</sup></p>
<p>8.456 × 10<sup>7</sup>= 84,560,000</p>
<p><b>Standard notation of  8.456 × 10<sup>7  </sup> is 84,560,000</b></p>
<p><span style="font-size: inherit;"> </span></p>
<p><span style="font-size: inherit;"><b>Page 36  Exercise 21  Problem 21</b></span></p>
<p><b>Given:  </b>Number is  9 × <span style="font-size: inherit;">10</span><sup>10</sup></p>
<p>To Write number in standard notation.</p>
<p>Simplify the given number in standard notation.</p>
<p>Given number is 9 × 10<sup>10</sup></p>
<p>⇒  9 × 10<sup>10</sup></p>
<p>Move decimal 10 places to right side  9 × 10<sup>10</sup></p>
<p>9 × 10<sup>10 </sup>= 90,000,000,000</p>
<p><b>Standard notation of 9 × 10<sup>10 </sup> is 90,000,000,000</b></p>
<p><span style="font-size: inherit;"> </span></p>
<h2><span style="font-size: inherit;">Go Math Grade 8 Scientific Notation Exercise 2.1 Free Solutions Page 36  Exercise 22  Problem 22</span></h2>
<p><b>Given: </b> 7.6 × 10<sup>6</sup></p>
<p><b>To Find &#8211;</b> Write this time in standard notation.</p>
<p>Simplify the given number in standard notation.</p>
<p>Move the decimal to the right in accordance with the exponent of ten.</p>
<p>Given number is 7.6 × 10<sup>6</sup></p>
<p>⇒  7.6 × 10<sup>6</sup></p>
<p>∴ 10<sup>6</sup> = 1000000</p>
<p>∴ 7.6 = \(\frac{76}{10}\)</p>
<p>7.6 × 10<sup>6</sup> =  \(\frac{76}{10}\)<span style="font-size: inherit;"> × 1000000</span></p>
<p>7.6 × 10<sup>6</sup> = 7600000 cans</p>
<p><b>Standard notation of 7.6 × 10<sup>6 </sup> is 7600000 cans</b></p>
<p>&nbsp;</p>
<p><b>Page 36 Exercise 23  Problem 23</b></p>
<p><b>Given:  </b>3,482,000,000.</p>
<p><b>To Find-</b> Write this in standard notation.</p>
<p>Simplify the given number in standard notation.</p>
<p>Move the decimal point to the left until we left with number greater than one and less than ten.</p>
<p>Given number is 3,482,000,000</p>
<p>Move the decimal point 9 places to the left   ⇒   3.482000000</p>
<p>Remove extra zeroes   ⇒  3.482</p>
<p>Divide the original number by 3.482 ⇒ 1000000000 = 10<sup>9</sup></p>
<p>Multiply numbers 3.482 and 10<sup>9 </sup> ⇒  3.482 × 10<sup>9</sup></p>
<p><b>Standard notation of  3,482,000,000 is 3.482 × 10<sup>9</sup></b></p>
<p>&nbsp;</p>
<h2>Go Math Grade 8 Texas Exercise 2.1 Essential Questions Student Solutions Page 36  Exercise 24  Problem 24</h2>
<p><b>Given: </b>The weight of Apatosaurus is 66,000 pounds.</p>
<p><b>To Find &#8211;</b>  Write this in standard notation.</p>
<p>Simplify the given number in standard notation.</p>
<p>Move the decimal point to the left until we left with number greater than one and less than ten.</p>
<p>Given number is  ⇒   66,000</p>
<p>Move the decimal point 4 places to the left    ⇒   6.6000</p>
<p>Remove extra zeroes    ⇒   6.6</p>
<p>Divide the original number by 6.6  ⇒   <span style="font-size: inherit;">\(\frac{66,000}{6.6}\) = 10<sup>4</sup></span></p>
<p>Multiply numbers 6.6 and 10<sup>4</sup></p>
<p>⇒  6.6 × 10<sup>4</sup></p>
<p><b>Standard notation of 66,000 is 6.6 × 10<sup>4</sup></b></p>
<p>&nbsp;</p>
<p><b>Page 37  Exercise 25  Problem 25</b></p>
<p><b>Given:</b> The weight of Argentinosaurus 220,000.</p>
<p><b>To Find &#8211; </b>Write this in standard notation.</p>
<p>Simplify the given number in standard notation.</p>
<p>Move the decimal point to the left until we left with number greater than one and less than ten.</p>
<p>Given number is   ⇒  220,000</p>
<p>Move the decimal point 5 places to the left  ⇒  2.20000</p>
<p>Remove extra zeroes   ⇒   2.2</p>
<p>Divide the original number by ⇒ <span style="font-size: inherit;">\(\frac{220000}{2.2}\) = 10</span><sup>5</sup></p>
<p>Multiply numbers 2.2 and  10<sup>5</sup></p>
<p>⇒ 2.2 × 10<sup>5</sup></p>
<p><b>The estimated weight of each dinosaur in scientific notation is  2.2 ×  10<sup>5</sup></b></p>
<p>&nbsp;</p>
<h2>Scientific Notation Exercise 2.1 Go Math Grade 8 Texas 1st Edition Answers Page 37  Exercise 26  Problem 26</h2>
<p><b>Given: </b>The weight of Brachiosaurus100.000.</p>
<p><b>To Find &#8211;</b>  Write this in standard notation.</p>
<p>Simplify the given number in standard notation.</p>
<p>Move the decimal point to the left until we left with number greater than one and less than ten.</p>
<p>Given number is 100,000</p>
<p>∴ 100000 =  10<sup>5</sup></p>
<p>100000 = 1 × 10<sup>5</sup></p>
<p><b>Standard notation of  100000  is 1 × 10<sup>5</sup></b></p>
<p><span style="font-size: inherit;"> </span></p>
<p><span style="font-size: inherit;"><b>Page 37  Exercise 27  Problem 27</b></span></p>
<p><b>Given: </b>The weight of Camarasaurus 40,000 pound.</p>
<p><b>To Find &#8211;</b> Write this in standard notation.</p>
<p>Simplify the given number in standard notation.</p>
<p>Move the decimal point to the left until we left with number greater than one and less than ten.</p>
<p>Given number is  ⇒  40,000</p>
<p>10<sup>4</sup> = 10000</p>
<p>40000 = 4 × 10<sup>4</sup></p>
<p><b>The estimated weight of each dinosaur in scientific notation is  4 × 10<sup>4</sup>.</b></p>
<p>&nbsp;</p>
<p><b>Page 37  Exercise 28  Problem 28</b></p>
<p><b>Given:</b> The weight of Cetiosauriscus 19,850 pound.</p>
<p><b>To Find &#8211; </b> Write this in standard notation.</p>
<p>Simplify the given number in standard notation.</p>
<p>Move the decimal point to the left until we left with number greater than one and less than ten.</p>
<p>Given number is ⇒ 19,850</p>
<p>Move the decimal point 4 places to the left  ⇒ <span style="font-size: inherit;">1.9850</span></p>
<p>Divide the original number by  ⇒ <span style="font-size: inherit;">\(\frac{19850}{1.9850}\)= 10<sup>4</sup></span></p>
<p>Multiply numbers 1.9850 and 10<sup>4</sup></p>
<p>19850 = 1.9850 × 10<sup>4</sup></p>
<p><b>The estimated weight of each dinosaur in scientific notation is 1.9850 × 10<sup>4</sup>.</b></p>
<p><span style="font-size: inherit;"> </span></p>
<p><span style="font-size: inherit;"><b>Page 37  Exercise 29  Problem 29</b></span></p>
<p><b>Given: </b>The weight of Diplodocus 50,000 pound.</p>
<p><b>To Find &#8211;  </b>Write this in standard notation.</p>
<p>Simplify the given number in standard notation.</p>
<p>Move the decimal point to the left until we left with number greater than one and less than ten</p>
<p>Given number is 50,000</p>
<p>10000 = 10<sup>4</sup></p>
<p>50000 = 5 × 10<sup>4</sup></p>
<p><b>The estimated weight of each dinosaur in scientific notation is 5 × 10<sup>4</sup></b></p>
<p><b><sup> </sup></b></p>
<p><b>Page 37  Exercise 30  Problem 30</b></p>
<p><b>Given: </b>A single little brown bat can eat up to 1000 mosquitoes in a single hour.</p>
<p><b>To Find &#8211;</b> Express in scientific notation how many mosquitoes a little brown bat might eat in 10.5 hours.</p>
<p>Write the given number and express in scientific notation.</p>
<p>Move the decimal point to the left until we left with number greater than one and less than ten.</p>
<p>Since a little brown bat can eat up to 1000 mosquitoes in an hour it can eat 10.5 times more in 10.5 hours</p>
<p>10.5 × 1000 = 10500</p>
<p>⇒ 10500</p>
<p>1.0500 × 10<sup>4</sup></p>
<p>10500 = 1.0500 × 10<sup>4</sup></p>
<p><b>Standard notation of 10500 is 1.0500 × 10<sup>4</sup></b></p>
<p>&nbsp;</p>
<p><b>Page 37  Exercise 31  Problem 31</b></p>
<p><b>Given: </b>Samuel can type nearly 40 words per minute.</p>
<p><b>To Find &#8211;</b> Find the number of hours it would take him to type 2.6 × 10<sup>5 </sup> words.</p>
<p>To find number of hours, divide the total number of words by typing speed.</p>
