{"id":1940,"date":"2021-12-02T19:40:05","date_gmt":"2021-12-03T00:40:05","guid":{"rendered":"https:\/\/opentextbc.ca\/intermediatealgebraberg\/back-matter\/answer-key-8-2\/"},"modified":"2022-11-02T10:38:34","modified_gmt":"2022-11-02T14:38:34","slug":"answer-key-8-2","status":"publish","type":"back-matter","link":"https:\/\/opentextbc.ca\/intermediatealgebraberg\/back-matter\/answer-key-8-2\/","title":{"raw":"Answer Key 8.2","rendered":"Answer Key 8.2"},"content":{"raw":"
    \n \t
  1. [latex]\\dfrac{8x^2}{9}\\cdot \\dfrac{9}{2}\\Rightarrow \\dfrac{\\cancel{2}\\cdot 4\\cdot x^2}{\\cancel{9}}\\cdot \\dfrac{\\cancel{9}}{\\cancel{2}}\\Rightarrow 4x^2[\/latex]<\/li>\n \t
  2. [latex]\\dfrac{8x}{3}\\div \\dfrac{4x}{7}\\Rightarrow \\dfrac{8x}{3}\\cdot \\dfrac{7}{4x} \\Rightarrow \\dfrac{2\\cdot \\cancel{4}\\cdot \\cancel{x}}{3}\\cdot \\dfrac{7}{\\cancel{4}\\cdot \\cancel{x}}\\Rightarrow \\dfrac{14}{3}[\/latex]<\/li>\n \t
  3. [latex]\\dfrac{5x^2}{4}\\cdot \\dfrac{6}{5}\\Rightarrow \\dfrac{\\cancel{5}\\cdot x^2}{2\\cdot \\cancel{2}}\\cdot \\dfrac{\\cancel{2}\\cdot 3}{\\cancel{5}}\\Rightarrow \\dfrac{3x^2}{2}[\/latex]<\/li>\n \t
  4. [latex]\\dfrac{10p}{5}\\div \\dfrac{8}{10}\\Rightarrow \\dfrac{10p}{5}\\cdot \\dfrac{10}{8}\\Rightarrow \\dfrac{\\cancel{2}\\cdot 5\\cdot p}{\\cancel{5}}\\cdot \\dfrac{\\cancel{2} \\cdot \\cancel{5}}{2\\cdot \\cancel{2} \\cdot \\cancel{2}}\\Rightarrow \\dfrac{5p}{2}[\/latex]<\/li>\n \t
  5. [latex]\\dfrac{\\cancel{(m-6)}}{7\\cancel{(7m-5)}}\\cdot \\dfrac{5m\\cancel{(7m-5)}}{\\cancel{m-6}}\\Rightarrow \\dfrac{5m}{7}[\/latex]<\/li>\n \t
  6. [latex]\\dfrac{7(n-2)}{10(n+3)}\\div \\dfrac{n-2}{(n+3)}\\Rightarrow \\dfrac{7\\cancel{(n-2)}}{10\\cancel{(n+3)}}\\cdot \\dfrac{\\cancel{(n+3)}}{\\cancel{n-2}}\\Rightarrow \\dfrac{7}{10}[\/latex]<\/li>\n \t
  7. [latex]\\dfrac{7r}{7r(r+10)}\\div \\dfrac{r-6}{(r-6)^2}\\Rightarrow \\dfrac{7r}{7r(r+10)}\\cdot \\dfrac{(r-6)^2}{r-6}\\Rightarrow \\dfrac{\\cancel{7r}}{\\cancel{7r}(r+10)}\\cdot \\dfrac{(r-6)\\cancel{(r-6)}}{\\cancel{r-6}}\\Rightarrow \\dfrac{r-6}{r+10}[\/latex]<\/li>\n \t
