{"id":554,"date":"2019-04-29T14:42:11","date_gmt":"2019-04-29T18:42:11","guid":{"rendered":"https:\/\/pressbooks.bccampus.ca\/intermediatealgebrakpu\/?post_type=chapter&p=554"},"modified":"2019-12-03T16:42:40","modified_gmt":"2019-12-03T21:42:40","slug":"6-1-working-with-exponents","status":"publish","type":"chapter","link":"https:\/\/pressbooks.bccampus.ca\/intermediatealgebrakpu\/chapter\/6-1-working-with-exponents\/","title":{"raw":"6.1 Working with Exponents","rendered":"6.1 Working with Exponents"},"content":{"raw":"[latexpage]\r\n\r\nExponents often can be simplified using a few basic properties, since exponents represent repeated multiplication. The basic structure of writing an exponent looks like \\(x^y,\\) where \\(x\\) is defined as the base and \\(y\\) is termed its exponent. For this instance, \\(y\\) represents the number of times that the variable \\(x\\) is multiplied by itself\r\n\r\nWhen looking at numbers to various powers, the following table gives the numeric value of several numbers to various powers.\r\n\r\n\\(\\begin{array}{llllll}\r\n\\text{Squares}&\\text{Cubes}&4^{\\text{th}}\\text{ Power}&5^{\\text{th}}\\text{ Power}&6^{\\text{th}}\\text{ Power}&7^{\\text{th}}\\text{ Power} \\\\ \\\\\r\n2^2=4&2^3=8&2^4=16&2^5=32&2^6=64&2^7=128 \\\\\r\n3^2=9&3^3=27&3^4=81&3^5=243&3^6=729&3^7=2,187 \\\\\r\n4^2=16&4^3=64&4^4=256&4^5=1,024&4^6=4,096&4^7=16,384 \\\\\r\n5^2=25&5^3=125&5^4=625&5^5=3,125&5^6=15,625&5^7=78,125 \\\\\r\n6^2=36&6^3=216&6^4=1,296&6^5=7,776&6^6=46,656&6^7=279,936 \\\\\r\n7^2=49&7^3=343&7^4=2,401&7^5=16,807&7^6=117,649&7^7=823,543 \\\\\r\n8^2=64&8^3=512&8^4=4,096&8^5=32,768&8^6=262,144&8^7=2,097,152 \\\\\r\n9^2=81&9^3=729&9^4=6,561&9^5=59,049&9^6=531,441&9^7=4,782,969 \\\\\r\n10^2=100&10^3=1,000&10^4=10,000&10^5=100,000&10^6=1,000,000&10^7=10,000,000 \\\\ \\\\\r\n11^2=121&12^2=144&13^2=169&14^2=196&15^2=225&20^2=400\r\n\\end{array}\\)\r\n\r\nFor this chart, the expanded forms of the base 2 for multiple exponents is shown:\r\n

\\(\\begin{array}{lllllllllllllll}\r\n2^2&=&2&\\times &2&=&4,&&&&&&&& \\\\\r\n2^3&=&2&\\times &2&\\times &2&=&8,&&&&&& \\\\\r\n2^4&=&2&\\times &2&\\times &2&\\times &2&=&16,&&&& \\\\\r\n2^5&=&2&\\times &2&\\times &2&\\times &2&\\times &2&=&32&& \\\\\r\n2^6&=&2&\\times &2&\\times &2&\\times &2&\\times &2&\\times &2&=&64\\hspace{0.25in} \\text{and so on} \\\\\r\n\\end{array}\\)<\/p>\r\nOnce there is an exponent as a base that is multiplied or divided by itself to the number represented by the exponent, it becomes straightforward to identify a number of rules and properties that can be defined.\r\n\r\nThe following examples outline a number of these rules.\r\n