<p>To find the number of hours N, we need to divide the total number of words by typing speed (words per minute).</p>
<p>We have:  N = \(\frac{2.6 \times 10^5}{40}\)</p>
<p>N = \(\frac{26 \times 10^5}{4 \times 10^2}\)</p>
<p>N = 6.5 × 10 <span style="vertical-align: super; font-size: inherit;">5−2</span></p>
<p><span style="font-size: inherit;">N = 6.5 × 10<sup>3</sup></span></p>
<p>To convert from minutes to hours, we divide the result by 60</p>
<p>N = \(\frac{6.5 \times 10^3}{60}\)</p>
<p>N = \(\frac{65 \times 10^3}{6 \times 10^2}\)</p>
<p>N = \(\frac{65 \times 10^{3-2}}{6}\)</p>
<p>N = 10.83 × 10<sup>1</sup></p>
<p>N= 1.083 × 10<sup>2</sup></p>
<p><b>The number of hours that he would take to type 2.6 × 10<sup>5</sup> word is N = 1.083 × 10<sup>2</sup>.</b></p>
<p><b> </b></p>
<p><b>Page 37 Exercise 32 Problem 32</b></p>
<p><b>Given: </b>It can lift up to 1.182 × 10<sup> 3</sup> times its own weight.</p>
<p><b>To Find &#8211;  </b>If you were as strong as this insect, explain how you could find how many pounds you could lift.</p>
<p><b>Solution:</b> Number of pounds you can lift by multiplying 1.182 × 10<sup> 3</sup> by your weight.</p>
<p>Since you are as strong as the ant which can lift up to 1.182 × 10<sup> 3</sup> its own weight.</p>
<p><b>Since you are as strong as the ant which can lift up to 1.182 × 10<sup> 3</sup> <span style="font-size: inherit;">its own weight.</span></b></p>
<p><b style="font-size: inherit;"> </b></p>
<p><b style="font-size: inherit;">Page 37  Exercise 32  Problem 33</b></p>
<p><b>Given:</b> It can lift up to 1.182 × 10<sup>3</sup> times its own weight.</p>
<p>We need to find how much you could lift, in pounds and Express your answer in both scientific notation and standard notation.</p>
<p>Write the given number and solve it.</p>
<p><span style="font-size: inherit;">Given number is 1.182 × 10<sup>3</sup></span></p>
<p>​<span style="font-size: inherit;">Let weight = 100 pounds</span></p>
<p>Number of pounds =100 × 1.182 × 10<sup>3</sup></p>
<p>= 1.182 × 10<span style="vertical-align: super; font-size: inherit;">5</span></p>
<p>The scientific notation is 1.182 × 10<span style="vertical-align: super; font-size: inherit;">5</span></p>
<p>Now =1.182 × 10<sup> 5</sup></p>
<p>1.182 × 10<sup> 5</sup>= 1182 × <span style="font-size: inherit;">10</span><sup>5−3</sup></p>
<p>1.182 × 10<sup> 5</sup>= 1182 × 10<sup>2</sup></p>
<p>1.182 × 10<sup> 5</sup>= 118200</p>
<p>The standard notation is 118200</p>
<p><b>The scientific notation is 1.182×10</b><span style="vertical-align: super; font-size: inherit;"><b>5</b> </span><b style="font-size: inherit;">of weight that he could lift in pounds. The standard notation is 118200 of weight that he could lift in pounds.</b></p>
<p>&nbsp;</p>
<p><b><br />
Page 37 Exercise 33 Problem 34</b></p>
<p>To Find: Which measurement would be least likely to be written in scientific notation: number of stars in a galaxy, number of grains of sand on a beach, speed of a car, or population of a country?</p>
<p><b>Explain your reasoning.</b></p>
<p>Solution: Scientific notation is used to express measurements that are extremely large or extremely small.</p>
<p>Number of stars in a galaxy and number of grains of sand on a beach are extremely large, so we use scientific notation for those.</p>
<p>Comparing speed of a car and population of a country, it is clear that the speed of a car is a smaller number.</p>
<p>Therefore, the speed of a car is less likely to be written in scientific notation.</p>
<p>The speed of a car is less likely to be written in scientific notation.</p>
<p>Scientific notation is used to express measurements that are extremely large or extremely small.</p>
<p>Number of stars in a galaxy and number of grains of sand on a beach are extremely large, so we use scientific notation for those.</p>
<p>Comparing speed of a car and population of a country, it is clear that the speed of a car is a smaller number.</p>
<p>Therefore, the speed of a car is less likely to be written in scientific notation.</p>
<p>The speed of a car is less likely to be written in scientific notation.</p>
<p><b>The speed of a car is less likely to be written in scientific notation</b></p>
<p>&nbsp;</p>
<p><b>Page 37  Exercise 34  Problem 35</b></p>
<p><b>Given: </b>4.5 × 10<sup>6 </sup> and 2.1 × 10<sup>8</sup></p>
<p>We need to compare the two numbers and determine which is greater.</p>
<p>Convert both into standard form and then compare.</p>
<p>Given numbers 4.5 × 10<sup>6</sup> and 2.1 × 10<sup>8</sup></p>
<p>4.5 × 10<sup>6</sup> = 4500000</p>
<p>2.1 × 10<sup>8</sup> = 210000000</p>
<p>Now, comparing both, we conclude that 4500000 &lt; 210000000</p>
<p>So, 4.5 × 10<sup>6</sup> &lt; 2.1 × 10<sup>8</sup></p>
<p><b>Comparing the exponents we have  4.5 × 10<sup>6</sup> &lt; 2.1 × 10<sup>8</sup></b></p>
<p>&nbsp;</p>
<p><b>Page 37  Exercise 35  Problem 36</b></p>
<p><span style="font-size: inherit;">We have to do tests to determine whether the number is written in scientific notation or not.</span></p>
<p><b>Solution is:  </b>Scientific notation is in the form of a×10n where a is a first factor and 10n is the second factor.</p>
<p>For a number to be written in scientific notation, it&#8217;s base a should lie between 1 and 10.</p>
<p>If it is a power of 10 it can be a second factor in a scientific notation.</p>
<p>And the multiplication of first factor and second factor should be equal to standard number given.</p>
<p><b>First factor we can apply the test : if it decimal number greater than or equal to 1 but less than 10 it can be a first factor in a scientific notation.</b> <b style="font-size: inherit;">Second factor we can apply the test : If it is a power of 10 it can be a second factor in a scientific notation.</b></p>
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		<title>Go Math Grade 8 Texas 1st Edition Solutions Chapter 2 Scientific Notation Exercise</title>
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		<dc:creator><![CDATA[Marksparks]]></dc:creator>
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					<description><![CDATA[<p>Go Math Grade 8 Texas 1st Edition Solutions Chapter 2 Scientific Notation Exercise &#160; Go Math Grade 8 Texas 1st Edition Chapter 2 Scientific Notation Solutions Page 29  Exercise 1  Problem 1 We can solve real-world problems by use of scientific notation with help of scientific notation rules. &#160; Page 30  Exercise 2  Problem 2 ... <a title="Go Math Grade 8 Texas 1st Edition Solutions Chapter 2 Scientific Notation Exercise" class="read-more" href="https://answerkeyformath.com/go-math-grade-8-texas-1st-edition-solutions-chapter-2-scientific-notation-ex/" aria-label="More on Go Math Grade 8 Texas 1st Edition Solutions Chapter 2 Scientific Notation Exercise">Read more</a></p>
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										<content:encoded><![CDATA[<h2>Go Math Grade 8 Texas 1st Edition Solutions Chapter 2 Scientific Notation Exercise</h2>
<p>&nbsp;</p>
<p><b>Go Math Grade 8 Texas 1st Edition Chapter 2 Scientific Notation Solutions Page 29  Exercise 1  Problem 1</b></p>
<p><span style="font-size: inherit;">We can solve real-world problems by use of scientific notation with help of scientific notation rules.</span></p>
<p>&nbsp;</p>
<p><b>Page 30  Exercise 2  Problem 2</b></p>
<p><b>Given: </b>Exponential expression 10<sup>2</sup>.</p>
<p>We need to write the above exponential expression as a decimal.</p>