  8. [latex]\\dfrac{6x(x+4)}{(x-3)}\\cdot \\dfrac{(x-3)(x-6)}{6x(x-6)}\\Rightarrow \\dfrac{\\cancel{6x}(x+4)}{\\cancel{(x-3)}}\\cdot \\dfrac{\\cancel{(x-3)}\\cancel{(x-6)}}{\\cancel{6x}\\cancel{(x-6)}}\\Rightarrow x+4[\/latex]<\/li>\n \t
  9. [latex]\\dfrac{x-10}{35x+21}\\div \\dfrac{7}{35x+21}\\Rightarrow \\dfrac{x-10}{7\\cancel{(5x+3)}}\\cdot \\dfrac{\\cancel{7}\\cancel{(5x+3)}}{\\cancel{7}}\\Rightarrow \\dfrac{x-10}{7}[\/latex]<\/li>\n \t
  10. [latex]\\dfrac{v-1}{4}\\cdot \\dfrac{4}{v^2-11v+10}\\Rightarrow \\dfrac{\\cancel{v-1}}{\\cancel{4}}\\Rightarrow \\dfrac{\\cancel{4}}{\\cancel{(v-1)}(v-10)}\\Rightarrow \\dfrac{1}{v-10}[\/latex]<\/li>\n \t
  11. [latex]\\dfrac{x^2-6x-7}{x+5}\\cdot \\dfrac{x+5}{x-7}\\Rightarrow \\dfrac{\\cancel{(x-7)}(x+1)}{\\cancel{(x+5)}}\\cdot \\dfrac{\\cancel{(x+5)}}{\\cancel{(x-7)}}\\Rightarrow x+1[\/latex]<\/li>\n \t
  12. [latex]\\dfrac{1}{a-6}\\cdot \\dfrac{8a+80}{8}\\Rightarrow \\dfrac{1}{a-6}\\cdot \\dfrac{\\cancel{8}(a+10)}{\\cancel{8}}\\Rightarrow \\dfrac{a+10}{a-6}[\/latex]<\/li>\n \t
  13. [latex]\\dfrac{4m+36}{m+9}\\cdot \\dfrac{m-5}{5m^2}\\Rightarrow \\dfrac{4\\cancel{(m+9)}}{\\cancel{m+9}}\\cdot \\dfrac{m-5}{5m^2}\\Rightarrow \\dfrac{4(m-5)}{5m^2}[\/latex]<\/li>\n \t
  14. [latex]\\dfrac{2r}{r+6}\\div \\dfrac{2r}{74+42}\\Rightarrow \\dfrac{\\cancel{2r}}{\\cancel{r+6}}\\cdot \\dfrac{7\\cancel{(r+6)}}{\\cancel{2r}}\\Rightarrow 7[\/latex]<\/li>\n \t
  15. [latex]\\dfrac{n-7}{6n-12}\\cdot \\dfrac{12-6n}{n^2-13n+42}\\Rightarrow \\dfrac{\\cancel{(n-7)}}{\\cancel{6}(n-2)}\\cdot \\dfrac{\\cancel{6}(2-n)}{(n-6)\\cancel{(n-7)}}\\Rightarrow \\dfrac{-1\\cancel{(n-2)}}{\\cancel{(n-2)}(n-6)}\\Rightarrow \\dfrac{-1}{n-6}[\/latex]<\/li>\n \t
  16. [latex]\\dfrac{x^2+11x+24}{6x^3+18x^2}\\cdot \\dfrac{6x^3+6x^2}{x^2+5x-24}\\Rightarrow \\dfrac{\\cancel{(x+3)}\\cancel{(x+8)}}{\\cancel{6x^2}\\cancel{(x+3)}}\\cdot \\dfrac{\\cancel{6x^2}(x+1)}{\\cancel{(x+8)}(x-3)}\\Rightarrow \\dfrac{x+1}{x-3}[\/latex]<\/li>\n \t
  17. [latex]\\dfrac{27a+36}{9a+63}\\div \\dfrac{6a+8}{2}\\Rightarrow \\dfrac{\\cancel{9}\\cancel{(3a+4)}}{\\cancel{9}(a+7)}\\cdot \\dfrac{\\cancel{2}}{\\cancel{2}\\cancel{(3a+4)}}\\Rightarrow[\/latex]\n[latex]\\dfrac{1}{a+7}[\/latex]<\/li>\n \t