\r\n

Example 6.1.1<\/p>\r\n\r\n<\/header>\r\n

\r\n\r\nWhat is the value of \\(a^2 \\times a^3\\)?\r\n

\\(a^2 \\times a^3\\) means that you have \\((a \\times a) (a \\times a \\times a),\\)<\/p>\r\n

which is the same as \\((a \\times a \\times a \\times a \\times a)\\)<\/p>\r\n

or \\(a^5\\)<\/p>\r\nThis means that, when there is the same base and exponent that is multiplied by the same base with a different exponent, the total exponent value can be found by adding up the exponents.\r\n

\\(\\text{Product Rule of Exponents: }x^m \\times x^n = x^{m+n}\\)<\/p>\r\n\r\n<\/div>\r\n<\/div>\r\n

\r\n

Example 6.1.2<\/p>\r\n\r\n<\/header>\r\n

\r\n\r\nWhat is the value of \\((a^2)^3\\)?\r\n

\\((a^2)^3\\) means that you have \\((a^2) \\times (a^2) \\times (a^2)\\),<\/p>\r\n

which is the same as \\((a \\times a) (a \\times a) (a \\times a)\\)<\/p>\r\n

or \\((a \\times a \\times a \\times a \\times a \\times a)\\),<\/p>\r\n

which equals \\(a^6\\)<\/p>\r\nWhen you have some base and exponent where both are multiplied by another exponent, the total exponent value can be found by multiplying the two different exponents together.\r\n

\\(\\text{Power of a Power Rule of Exponents: }(x^m)^n = x^{mn}\\)<\/p>\r\n\r\n<\/div>\r\n<\/div>\r\n

\r\n

Example 6.1.3<\/p>\r\n\r\n<\/header>\r\n

\r\n\r\nWhat is the value of \\((ab)^2\\)?\r\n

\\((ab)^2\\) means that you have \\((ab) \\times (ab)\\),<\/p>\r\n

which is the same as \\((a \\times b) \\times (a \\times b)\\)<\/p>\r\n

or \\((a \\times a \\times b \\times b)\\),<\/p>\r\n

which equals \\(a^2b^2\\)<\/p>\r\n

\\(\\text{Power of a Product Rule of Exponents: }(xy)^n = x^ny^n\\)<\/p>\r\n\r\n<\/div>\r\n<\/div>\r\n

\r\n

Example 6.1.4<\/p>\r\n\r\n<\/header>\r\n

\r\n\r\nWhat is the value of \\(\\dfrac{a^5}{a^3}\\)?\r\n\r\n\\(\\dfrac{a^5}{a^3}\\) means that you have \\(\\dfrac{a \\times a \\times a \\times a \\times a}{a \\times a \\times a}\\), or that you are multiplying \\(a\\) by itself five times and dividing it by itself three times.\r\n\r\nMultiplying and dividing by the exact same number is a redundant exercise; multiples can be cancelled out prior to doing any multiplying and\/or dividing. The easiest way to do this type of a problem is to subtract the exponents, where the exponents in the denominator are being subtracted from the exponents in the numerator. This has the same effect as cancelling any excess or redundant exponents.\r\n\r\nFor this example, the subtraction looks like \\(a^{5-3},\\) leaving \\(a^2.\\)\r\n

\\(\\text{Quotient Rule of Exponents: }\\dfrac{x^m}{x^n}=x^{m-n}\\hspace{0.25in} (x \\ne 0)\\)<\/p>\r\n\r\n<\/div>\r\n<\/div>\r\n

\r\n

Example 6.1.5<\/p>\r\n\r\n<\/header>\r\n

\r\n\r\nWhat is the value of \\(\\left(\\dfrac{a}{b}\\right)^3\\)?\r\n\r\nExpanded, this exponent is the same as:\r\n

\\(\\dfrac{a}{b}\\times \\dfrac{a}{b}\\times \\dfrac{a}{b}\\)<\/p>\r\nWhich is the same as:\r\n

\\(\\dfrac{a \\times a \\times a}{b \\times b \\times b} \\text{ or } \\dfrac{a^3}{b^3}\\)<\/p>\r\nOne can see that this result is very similar to the power of a product rule of exponents.\r\n