<p>Solution is -10<sup>2</sup> represent in decimal as 10 × 10 = 100.0</p>
<p><b>Exponential expression 10<sup>2</sup> as a decimal is = 100.0</b></p>
<p><b> </b></p>
<p><b>Page 30  Exercise 3  Problem 3</b></p>
<p><b>Given:</b> Exponential expression 10<sup>7</sup>.</p>
<p>We need to write the above exponential expression as a decimal.</p>
<p>Solution is -10<sup>7</sup> represent in decimal as =10 × 10 × 10 × 10 × 10 × 10 × 10 = 10000000.0.</p>
<p><b>Exponential expression 10<sup>7 </sup>as a decimal =10000000.0</b></p>
<p>&nbsp;</p>
<p><b><br />
Page 30  Exercise 4  Problem 4</b></p>
<p><b>Given: </b>45.3 ×10<sup>3</sup></p>
<p><b>To find &#8211; </b>Product of the given expression.</p>
<p>Multiply the expression and shift the decimal to the right according to the exponent.</p>
<p><span style="font-size: inherit;">Given &#8211;  45.3 × 10<sup>3</sup>.</span></p>
<p><b>Product of:</b></p>
<p>45.3 × 10<sup>3</sup> = (453 × 10<sup>−1</sup>)×(1 × 10<sup>3</sup>)</p>
<p>45.3 × 10<sup>3 </sup>= (453 × 1)×(10<sup>−1</sup> × 10<sup>3</sup>)</p>
<p>45.3 × 10<sup>3 </sup>=  453 × (<span style="font-size: inherit;">10 </span><sup>− 1 + 3</sup><span style="font-size: inherit;">)</span></p>
<p>45.3 × 10<sup>3</sup> =  453 × 10<sup>2</sup>.</p>
<p><b>Product of 45.3×10<sup>3 </sup> is = 453 × 10<sup>2</sup>.</b></p>
<p>&nbsp;</p>
<h2>Solutions For Scientific Notation Exercise In Go Math Grade 8 Texas  Page 30  Exercise 5  Problem 5</h2>
<p><b>Given: </b>7.08 ÷10<sup>2</sup></p>
<p><b>To find &#8211; </b>Quotient of the expression.</p>
<p>Move the decimal to left in accordance with the exponent of ten.</p>
<p>Given- 7.08 ÷ 10<sup>2</sup>.</p>
<p>Quotient of 7.08 ÷  10<sup>2</sup> = \(\frac{7.08}{10^2}\)</p>
<p>7.08 ÷10<sup>2</sup> = \(\frac{708 \times 10^{-2}}{1 \times 10^2}\)</p>
<p>7.08 ÷ 10<sup>2</sup> = \(=\left(\frac{708}{1}\right) \times\left(\frac{10^{-2}}{10^2}\right)\)</p>
<p>7.08 ÷ 10<sup>2 </sup> = 708 × (<span style="font-size: inherit;">10</span><sup>−2−2 </sup><span style="font-size: inherit;">)</span></p>
<p>7.08 ÷ 10<sup>−4</sup></p>
<p>= 708 × 10<sup>−4</sup></p>
<p><b>Quotient of 7.08 ÷ 10<sup>2 </sup> is = 708×10<sup>−4</sup>.</b></p>
<p>&nbsp;</p>
<p><b>Page 30  Exercise 6 Problem 6</b></p>
<p><b>Given: </b>0.00235 × 10<sup>6</sup></p>
<p><b>To find &#8211; </b> Quotient of the expression.</p>
<p>Move the decimal to left in accordance with the exponent of ten</p>
<p>Given- 0.00235 × 10<sup>6</sup>.</p>
<p>Product of 0.00235 × 10<sup>6 </sup>= (235 ×<span style="font-size: inherit;">10 </span><sup>− 5 </sup><span style="font-size: inherit;">) × (1 × 10</span><sup>6 </sup><span style="font-size: inherit;">)</span></p>
<p>0.00235 × 10<sup>6 </sup>= (235 × 1) × (10 <sup>− 5 </sup>× 10<sup>6 </sup>)</p>
<p>0.00235 × 10<sup>6</sup> = 235 × (<span style="font-size: inherit;">10 </span><sup>− 5 + 6 </sup><span style="font-size: inherit;">)</span></p>
<p>0.00235 × 10<sup>6</sup> = 235 × 10<sup>1</sup>.</p>
<p><b>Product of 0.00235  ×  106 is = 235 × 10<sup>1</sup>.</b></p>
<p>&nbsp;</p>
<p><strong>Go Math Grade 8 Chapter 2 Scientific Notation Exercise Solutions</strong></p>
<p><b>Given: </b>0.5 × 10<sup>2</sup>.</p>
<p><b>To find &#8211;</b>  product or quotient of above expression . 0.5 convert in exponential form as 5 × 10<sup>-1</sup> and solve it.</p>
<p>Product of 0.5 × 10<sup>2</sup></p>
<p>0.5 × 10<sup>2 </sup>=  (5 × <span style="font-size: inherit;">10</span><sup>−1</sup><span style="font-size: inherit;">) × (1 × 10</span><sup>2 </sup><span style="font-size: inherit;">)</span></p>
<p>0.5 × 10<sup>2 </sup>=  (5 × 1)×(10<sup>−1</sup> × 10<sup>2 </sup>)</p>
<p>0.5 × 10<sup>2 </sup>=  5 × (10 <sup>−1+2 </sup>)</p>
<p>0.5 × 10<sup>2 </sup>=  5 × 10<sup>1</sup>.</p>
<p><b>Product of  0.5 × 10<sup>2 </sup> is = 5 × 10<sup>1</sup>.</b></p>
<p>&nbsp;</p>
<p><b>Page 30  Exercise 8  Problem 8</b></p>
<p><b>Given:</b> 67.7 ÷ 10<sup>5</sup>.</p>
<p><b>To find &#8211; </b>Product or quotient of above expression .</p>
<p>67.7convert in exponential form as 677 × 10<sup>−1 </sup>and solve it.</p>
<p>Quotient of 67.7 ÷ 10<sup>5</sup> = \(\frac{677 \times 10^{-1}}{10^5}\)</p>
<p>67.7 ÷ 10<sup>5 </sup>=  \(677 \times\left(\frac{10^{-1}}{10^5}\right)\)</p>
<p>67.7 ÷ 10<sup>5 </sup>=  677 × (<span style="font-size: inherit;">10 <sup>−</sup></span><sup>1−5 </sup><span style="font-size: inherit;">)</span></p>
<p>67.7 ÷ 10<sup>5 </sup>=  677 × (<span style="font-size: inherit;">10 </span><sup>−6</sup><span style="font-size: inherit;">).</span></p>
<p><b>Quotient of 67.7 ÷ 105 is = 677 × 10 <sup>−6</sup>.</b></p>
<p>&nbsp;</p>
<h2>Scientific Notation Solutions Chapter 2 Go Math Grade 8 Texas Page 30  Exercise 9  Problem 9</h2>
<p><b>Given: </b>0.0057 × 10<sup>4</sup>.</p>
<p><b>To find &#8211;</b> Product or quotient of above expression .</p>
<p>0.0057 convert in exponential form as 57 × 10<sup>−4</sup> and solve it.</p>
<p><span style="font-size: inherit;">Product of  0.0057 × 10<sup>4 </sup></span></p>
<p><span style="font-size: inherit;">0.0057 × 10<sup>4  </sup>= (57 × 10<sup>−4 </sup>) × (1 × 10<sup>4 </sup>)</span></p>
<p><span style="font-size: inherit;">0.0057 × 10<sup>4  </sup></span>=   (57 × 1) × (10<sup>−4 </sup>× 10<sup>4 </sup>)</p>
<p><span style="font-size: inherit;">0.0057 × 10<sup>4  </sup></span>=  57 × ( <span style="font-size: inherit;">10</span><sup>−4+4 </sup><span style="font-size: inherit;">)</span></p>
<p><span style="font-size: inherit;">0.0057 × 10<sup>4  </sup></span>=  57.0</p>
<p><b>Product of 0.0057 × 10<sup>4</sup> is = 57.0</b></p>
<p>&nbsp;</p>
<p><b>Page 30 Exercise 10 Problem 10</b></p>
<p><b>Given: </b>195 ÷10<sup>6</sup>.</p>
<p>To find-product or quotient of above expression .</p>
<p>195 convert in exponential form as 195 × 10<sup>0 </sup> and solve it.</p>
<p>Quotient of 195 ÷10<sup>6</sup> = \(\frac{195 \times 10^0}{10^6}\)</p>
<p>195 ÷10<sup>6</sup>= \(\left(\frac{10^0}{10^6}\right)\)</p>
<p>195 ÷10<sup>6</sup>=  195 × 10<sup>0</sup><span style="vertical-align: super; font-size: inherit;">−6</span></p>
<p>195 ÷10<sup>6</sup>= 195 × 10<span style="vertical-align: super; font-size: inherit;">−6</span></p>
<p><b>Quotient of 195 ÷106 is = 195 × 10<span style="vertical-align: super; font-size: inherit;">−6</span><span style="font-size: inherit;">.</span></b></p>
<p>&nbsp;</p>
<p><span style="font-size: inherit;"><b>Step-By-Step Solutions For Go Math Grade 8 Chapter 2 Scientific Notation Page 31  Exercise 11  Problem 11</b></span></p>
<p><b>Given:</b></p>
<p><img fetchpriority="high" decoding="async" class="alignnone size-full wp-image-8560" src="https://answerkeyformath.com/wp-content/uploads/2023/04/Go-Math-Grade-8-Texas-1st-Edition-Solutions-Chapter-2-Scientific-Notation-Page-31-Exercise-11-Problem-11-Venna-1.webp" alt="Go Math Grade 8 Texas 1st Edition Solutions Chapter 2 Scientific Notation Page 31 Exercise 11 Problem 11 Venna 1" width="508" height="354" srcset="https://answerkeyformath.com/wp-content/uploads/2023/04/Go-Math-Grade-8-Texas-1st-Edition-Solutions-Chapter-2-Scientific-Notation-Page-31-Exercise-11-Problem-11-Venna-1.webp 508w, https://answerkeyformath.com/wp-content/uploads/2023/04/Go-Math-Grade-8-Texas-1st-Edition-Solutions-Chapter-2-Scientific-Notation-Page-31-Exercise-11-Problem-11-Venna-1-300x209.webp 300w" sizes="(max-width: 508px) 100vw, 508px" /></p>
<p><img decoding="async" class="alignnone size-full wp-image-8561" style="font-size: inherit;" src="https://answerkeyformath.com/wp-content/uploads/2023/04/Go-Math-Grade-8-Texas-1st-Edition-Solutions-Chapter-2-Scientific-Notation-Page-31-Exercise-11-Problem-11-Vocabulary.webp" alt="Go Math Grade 8 Texas 1st Edition Solutions Chapter 2 Scientific Notation Page 31 Exercise 11 Problem 11 Vocabulary" width="283" height="311" srcset="https://answerkeyformath.com/wp-content/uploads/2023/04/Go-Math-Grade-8-Texas-1st-Edition-Solutions-Chapter-2-Scientific-Notation-Page-31-Exercise-11-Problem-11-Vocabulary.webp 283w, https://answerkeyformath.com/wp-content/uploads/2023/04/Go-Math-Grade-8-Texas-1st-Edition-Solutions-Chapter-2-Scientific-Notation-Page-31-Exercise-11-Problem-11-Vocabulary-273x300.webp 273w" sizes="(max-width: 283px) 100vw, 283px" /></p>
<p><b>To find &#8211;</b>  Complete the Venn diagram .</p>
<p>Given expression 10 compare with exponential expression b<sup>a</sup> and solve it.</p>
<p>10<sup>2</sup> represent the exponential expression where 10 is base and 2 is exponent.</p>
<p>So in box 1 : _____________ 10 is base .</p>
<p>In box 2 :______________  2 is exponent.</p>
<p><img decoding="async" class="alignnone size-full wp-image-8562" src="https://answerkeyformath.com/wp-content/uploads/2023/04/Go-Math-Grade-8-Texas-1st-Edition-Solutions-Chapter-2-Scientific-Notation-Page-31-Exercise-11-Problem-11-Venna-2.webp" alt="Go Math Grade 8 Texas 1st Edition Solutions Chapter 2 Scientific Notation Page 31 Exercise 11 Problem 11 Venna 2" width="655" height="479" srcset="https://answerkeyformath.com/wp-content/uploads/2023/04/Go-Math-Grade-8-Texas-1st-Edition-Solutions-Chapter-2-Scientific-Notation-Page-31-Exercise-11-Problem-11-Venna-2.webp 655w, https://answerkeyformath.com/wp-content/uploads/2023/04/Go-Math-Grade-8-Texas-1st-Edition-Solutions-Chapter-2-Scientific-Notation-Page-31-Exercise-11-Problem-11-Venna-2-300x219.webp 300w" sizes="(max-width: 655px) 100vw, 655px" /></p>
<p><b>Venn diagram </b></p>
<p><img loading="lazy" decoding="async" class="alignnone size-full wp-image-8563" src="https://answerkeyformath.com/wp-content/uploads/2023/04/Go-Math-Grade-8-Texas-1st-Edition-Solutions-Chapter-2-Scientific-Notation-Page-31-Exercise-11-Problem-11-Venna-3.webp" alt="Go Math Grade 8 Texas 1st Edition Solutions Chapter 2 Scientific Notation Page 31 Exercise 11 Problem 11 Venna 3" width="655" height="479" srcset="https://answerkeyformath.com/wp-content/uploads/2023/04/Go-Math-Grade-8-Texas-1st-Edition-Solutions-Chapter-2-Scientific-Notation-Page-31-Exercise-11-Problem-11-Venna-3.webp 655w, https://answerkeyformath.com/wp-content/uploads/2023/04/Go-Math-Grade-8-Texas-1st-Edition-Solutions-Chapter-2-Scientific-Notation-Page-31-Exercise-11-Problem-11-Venna-3-300x219.webp 300w" sizes="auto, (max-width: 655px) 100vw, 655px" /></p>
<p>&nbsp;</p>
<p><b>Go Math Grade 8 Scientific Notation Free Solutions Page 31  Exercise 12  Problem 12</b></p>
<p><b>Given:</b></p>
<p><b><img loading="lazy" decoding="async" class="alignnone size-full wp-image-8564" src="https://answerkeyformath.com/wp-content/uploads/2023/04/Go-Math-Grade-8-Texas-1st-Edition-Solutions-Chapter-2-Scientific-Notation-Page-31-Exercise-12-Problem-12-Words.webp" alt="Go Math Grade 8 Texas 1st Edition Solutions Chapter 2 Scientific Notation Page 31 Exercise 12 Problem 12 Words" width="295" height="293" srcset="https://answerkeyformath.com/wp-content/uploads/2023/04/Go-Math-Grade-8-Texas-1st-Edition-Solutions-Chapter-2-Scientific-Notation-Page-31-Exercise-12-Problem-12-Words.webp 295w, https://answerkeyformath.com/wp-content/uploads/2023/04/Go-Math-Grade-8-Texas-1st-Edition-Solutions-Chapter-2-Scientific-Notation-Page-31-Exercise-12-Problem-12-Words-150x150.webp 150w" sizes="auto, (max-width: 295px) 100vw, 295px" /></b></p>
<p><b>To find &#8211; </b>Complete the sentences</p>
<p>Solution is &#8211; A number produced by raising a base to an exponent is a power.</p>
<p><b>Complete sentence is &#8211; A number produced by raising a base to an exponent is a power .</b></p>
<p><span style="font-size: inherit;"> </span></p>
<p><span style="font-size: inherit;"><b>Page 31  Exercise 13  Problem 13</b></span></p>
<p><b>Given:</b></p>
<p><b><img loading="lazy" decoding="async" class="alignnone size-full wp-image-8565" src="https://answerkeyformath.com/wp-content/uploads/2023/04/Go-Math-Grade-8-Texas-1st-Edition-Solutions-Chapter-2-Scientific-Notation-Page-31-Exercise-13-Problem-13-Words.webp" alt="Go Math Grade 8 Texas 1st Edition Solutions Chapter 2 Scientific Notation Page 31 Exercise 13 Problem 13 Words" width="295" height="293" srcset="https://answerkeyformath.com/wp-content/uploads/2023/04/Go-Math-Grade-8-Texas-1st-Edition-Solutions-Chapter-2-Scientific-Notation-Page-31-Exercise-13-Problem-13-Words.webp 295w, https://answerkeyformath.com/wp-content/uploads/2023/04/Go-Math-Grade-8-Texas-1st-Edition-Solutions-Chapter-2-Scientific-Notation-Page-31-Exercise-13-Problem-13-Words-150x150.webp 150w" sizes="auto, (max-width: 295px) 100vw, 295px" /></b></p>
<p><b style="font-size: inherit;">To find &#8211;</b><span style="font-size: inherit;"> Complete the sentences.</span></p>
<p><b>Solution is &#8211; </b>Scientific notation is a method of writing very large or very small numbers by using powers of 10 .</p>
<p><b>Complete sentence is &#8211; Scientific notation is a method of writing very large or very small numbers by using powers of 10 .</b></p>
<p><b> </b></p>
<h2>Scientific Notation Exercise Go Math Grade 8 Texas 1st Edition Answers Page 31  Exercise 14  Problem 14</h2>
<p><b>Given: </b>A  __________  is any number that can be expressed as a ratio of two integers.</p>
<p>To Complete the sentence.</p>
<p>Scientific notation is a form of presenting very large numbers or very small numbers in a simpler form.</p>
<p>A scientific notation is any number that can be expressed as a ratio of two integers.</p>
<p><b>A scientific notation is any number that can be expressed as a ratio of two integers.</b></p>
<p>The post <a rel="nofollow" href="https://answerkeyformath.com/go-math-grade-8-texas-1st-edition-solutions-chapter-2-scientific-notation-ex/">Go Math Grade 8 Texas 1st Edition Solutions Chapter 2 Scientific Notation Exercise</a> appeared first on <a rel="nofollow" href="https://answerkeyformath.com">Answer Key for Math</a>.</p>
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		<title>Go Math Grade 8 Texas 1st Edition Solutions Chapter 1 Real Numbers Exercise 1.1</title>
		<link>https://answerkeyformath.com/go-math-grade-8-texas-1st-edition-solutions-chapter-1-real-numbers-ex-1-1/</link>
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		<dc:creator><![CDATA[Marksparks]]></dc:creator>
		<pubDate>Wed, 19 Apr 2023 09:13:56 +0000</pubDate>
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					<description><![CDATA[<p>Go Math Grade 8 Texas 1st Edition Solutions Chapter 1 Real Numbers &#160; Go Math Grade 8 Texas 1st Edition Chapter 1 Exercise 1.1 Solution Page 7   Exercise 1   Problem 1 We divide the numerator by the denominator to convert a rational number to a decimal. We simply convert a rational number to a decimal ... <a title="Go Math Grade 8 Texas 1st Edition Solutions Chapter 1 Real Numbers Exercise 1.1" class="read-more" href="https://answerkeyformath.com/go-math-grade-8-texas-1st-edition-solutions-chapter-1-real-numbers-ex-1-1/" aria-label="More on Go Math Grade 8 Texas 1st Edition Solutions Chapter 1 Real Numbers Exercise 1.1">Read more</a></p>