\\(\\text{Power of a Quotient Rule of Exponents: }\\left(\\dfrac{x}{y}\\right)^n = \\dfrac{x^n}{y^n}\\hspace{0.25in} (y \\ne 0)\\)<\/p>\r\n\r\n<\/div>\r\n<\/div>\r\n

Questions<\/h1>\r\nSimplify the following.\r\n
    \r\n \t
  1. \\(4\\cdot 4^4\\cdot 4^4\\)<\/li>\r\n \t
  2. \\(4\\cdot 4^4\\cdot 4^2\\)<\/li>\r\n \t
  3. \\(2m^4n^2\\cdot 4nm^2\\)<\/li>\r\n \t
  4. \\(x^2y^4\\cdot xy^2\\)<\/li>\r\n \t
  5. \\((3^3)^4\\)<\/li>\r\n \t
  6. \\((4^3)^4\\)<\/li>\r\n \t
  7. \\((2u^3v^2)^2\\)<\/li>\r\n \t
  8. \\((xy)^3\\)<\/li>\r\n \t
  9. \\(4^5 \\div 4^3\\)<\/li>\r\n \t
  10. \\(3^7 \\div 3^3\\)<\/li>\r\n \t
  11. \\(3nm^2 \\div 3n\\)<\/li>\r\n \t
  12. \\(x^2y^4 \\div 4xy\\)<\/li>\r\n \t
  13. \\((x^3y^4\\cdot 2x^2y^3)^2\\)<\/li>\r\n \t
  14. \\([(u^2v^2)(2u^4)]^3\\)<\/li>\r\n \t
  15. \\([(2x)^3 \\div x^3]^2\\)<\/li>\r\n \t
  16. \\((2a^2b^2a^7) \\div (ba^4)^2\\)<\/li>\r\n \t
  17. \\([(2y^{17}) \\div (2x^2y^4)^4]^3\\)<\/li>\r\n \t
  18. \\([(xy^2)(y^4)^2] \\div 2y^4\\)<\/li>\r\n \t
  19. \\((2xy^5\\cdot 2x^2y^3) \\div (2xy^4\\cdot y^3)\\)<\/li>\r\n \t
  20. \\((2y^3x^2) \\div [(x^2y^4)(x^2)]\\)<\/li>\r\n \t
  21. \\([(q^3r^2)(2p^2q^2r^3)^2] \\div 2p^3\\)<\/li>\r\n \t
  22. \\((2x^4y^5)(2z^{10}x^2y^7) \\div (xy^2z^2)^4\\)<\/li>\r\n<\/ol>\r\nAnswer Key 6.1<\/a>","rendered":"

    Exponents often can be simplified using a few basic properties, since exponents represent repeated multiplication. The basic structure of writing an exponent looks like \"x^y,\" where \"x\" is defined as the base and \"y\" is termed its exponent. For this instance, \"y\" represents the number of times that the variable \"x\" is multiplied by itself<\/p>\n

    When looking at numbers to various powers, the following table gives the numeric value of several numbers to various powers.<\/p>\n

    \"\begin{array}{llllll}<\/p>\n

    For this chart, the expanded forms of the base 2 for multiple exponents is shown:<\/p>\n

    \"\begin{array}{lllllllllllllll}<\/p>\n

    Once there is an exponent as a base that is multiplied or divided by itself to the number represented by the exponent, it becomes straightforward to identify a number of rules and properties that can be defined.<\/p>\n

    The following examples outline a number of these rules.<\/p>\n

    \n
    \n

    Example 6.1.1<\/p>\n<\/header>\n

    \n

    What is the value of \"a^2 \times a^3\"?<\/p>\n

    \"a^2 \times a^3\" means that you have \"(a \times a) (a \times a \times a),\"<\/p>\n

    which is the same as \"(a \times a \times a \times a \times a)\"<\/p>\n

    or \"a^5\"<\/p>\n

    This means that, when there is the same base and exponent that is multiplied by the same base with a different exponent, the total exponent value can be found by adding up the exponents.<\/p>\n

    \"\text{Product Rule of Exponents: }x^m \times x^n = x^{m+n}\"<\/p>\n<\/div>\n<\/div>\n