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										<content:encoded><![CDATA[<h2>Go Math Grade 8 Texas 1st Edition Solutions Chapter 1 Real Numbers</h2>
<p>&nbsp;</p>
<p><b>Go Math Grade 8 Texas 1st Edition Chapter 1 Exercise 1.1 Solution Page 7   Exercise 1   Problem 1</b></p>
<p>We divide the numerator by the denominator to convert a rational number to a decimal.</p>
<p>We simply convert a rational number to a decimal by converting it to the form of a fraction.</p>
<p>The numerator is then divided by the denominator, yielding the division&#8217;s exact value.</p>
<p>Because a/b is a non-terminating, non-repeating decimal, it cannot be used to represent irrational values.</p>
<p>In order to approximate the value of irrational numbers, students should know the perfect squares (1 to 15). , as well as square roots of numbers less than 225, are examples of irrational numbers.</p>
<p><b>In order to change a rational number to a decimal, we divide the numerator with the denominator or can be converted to a decimal by the division method. </b></p>
<p><b> </b></p>
<p><b>Page 8 Exercise 2 Problem 2</b></p>
<p><b>Given: </b>\(\frac{1}{8}\).</p>
<p>To convert fractions into decimals.</p>
<p>Method &#8211; We use the division method to convert fractions into decimals that means dividing the numerator by denominator.</p>
<p>It is given \(\frac{1}{8}\).</p>
<p>We have to convert fractions into a decimal.</p>
<p>Divide 1 by 8.</p>
<p>We will get</p>
<p>=  \(\frac{1}{8}\)</p>
<p>\(\frac{1}{8}\) =  0.125.</p>
<p><b>The fraction \(\frac{1}{8}\) will be 0.125 in decimal.</b></p>
<p>&nbsp;</p>
<p><b>Page 8  Exercise 3  Problem 3</b></p>
<p><b>Given: </b>2\(\frac{1}{3}\)</p>
<p>To convert fractions into decimals.</p>
<p>Method- Convert mixed fraction into an improper fraction.</p>
<p>It is given,2\(\frac{1}{3}\)</p>
<p>We have to convert fractions into a decimal.</p>
<p><b>First, we convert the mixed number to an improper fraction:</b></p>
<p>2\(\frac{1}{3}\) = 2 + \(\frac{1}{3}\)</p>
<p>= \(\frac{6}{3}\)+\(\frac{1}{3}\)</p>
<p><b> </b>2\(\frac{1}{3}\) = \(\frac{7}{3}\)</p>
<p>To write 7/3 as a decimal, we divide the numerator by the denominator until the remainder is zero or until the digits in the quotient begin to repeat.</p>
<p>We add as many zeros after the decimal point in the dividend as needed.<br />
img</p>
<p>When a decimal has one or more digits that repeat indefinitely, we write the decimal with a bar over the repeating digit(s). In our case, 3 repeats indefinitely.</p>
<p><b>The decimal form of the given fraction is 2\(\frac{1}{3}\) = \(2 . \overline{3}\) or 2.3333 </b></p>
<p>&nbsp;</p>
<h2>Solutions For Real Numbers Exercise 1.1 In Go Math Grade 8 Texas Page 8  Exercise 4  Problem 4</h2>
<p>A positive number has two square roots because a positive number multiplied by itself is positive and a negative number multiplied by itself is also positive.</p>
<p>The principal square root is the nonnegative number that when multiplied by itself equals a.</p>
<p>The square root obtained using a calculator is the principal square root. The principal square root of a is written as √​a​​​.</p>
<p>The answer to the equation x<sup>2</sup> = b is the square root of a number b.</p>
<p>It&#8217;s a number that equals b when multiplied by itself.</p>
<p>Every positive number b has two square roots, which are indicated by the letters √b and −√b.</p>
<p><b>The positive square root of b denoted b, is the major square root.</b></p>
<p>&nbsp;</p>
<p><b>Page 8  Exercise 5  Problem 5</b></p>
<p>As, the number √2 be irrational because it is not an integer (2 is not a perfect square).</p>
<p>Any square root of any natural number that is not the square of a natural number is irrational.</p>
<p>Squares are integers obtained by multiplying one number by itself.</p>
<p>When you multiply a whole number by itself, the outcome is always another whole number, which is known as a perfect square.</p>
<p><b>As a result, perfect squares&#8217; square roots are always whole numbers.</b></p>
<p><b> </b></p>
<p><b>Real Numbers Exercise 1.1 Go Math Grade 8 Texas 1st Edition Answers Page 9  Exercise 6  Problem 6</b></p>
<p><b>Given number: </b>64</p>
<p>To find out the two number roots of the 64</p>
<p><b>Method −  </b>For finding the square root prime factorization method.</p>
<p>It is given that,64</p>
<p>We have to find the two square roots of each number.</p>
<p>The positive square root and the negative square root are the two square roots of any positive number.</p>
<p>Therefore, 8 × 8 = 64</p>
<p>The positive square root of 64 is 8</p>
<p>While the negative square root is−8</p>
<p>⇒ (−8) × (−8) = 64</p>
<p><b>The two square roots of 64 is 8 and −8.</b></p>
<p><span style="font-size: inherit;"> </span></p>
<p><span style="font-size: inherit;"><b>Page 9  Exercise 7  Problem 7</b></span></p>
<p><b>Given number: </b>100</p>
<p>To find out the two number roots of the 100</p>
<p><b>Method −</b>  For finding the square root prime factorization method.</p>
<p>It is given that, 100</p>
<p>We have to find the two square roots of each number.</p>
<p>The positive square root and the negative square root are the two square roots of any positive number.</p>
<p>Therefore, 10 × 10 = 100</p>
<p>The positive square root of 100 is 10</p>
<p>While the negative square root is −10</p>
<p>⇒ (−10) × (−10) = 100</p>
<p><span style="font-size: inherit;"><b>The two square roots of 100 is 10 and −10.</b></span></p>
<p><span style="font-size: inherit;"> </span></p>
<h2><span style="font-size: inherit;">Go Math Grade 8 Chapter 1 Exercise 1.1 Real Numbers Solutions  Page 9  Exercise 8  Problem 8</span></h2>
<p><b>Given:</b> \(\frac{1}{9}\)</p>
<p>To find the two square root of \(\frac{1}{9}\).</p>
<p><b>Method &#8211; </b>There must be two square roots of a positive real number, one is positive and another is the negative square root.</p>
<p>It is given,\(\frac{1}{9}\).</p>
<p>We have to find two square roots of a number.</p>
<p>For finding two square roots, we will take square root on both sides.</p>
<p>We will get</p>
<p>x<sup>2 </sup>= \(\frac{1}{9}\)</p>
<p>⇒  x = \(\sqrt{\frac{1}{9}}\)</p>
<p>⇒  x = ± \(\frac{1}{3}\)</p>
<p>= + \(\frac{1}{3}\), &#8211;\(\frac{1}{3}\).</p>
<p><b>The two square roots of \(\sqrt{\frac{1}{9}}\) will be + \(\frac{1}{3}\), &#8211;\(\frac{1}{3}\).</b></p>
<p><span style="font-size: inherit;"> </span></p>
<p><span style="font-size: inherit;"><b>Page 9  Exercise 9  Problem 9</b></span></p>
<p><b>Given:</b> Area of a square garden is 144 ft<sup>2</sup>.</p>
<p>To find the length of each side.</p>
<p><b>Method &#8211; </b>By using the area formula of the square.<br />
img</p>
<p>It is given, area of a square garden is 144 ft<sup>2</sup>.</p>
<p>To find the length of each side of garden.</p>
<p>we will use the area of the square.</p>
<p>We will get</p>
<p>⇒  a<sup>2</sup> = 144</p>
<p>⇒  a = \(\sqrt{144}\)</p>
<p>⇒  a = 12ft.</p>
<p><b>Each side of the square garden will be 12ft.</b></p>
<p>&nbsp;</p>
<p><b>Page 10  Exercise 10  Problem 10</b></p>
<p><b>Given:</b> \(\sqrt{2}\)</p>
<p>To find an estimation of   \(\sqrt{2}\)</p>
<p><b>Method &#8211; </b>Square root method</p>
<p>The square root of 2 or root 2 is written as√2 with a value of 1.414.</p>
<p>It is represented by the square root symbol.</p>
<p>The square root of 2 is the number which when multiplied with itself gives the result as 2. It is generally represented as √2 or 2​\(\frac{1}{2}\).</p>
<p><b>The numerical value of square root 2 up to 50 decimal places is as follows:  </b></p>
<p>\(\sqrt{2}\)<b> </b><span style="font-size: inherit;">=  1.41421356237309504880168872420969807856967187537694…</span></p>
<p><b>We can choose numbers with two decimal points instead of one and see in between which lies the number  \(\sqrt{2}\)</b></p>
<p><span style="font-size: inherit;"> </span></p>
<h2><span style="font-size: inherit;">Real Numbers Exercise 1.1 Solutions Go Math Grade 8 Texas Page 11 Exercise 11 Problem 11</span></h2>
<p>An irrational number cannot be expressed as a ratio between two numbers and it cannot be written as a simple fraction because there is not a finite number of numbers when written as a decimal.</p>
<p>Instead, the numbers in the decimal would go on forever, without repeating.</p>
<p>The decimal numeral system is the standard system for denoting integer and non-integer numbers.</p>
<p><b>Since π is irrational, it means that its decimal representation goes on forever. It cannot be expressed as the ratio of two integers.</b></p>
<p>&nbsp;</p>
<p><b>Go Math Grade 8 Texas Exercise 1.1 Student Solutions Page 11 Exercise 12 Problem 12</b></p>
<p><b>Given: </b>The figure is img</p>
<p>Plot π on the number line.</p>
<p><b>Method &#8211;</b> The number line method</p>
<p>The value of pi in decimal notation is about 3.14.</p>
<p>However, pi is an irrational number, which means that its decimal form does not terminate (such as \(\frac{1}{4}\) = 0.25) or become repetitious (such as \(\frac{1}{6}\) = 0.166666…).</p>
<p>As we have to plot the π on the given number line.</p>
<p>So, the value of π = 3.14<br />
img</p>
<p><b>Hence, the answer is </b><br />
img</p>
<p>The post <a rel="nofollow" href="https://answerkeyformath.com/go-math-grade-8-texas-1st-edition-solutions-chapter-1-real-numbers-ex-1-1/">Go Math Grade 8 Texas 1st Edition Solutions Chapter 1 Real Numbers Exercise 1.1</a> appeared first on <a rel="nofollow" href="https://answerkeyformath.com">Answer Key for Math</a>.</p>
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		<title>Go Math Grade 8 Texas 1st Edition Solutions Chapter 1 Real Numbers Exercise</title>
		<link>https://answerkeyformath.com/go-math-grade-8-texas-1st-edition-solutions-chapter-1-real-numbers-ex/</link>
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		<dc:creator><![CDATA[Marksparks]]></dc:creator>
		<pubDate>Wed, 19 Apr 2023 06:37:20 +0000</pubDate>
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		<guid isPermaLink="false">https://answerkeyformath.com/?p=8545</guid>

					<description><![CDATA[<p>Go Math Grade 8 Texas 1st Edition Solutions Chapter 1 Real Numbers Exercise &#160; Go Math Grade 8 Texas 1st Edition Chapter 1 Real Numbers Solutions Page 2  Exercise 1  Problem 1 The puzzle is given as To find a puzzle solution. By using number concepts, preview key vocabulary. The given puzzle is NOLRATAI RUNMEB ... <a title="Go Math Grade 8 Texas 1st Edition Solutions Chapter 1 Real Numbers Exercise" class="read-more" href="https://answerkeyformath.com/go-math-grade-8-texas-1st-edition-solutions-chapter-1-real-numbers-ex/" aria-label="More on Go Math Grade 8 Texas 1st Edition Solutions Chapter 1 Real Numbers Exercise">Read more</a></p>
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										<content:encoded><![CDATA[<h2>Go Math Grade 8 Texas 1st Edition Solutions Chapter 1 Real Numbers Exercise</h2>
<p>&nbsp;</p>
<p><span style="font-size: inherit;"><b>Go Math Grade 8 Texas 1st Edition Chapter 1 Real Numbers Solutions Page 2  Exercise 1  Problem 1</b></span></p>
<p>The puzzle is given as</p>
<p><img loading="lazy" decoding="async" class="alignnone size-full wp-image-8547" src="https://answerkeyformath.com/wp-content/uploads/2023/04/Go-Math-Grade-8-Texas-1st-Edition-Solutions-chapter-1-Real-Numbers-Exercise-Page-2-Exercise-1-Problem-1-Puzzle-1.png" alt="Go Math Grade 8 Texas 1st Edition Solutions chapter 1 Real Numbers Exercise Page 2 Exercise 1 Problem 1 Puzzle" width="595" height="120" srcset="https://answerkeyformath.com/wp-content/uploads/2023/04/Go-Math-Grade-8-Texas-1st-Edition-Solutions-chapter-1-Real-Numbers-Exercise-Page-2-Exercise-1-Problem-1-Puzzle-1.png 595w, https://answerkeyformath.com/wp-content/uploads/2023/04/Go-Math-Grade-8-Texas-1st-Edition-Solutions-chapter-1-Real-Numbers-Exercise-Page-2-Exercise-1-Problem-1-Puzzle-1-300x61.png 300w" sizes="auto, (max-width: 595px) 100vw, 595px" /></p>
<p>To find a puzzle solution.</p>
<p>By using number concepts, preview key vocabulary.</p>
<p><b>The given puzzle is</b></p>
<p>NOLRATAI</p>
<p>RUNMEB</p>
<p><b>The given statement is</b></p>
<p>Any number that can be written as a ratio of two integers.</p>
<p>The above statement give hint as the number related to rational value.</p>
<p>So, the solution is <b>&#8220;Rational Number&#8221;</b>.</p>
<p><b>The key vocabulary from this unit is &#8220;RATIONAL NUMBER&#8221;.</b></p>
<p><span style="font-size: inherit;"> </span></p>
<p><span style="font-size: inherit;"><b>Page 2  Exercise 2  Problem 2</b></span></p>
<p>The puzzle is given as</p>
<p><img loading="lazy" decoding="async" class="alignnone size-full wp-image-8549" src="https://answerkeyformath.com/wp-content/uploads/2023/04/Go-Math-Grade-8-Texas-1st-Edition-Solutions-chapter-1-Real-Numbers-Exercise-Page-2-Exercise-2-Problem-2-Puzzle-1.png" alt="Go Math Grade 8 Texas 1st Edition Solutions chapter 1 Real Numbers Exercise Page 2 Exercise 2 Problem 2 Puzzle" width="606" height="134" srcset="https://answerkeyformath.com/wp-content/uploads/2023/04/Go-Math-Grade-8-Texas-1st-Edition-Solutions-chapter-1-Real-Numbers-Exercise-Page-2-Exercise-2-Problem-2-Puzzle-1.png 606w, https://answerkeyformath.com/wp-content/uploads/2023/04/Go-Math-Grade-8-Texas-1st-Edition-Solutions-chapter-1-Real-Numbers-Exercise-Page-2-Exercise-2-Problem-2-Puzzle-1-300x66.png 300w" sizes="auto, (max-width: 606px) 100vw, 606px" /></p>
<p>To find a puzzle solution.</p>
<p><b>Method:</b> To preview key vocabulary by using number concepts.</p>
<p><b>The given puzzle is</b></p>
<p>PERTIANEG</p>
<p>MALCEDI</p>
<p><b>The given statement is</b></p>
<p>A decimal in which one or more digits repeat infinitely.</p>
<p>The infinitely repeat of number is known as repeating.</p>
<p>The number can be integer and non-integer so the second one is decimal.</p>
<p>So, the answer we get is <b>&#8220;Repeating Decimal&#8221;.</b></p>
<p><b>The key vocabulary from this unit is &#8220;REPEATING DECIMAL&#8221;.</b></p>
<p>&nbsp;</p>
<h2>Solutions For Real Numbers Exercise In Go Math Grade 8 Texas Page 2  Exercise 3  Problem 3</h2>
<p>The given statement is the set of rational and the set of irrational numbers.</p>
<p>To find a puzzle solution.</p>
<p>By using number concepts, preview key vocabulary.</p>
<p><b>The given puzzle is</b></p>
<p>LAER</p>
<p>SEBMNUR</p>
<p>To find a puzzle solution.</p>
<p>By using number concepts, preview key vocabulary</p>
<p>From the definition of real numbers</p>
<p>Real numbers are numbers that include both rational and irrational numbers.</p>
<p>So, the definition of a real number matches the given statement.</p>
<p>Also, rearrange the alphabets in the puzzle.</p>
<p><b>LAER</b> which is unscrambled to <b>REAL.</b></p>
<p>The next word is <b>SEBMNUR</b> which is unscrambled to<b> NUMBERS.</b></p>
<p>So, the answer is <b>&#8220;Real Numbers&#8221;</b></p>
<p><b>The key vocabulary from this unit is &#8220;REAL NUMBERS&#8221;.</b></p>
<p>&nbsp;</p>
<p><b>Page 2  Exercise 4  Problem 4</b></p>