    \n
    \n

    Example 6.1.2<\/p>\n<\/header>\n

    \n

    What is the value of \"(a^2)^3\"?<\/p>\n

    \"(a^2)^3\" means that you have \"(a^2) \times (a^2) \times (a^2)\",<\/p>\n

    which is the same as \"(a \times a) (a \times a) (a \times a)\"<\/p>\n

    or \"(a \times a \times a \times a \times a \times a)\",<\/p>\n

    which equals \"a^6\"<\/p>\n

    When you have some base and exponent where both are multiplied by another exponent, the total exponent value can be found by multiplying the two different exponents together.<\/p>\n

    \"\text{Power of a Power Rule of Exponents: }(x^m)^n = x^{mn}\"<\/p>\n<\/div>\n<\/div>\n

    \n
    \n

    Example 6.1.3<\/p>\n<\/header>\n

    \n

    What is the value of \"(ab)^2\"?<\/p>\n

    \"(ab)^2\" means that you have \"(ab) \times (ab)\",<\/p>\n

    which is the same as \"(a \times b) \times (a \times b)\"<\/p>\n

    or \"(a \times a \times b \times b)\",<\/p>\n

    which equals \"a^2b^2\"<\/p>\n

    \"\text{Power of a Product Rule of Exponents: }(xy)^n = x^ny^n\"<\/p>\n<\/div>\n<\/div>\n

    \n
    \n

    Example 6.1.4<\/p>\n<\/header>\n

    \n

    What is the value of \"\dfrac{a^5}{a^3}\"?<\/p>\n

    \"\dfrac{a^5}{a^3}\" means that you have \"\dfrac{a \times a \times a \times a \times a}{a \times a \times a}\", or that you are multiplying \"a\" by itself five times and dividing it by itself three times.<\/p>\n

    Multiplying and dividing by the exact same number is a redundant exercise; multiples can be cancelled out prior to doing any multiplying and\/or dividing. The easiest way to do this type of a problem is to subtract the exponents, where the exponents in the denominator are being subtracted from the exponents in the numerator. This has the same effect as cancelling any excess or redundant exponents.<\/p>\n

    For this example, the subtraction looks like \"a^{5-3},\" leaving \"a^2.\"<\/p>\n

    \"\text{Quotient Rule of Exponents: }\dfrac{x^m}{x^n}=x^{m-n}\hspace{0.25in} (x \ne 0)\"<\/p>\n<\/div>\n<\/div>\n

    \n
    \n

    Example 6.1.5<\/p>\n<\/header>\n

    \n

    What is the value of \"\left(\dfrac{a}{b}\right)^3\"?<\/p>\n

    Expanded, this exponent is the same as:<\/p>\n

    \"\dfrac{a}{b}\times \dfrac{a}{b}\times \dfrac{a}{b}\"<\/p>\n

    Which is the same as:<\/p>\n

    \"\dfrac{a \times a \times a}{b \times b \times b} \text{ or } \dfrac{a^3}{b^3}\"<\/p>\n

    One can see that this result is very similar to the power of a product rule of exponents.<\/p>\n

    \"\text{Power of a Quotient Rule of Exponents: }\left(\dfrac{x}{y}\right)^n = \dfrac{x^n}{y^n}\hspace{0.25in} (y \ne 0)\"<\/p>\n<\/div>\n<\/div>\n