<p><b>Given: </b>A method of writing very large or very small numbers by using powers of 10.</p>
<p>To find a puzzle solution.</p>
<p>By using number concepts, preview key vocabulary.</p>
<p><b>The given puzzle is</b></p>
<p>NIISICFTCE</p>
<p>OITANTON</p>
<p>As we have statement</p>
<p>A method of writing very large or very small numbers by using powers of 10 .</p>
<p>The statement talk about some notation concept as we know.</p>
<p>Scientific notation is a way to express numbers in a form that makes numbers that are too small or too large more convenient to write.</p>
<p>So, the answer is<b> &#8220;Scientific Notation&#8221;</b></p>
<p><b>The key vocabulary from this unit is &#8220;SCIENTIFIC NOTATION&#8221;.</b></p>
<p>&nbsp;</p>
<p><b>Go Math Grade 8 Chapter 1 Real Numbers Exercise Solutions Page 3  Exercise 5  Problem 5</b></p>
<p>Use real numbers to solve real-world problems.</p>
<p>We have to finding real world problems.</p>
<p>The set of real numbers is the combination of rational and irrational numbers.</p>
<p>The entire number line from ±∞ represents the set of all real numbers.</p>
<p>Real numbers are used in a multitude of real-world scenarios.</p>
<p>For example, they are used to describe distances, weights, area, volume, and price.</p>
<p><b>Real numbers are used in a multitude of real-world scenarios. They are used to describe distances, weights, area, volume, and price.</b></p>
<p>&nbsp;</p>
<p><b>Page 4  Exercise 6  Problem 6</b></p>
<p><b>Given number: </b> 7</p>
<p>To find out the square of the 7</p>
<p><b>Method &#8211;  </b>For finding square multiplying the number by itself.</p>
<p>It is given that,7</p>
<p>We have to find the square of 7</p>
<p>To get a square of a given number multiplies the number by itself, we get</p>
<p>So, Multiplying 7 by itself, we will get</p>
<p>Square of the 7 ​= 7 × 7</p>
<p>= 49</p>
<p><b>​The square of a given number 7 will be 49.</b></p>
<p>&nbsp;</p>
<h2>Real Numbers Solutions Chapter 1 Go Math Grade 8 Texas Page 4  Exercise 7  Problem 7</h2>
<p><b>Given:</b> 21.</p>
<p>To find the square of 21.</p>
<p><b>Method &#8211;</b> For finding square multiplying the number by itself.</p>
<p>It is given, 21</p>
<p>We have to find the square of 21</p>
<p>To get a square of a given number multiplies the number by itself.</p>
<p>By itself, we will get</p>
<p>So, Multiplying 21 by itself, we will get</p>
<p>Square of 21 = 21 × 21</p>
<p>= 441<br />
<b>​<br />
The square of a given number 21 will be 441.</b></p>
<p><span style="font-size: inherit;"> </span></p>
<p><span style="font-size: inherit;"><b>Page 4  Exercise 8  Problem 8</b></span></p>
<p><b>Given: </b>−3.</p>
<p>To find the square of −3</p>
<p><b>Method &#8211; </b>For finding the square of the given number multiply the number by itself.</p>
<p>It is given,−3.</p>
<p>We have to find the square of −3.</p>
<p>To get a square of a given number multiplies the number by itself.</p>
<p>So, Multiplying −3 by itself, we will get</p>
<p>Square of −3 ​= −3 × −3</p>
<p>= 9<br />
​<br />
<b>The square of a given number −3 will be 9.</b></p>
<p>&nbsp;</p>
<h2>Step-By-Step Solutions For Go Math Grade 8 Chapter 1 Real Numbers Page 4  Exercise 9  Problem 9</h2>
<p><b>Given: </b>2.7.</p>
<p>To find the square of 2.7.</p>
<p><b>Method &#8211;</b> For finding the square of a given number multiply the number by itself.</p>
<p>It is given,2.7.</p>
<p>We have to find the square of 2.7.</p>
<p>To get a square of a given number multiplies the number by itself.</p>
<p>So, multiplying by 2.7 itself, we will get.</p>
<p>Square of 2.7. ​= 2.7 × 2.7</p>
<p>= 7.29</p>
<p><b>The square of given numbers 2.7 will be 7.29.</b></p>
<p><span style="font-size: inherit;"> </span></p>
<p><span style="font-size: inherit;"><b>Page 4  Exercise 10  Problem 10</b></span></p>
<p><b>Given: </b>\(\frac{−1}{4}\).</p>
<p>To find the square of \(\frac{−1}{4}\).</p>
<p>Method &#8211; for finding the square of a given number multiply the number by itself.</p>
<p>It is given \(\frac{−1}{4}\).</p>
<p>We have to find the square of \(\frac{−1}{4}\).</p>
<p>To get a square of a given number multiplies the number by itself.</p>
<p>So, multiplying by \(\frac{−1}{4}\) itself, we will get.</p>
<p>The square of \(\frac{−1}{4}\) = \(\frac{−1}{4}\) × \(\frac{−1}{4}\)</p>
<p>= \(\frac{1}{16}\).</p>
<p><span style="font-size: inherit;"><b>The square of given numbers\(\frac{−1}{4}\) will be \(\frac{1}{16}\).</b></span></p>
<p>&nbsp;</p>
<p><b>Go Math Grade 8 Real Numbers Free Solutions Page 4  Exercise 11  Problem 11</b></p>
<p><b>Given:</b>−5.7.</p>
<p>To find the square of −5.7.</p>
<p>Method &#8211; for finding the square of a given number multiply the number by itself.</p>
<p>It is given,−5.7</p>
<p>We have to find the square of−5.7</p>
<p>To get a square of a given number multiplies the number by itself.</p>
<p>So, Multiplying by 5.7 itself, we will get</p>
<p>The square of −5.7= −5.7 × −5.7</p>
<p>= 32.49.</p>
<p><b>The square of given numbers 5.7 will be 32.49.</b></p>
<p>&nbsp;</p>
<p><b>Page 4  Exercise 12  Problem 12</b></p>
<p><b>Given: </b>1\(\frac{1}{2}\)</p>
<p>To find the square of 1\(\frac{1}{2}\).</p>
<p><b>Method &#8211;</b> For finding the square of a given number multiply the number by itself.</p>
<p>It is given 1\(\frac{1}{2}\)</p>
<p>We have to find the square of 1\(\frac{1}{2}\).</p>
<p>To get a square of a given number multiplies the number by itself.</p>
<p>But first, we have to convert mixed fractions into fractions.</p>
<p>​= 1\(\frac{1}{2}\)</p>
<p>= \(\frac{5×1+2}{5}\)</p>
<p>= \(\frac{7}{5}\)</p>
<p><span style="font-size: inherit;">Further, we have to find the square of \(\frac{7}{5}\).</span></p>
<p>So, Multiplying by \(\frac{7}{5}\) itself, we will get</p>
<p>The square of 1\(\frac{1}{2}\) = \(\frac{7}{5}\) × \(\frac{7}{5}\)</p>
<p>= \(\frac{49}{25}\).</p>
<p><b>The square of a given number \(\frac{7}{5}\) will be \(\frac{49}{25}\). </b></p>
<p>&nbsp;</p>
<h2>Go Math Grade 8 Texas Exercise Solutions For Real Numbers Page 4  Exercise 13  Problem 13</h2>
<p><b>Given: </b>9<sup>2</sup>.</p>
<p>To find the square of 9<sup>2</sup>.</p>
<p><b>Method &#8211;</b> For finding the square of a given number multiply the number by itself.</p>
<p>It is given, 9<sup>2</sup>.</p>
<p>We have to find the square of 9<sup>2</sup>.</p>
<p>To get a square of a given number multiplies the number by itself.</p>
<p>So, multiplying by 9 itself, we will get</p>
<p>Square of 9<sup>2 </sup>= 9 × 9</p>
<p>= 81.</p>
<p><b>The square of a given numbers 9<sup>2</sup> will be 81.</b></p>
<p><b style="font-size: inherit;"> </b></p>
<p><b style="font-size: inherit;">Page 4  Exercise 14  Problem 14</b></p>
<p><b>Given:</b> 2<sup>4</sup></p>
<p>To simplify exponential expression of 2<sup>4</sup>.</p>
<p><b>Method &#8211;</b> For finding the value of a given number multiply 4 times the number by itself.</p>
<p>It is given, 2<sup>4</sup>.</p>
<p>We have to simplify the exponential expression of 2<sup>4</sup>.</p>
<p>To simplify the exponential expression of a given number multiplies four times itself.</p>
<p>So, multiplying, we will get</p>
<p>2<sup>4 </sup>= 2 × 2 × 2 × 2</p>
<p>= 16</p>
<p><b>Simplified value of the exponential expression 2<sup>4</sup> will be 16.</b></p>
<p><span style="font-size: inherit;"> </span></p>
<p><span style="font-size: inherit;"><b>Real Numbers Exercise Go Math Grade 8 Texas 1st Edition Answers  Page 4  Exercise 15  Problem 15</b></span></p>