    Questions<\/h1>\n

    Simplify the following.<\/p>\n

      \n
    1. \"4\cdot 4^4\cdot 4^4\"<\/li>\n
    2. \"4\cdot 4^4\cdot 4^2\"<\/li>\n
    3. \"2m^4n^2\cdot 4nm^2\"<\/li>\n
    4. \"x^2y^4\cdot xy^2\"<\/li>\n
    5. \"(3^3)^4\"<\/li>\n
    6. \"(4^3)^4\"<\/li>\n
    7. \"(2u^3v^2)^2\"<\/li>\n
    8. \"(xy)^3\"<\/li>\n
    9. \"4^5 \div 4^3\"<\/li>\n
    10. \"3^7 \div 3^3\"<\/li>\n
    11. \"3nm^2 \div 3n\"<\/li>\n
    12. \"x^2y^4 \div 4xy\"<\/li>\n
    13. \"(x^3y^4\cdot 2x^2y^3)^2\"<\/li>\n
    14. \"[(u^2v^2)(2u^4)]^3\"<\/li>\n
    15. \"[(2x)^3 \div x^3]^2\"<\/li>\n
    16. \"(2a^2b^2a^7) \div (ba^4)^2\"<\/li>\n
    17. \"[(2y^{17}) \div (2x^2y^4)^4]^3\"<\/li>\n
    18. \"[(xy^2)(y^4)^2] \div 2y^4\"<\/li>\n
    19. \"(2xy^5\cdot 2x^2y^3) \div (2xy^4\cdot y^3)\"<\/li>\n
    20. \"(2y^3x^2) \div [(x^2y^4)(x^2)]\"<\/li>\n
    21. \"[(q^3r^2)(2p^2q^2r^3)^2] \div 2p^3\"<\/li>\n
    22. \"(2x^4y^5)(2z^{10}x^2y^7) \div (xy^2z^2)^4\"<\/li>\n<\/ol>\n

      Answer Key 6.1<\/a><\/p>\n","protected":false},"author":540,"menu_order":14,"template":"","meta":{"pb_show_title":"on","pb_short_title":"","pb_subtitle":"","pb_authors":[],"pb_section_license":""},"chapter-type":[],"contributor":[],"license":[],"class_list":["post-554","chapter","type-chapter","status-publish","hentry"],"part":376,"_links":{"self":[{"href":"https:\/\/pressbooks.bccampus.ca\/intermediatealgebrakpu\/wp-json\/pressbooks\/v2\/chapters\/554","targetHints":{"allow":["GET"]}}],"collection":[{"href":"https:\/\/pressbooks.bccampus.ca\/intermediatealgebrakpu\/wp-json\/pressbooks\/v2\/chapters"}],"about":[{"href":"https:\/\/pressbooks.bccampus.ca\/intermediatealgebrakpu\/wp-json\/wp\/v2\/types\/chapter"}],"author":[{"embeddable":true,"href":"https:\/\/pressbooks.bccampus.ca\/intermediatealgebrakpu\/wp-json\/wp\/v2\/users\/540"}],"version-history":[{"count":12,"href":"https:\/\/pressbooks.bccampus.ca\/intermediatealgebrakpu\/wp-json\/pressbooks\/v2\/chapters\/554\/revisions"}],"predecessor-version":[{"id":3609,"href":"https:\/\/pressbooks.bccampus.ca\/intermediatealgebrakpu\/wp-json\/pressbooks\/v2\/chapters\/554\/revisions\/3609"}],"part":[{"href":"https:\/\/pressbooks.bccampus.ca\/intermediatealgebrakpu\/wp-json\/pressbooks\/v2\/parts\/376"}],"metadata":[{"href":"https:\/\/pressbooks.bccampus.ca\/intermediatealgebrakpu\/wp-json\/pressbooks\/v2\/chapters\/554\/metadata\/"}],"wp:attachment":[{"href":"https:\/\/pressbooks.bccampus.ca\/intermediatealgebrakpu\/wp-json\/wp\/v2\/media?parent=554"}],"wp:term":[{"taxonomy":"chapter-type","embeddable":true,"href":"https:\/\/pressbooks.bccampus.ca\/intermediatealgebrakpu\/wp-json\/pressbooks\/v2\/chapter-type?post=554"},{"taxonomy":"contributor","embeddable":true,"href":"https:\/\/pressbooks.bccampus.ca\/intermediatealgebrakpu\/wp-json\/wp\/v2\/contributor?post=554"},{"taxonomy":"license","embeddable":true,"href":"https:\/\/pressbooks.bccampus.ca\/intermediatealgebrakpu\/wp-json\/wp\/v2\/license?post=554"}],"curies":[{"name":"wp","href":"https:\/\/api.w.org\/{rel}","templated":true}]}}