<p><b>Given: </b>(\(\frac{1}{3}\))<sup>2</sup></p>
<p>To simplify the exponential expression of (\(\frac{1}{3}\))<sup>2</sup>.</p>
<p><b>Method &#8211; </b>For finding the square of a given number multiply the number by itself.</p>
<p>It is given, (\(\frac{1}{3}\))<sup>2</sup></p>
<p>We have to simplify exponential expression of (\(\frac{1}{3}\))<sup>2</sup>.</p>
<p>To get a square of a given number multiplies the number by itself.</p>
<p>So, multiplying by \(\frac{1}{3}\) itself, we will get</p>
<p>(\(\frac{1}{3}\))<sup>2 </sup>= \(\frac{1}{3}\) × \(\frac{1}{3}\)</p>
<p>= \(\frac{1}{9}\)</p>
<p><b>The simplified exponential expression of (\(\frac{1}{3}\))<sup>2</sup> will be \(\frac{1}{9}\).</b></p>
<p><span style="font-size: inherit;"> </span></p>
<p><span style="font-size: inherit;"><b>Page 4  Exercise 16  Problem 16</b></span></p>
<p><b>Given: </b>(−7)<sup>2</sup>.</p>
<p>To simplify the exponential expression of (−7)<sup>2</sup>.</p>
<p><b>Method &#8211;</b> For finding the square of a given number multiply the number by itself.</p>
<p>It is given, (−7)<sup>2</sup>.</p>
<p>We have to simplify the exponential expression of(−7)<sup>2</sup>.</p>
<p>To get a square of a given number multiplies the number by itself.</p>
<p>So, multiplying by −7 itself, we will get</p>
<p>(−7)<sup>2</sup>. = −7 × −7</p>
<p>= 49.</p>
<p><b>The simplified exponential expression of (−7)<sup>2</sup> will be 49.</b></p>
<p>&nbsp;</p>
<p><b>Page 4  Exercise 17  Problem 17</b></p>
<p><b>Given:</b> 4<sup>3</sup>.</p>
<p>To simplify the exponential expression of 4<sup>3</sup>.</p>
<p>Method -For finding the cube of a number, multiply that number itself, then multiply the product obtained with the original number again.</p>
<p>It is given,4<sup>3</sup>.</p>
<p>Four multiply by itself three times.</p>
<p>We will get</p>
<p>4<sup>3 </sup>= 4 × 4 × 4</p>
<p>= 64.</p>
<p><b>The simplified exponential expression of 4<sup>3 </sup>will be 64.</b></p>
<p>&nbsp;</p>
<p><b>Page 4  Exercise 18  Problem 18</b></p>
<p><b>Given: </b>10<sup>5</sup>.</p>
<p>To simplify the exponential expression of 10<sup>5</sup>.</p>
<p>Method- To simplify the exponential expression, we will use exponent rules.</p>
<p>It is given,10<sup>5</sup>.</p>
<p>We have to simplify the exponential expression of 10<sup>5</sup>.</p>
<p>To get a simplified expression of a given number multiplies the number five times by itself.</p>
<p>So, multiply 10 to itself at five times.</p>
<p>We will get</p>
<p>10<sup>5 </sup>= 10 × 10 × 10 × 10 × 10</p>
<p>= 100000</p>
<p><b>The simplified exponential expression of 10<sup>5</sup> will be 100000.</b></p>
<p><span style="font-size: inherit;"> </span></p>
<p><span style="font-size: inherit;"><b>Page 4  Exercise 19  Problem 19</b></span></p>
<p><b>Given: </b>3\(\frac{1}{3}\).</p>
<p>To convert a mixed fraction into an improper fraction.</p>
<p>Method- To convert a mixed fraction into an improper fraction, we multiply the denominator of the fraction by the whole number and then add the product to the numerator.</p>
<p>Like, for converting the mixed fraction x \(\frac{a}{b}\) we will write the same as \(\frac{(b×x)+a}{b}\).</p>
<p>It is given 3\(\frac{1}{3}\).</p>
<p>We have to convert mixed fractions into improper fractions.</p>
<p>Multiply 3 by 3, the product will be 9.</p>
<p>= 3 × 3</p>
<p>= 9</p>
<p>Then, We will add the product with the numerator <span style="font-size: inherit;">We will get</span></p>
<p>= 9 + 1</p>
<p>= 10</p>
<p>After that Writing 10 over 3.</p>
<p>We will get improper fraction as \(\frac{10}{3}\).</p>
<p><b>The mixed fraction 3\(\frac{1}{3}\) will be \(\frac{10}{3}\) in improper fraction.</b></p>
<p>&nbsp;</p>
<p><b>Page 4 Exercise 20 Problem 20</b></p>
<p><b>Given: </b>5 \(\frac{5}{6}\).</p>
<p>To convert a mixed fraction into an improper fraction.</p>
<p><b>Method-</b> To convert a mixed fraction into an improper fraction, we multiply the denominator of the fraction by the whole number and then add the product to the numerator.Like, for converting the mixed fraction x \(\frac{a}{b}\) we will write the same as \(\frac{(b×x)+a}{b}\).</p>
<p>It is given 5 \(\frac{5}{6}\).</p>
<p>We have to convert mixed fractions into improper fractions.</p>
<p>Multiply 6 by 5, the product will be 30.</p>
<p>=  6 × 5</p>
<p>=  30</p>
<p>Then, We will add the product with the numerator <span style="font-size: inherit;">We will get</span></p>
<p>= 30 + 5</p>
<p>= 35.</p>
<p>After that Writing 35 over 6.</p>
<p>We will get an improper fraction as \(\frac{35}{6}\).</p>
<p><b>The mixed fraction 5 \(\frac{5}{6}\) will be \(\frac{35}{6}\)  in improper fraction.</b></p>
<p>&nbsp;</p>
<p><b>Page 4  Exercise 21  Problem 21</b></p>
<p>The whole number and positive number is 0,10,200.</p>
<p>The whole number and positive number is 21, 44, 308.</p>
<p>The integer and a negative number are -21,-78, -93.</p>
<p>Hence , the answer is</p>
<p><img loading="lazy" decoding="async" class="alignnone size-full wp-image-8550" src="https://answerkeyformath.com/wp-content/uploads/2023/04/Go-Math-Grade-8-Texas-1st-Edition-Solutions-chapter-1-Real-Numbers-Exercise-Page-4-Exercise-21-Problem-21-Integers.webp" alt="Go Math Grade 8 Texas 1st Edition Solutions chapter 1 Real Numbers Exercise Page 4 Exercise 21 Problem 21 Integers" width="437" height="301" srcset="https://answerkeyformath.com/wp-content/uploads/2023/04/Go-Math-Grade-8-Texas-1st-Edition-Solutions-chapter-1-Real-Numbers-Exercise-Page-4-Exercise-21-Problem-21-Integers.webp 437w, https://answerkeyformath.com/wp-content/uploads/2023/04/Go-Math-Grade-8-Texas-1st-Edition-Solutions-chapter-1-Real-Numbers-Exercise-Page-4-Exercise-21-Problem-21-Integers-300x207.webp 300w" sizes="auto, (max-width: 437px) 100vw, 437px" /></p>
<p><b style="font-size: inherit;"> </b></p>
<p><b style="font-size: inherit;">Page 5  Exercise 22  Problem 22</b></p>
<p><span style="font-size: inherit;">Prime factors that, themselves, have only factors of 1 and themselves. Non-prime numbers, like 10, have prime factors.</span></p>
<p>Note that 1 is a factor of all integers.</p>
<p>If the two factors are equal (the same), like 4 × 4 = 16 , then each of them is called a<span style="font-size: inherit;"> <b>&#8220;square root.</b></span><span style="font-size: inherit;"><b>&#8220;</b></span></p>
<p><span style="font-size: inherit;">One of the two equal factors of a number is a square root.</span></p>
<p><b>Hence, One of the two equal factors of a number is a square root.</b></p>
<p><span style="font-size: inherit;"> </span></p>
<p><span style="font-size: inherit;"><b>Page 5  Exercise 23  Problem 23</b></span></p>
<p>The square root of a non-negative number, is a non-negative number that when multiplied by itself results in the original number.</p>
<p>The square root of a negative number does not exist in the real numbers.</p>
<p><b>Example: </b>Since 25 is a non-negative number, there is a non-negative number 5, such that 52 = 25.</p>
<p>The real number is the non negative square root of a number.</p>
<p><b>Hence, the real number is the non negative square root of a number.</b></p>
<p>The post <a rel="nofollow" href="https://answerkeyformath.com/go-math-grade-8-texas-1st-edition-solutions-chapter-1-real-numbers-ex/">Go Math Grade 8 Texas 1st Edition Solutions Chapter 1 Real Numbers Exercise</a> appeared first on <a rel="nofollow" href="https://answerkeyformath.com">Answer Key for Math</a>.</p>
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