  18. [latex]\\dfrac{k-7}{k^2-k-12}\\cdot \\dfrac{7k^2-28k}{8k^2-56k}\\Rightarrow \\dfrac{\\cancel{k-7}}{\\cancel{(k-4)}(k+3)}\\cdot \\dfrac{7\\cdot \\cancel{k}\\cancel{(k-4)}}{8\\cdot \\cancel{k}\\cancel{(k-7)}}\\Rightarrow \\dfrac{7}{8(k+3)}[\/latex]<\/li>\n \t
  19. [latex]\\dfrac{x^2-12x+32}{x^2-6x-16}\\cdot \\dfrac{7x^2+14x}{7x^2+21x}\\Rightarrow \\dfrac{\\cancel{(x-8)}(x-4)}{\\cancel{(x-8)}\\cancel{(x+2)}}\\cdot \\dfrac{\\cancel{7x}\\cancel{(x+2)}}{\\cancel{7x}(x+3)}\\Rightarrow \\dfrac{x-4}{x+3}[\/latex]<\/li>\n \t
  20. [latex]\\dfrac{9x^3+54x^2}{x^2+5x-14}\\cdot \\dfrac{x^2+5x-14}{10x^2}\\Rightarrow \\dfrac{9\\cancel{x^2}(x+6)}{10\\cancel{x^2}}\\Rightarrow \\dfrac{9(x+6)}{10}[\/latex]<\/li>\n \t
  21. [latex](10m^2+100m)\\cdot \\dfrac{18m^3-36m^2}{20m^2-40m}\\Rightarrow \\cancel{10m}(m+10)\\cdot \\dfrac{\\cancel{2}\\cdot 9m^2\\cancel{(m-2)}}{\\cancel{2}\\cdot \\cancel{10m}\\cancel{(m-2)}}\\Rightarrow[\/latex]\n[latex]9m^2(m+10)[\/latex]<\/li>\n \t
  22. [latex]\\dfrac{n-7}{n^2-2n-35}\\div \\dfrac{9n+54}{10n+50}\\Rightarrow \\dfrac{\\cancel{n-7}}{\\cancel{(n-7)}\\cancel{(n+5)}}\\cdot \\dfrac{10\\cancel{(n+5)}}{9(n+6)}\\Rightarrow \\dfrac{10}{9(n+6)}[\/latex]<\/li>\n \t
  23. [latex]\\\\ \\dfrac{x^2-1}{2x-4}\\cdot \\dfrac{x^2-4}{x^2-x-2}\\div \\dfrac{x^2+x-2}{3x-6}\\Rightarrow[\/latex]\n[latex]\\dfrac{\\cancel{(x-1)}\\cancel{(x+1)}}{2\\cancel{(x-2)}}\\cdot \\dfrac{\\cancel{(x+2)}\\cancel{(x-2)}}{\\cancel{(x-2)}\\cancel{(x+1)}}\\cdot \\dfrac{3\\cancel{(x-2)}}{\\cancel{(x+2)}\\cancel{(x-1)}}\\Rightarrow \\dfrac{3}{2}[\/latex]<\/li>\n \t
  24. [latex]\\dfrac{a^3+b^3}{a^2+3ab+2b^2}\\cdot \\dfrac{3a-6b}{3a^2-3ab+3b^2}\\div \\dfrac{a^2-4b^2}{a+2b}\\Rightarrow[\/latex]\n[latex]\\dfrac{\\cancel{(a+b)}\\cancel{(a^2-ab+b^2)}}{(a+2b)\\cancel{(a+b)}}\\cdot \\dfrac{\\cancel{3}\\cancel{(a-2b)}}{\\cancel{3}\\cancel{(a^2-ab+b^2)}}\\cdot \\dfrac{\\cancel{a+2b}}{\\cancel{(a-2b)}\\cancel{(a+2b)}}\\Rightarrow \\dfrac{1}{a+2b}[\/latex]<\/li>\n<\/ol>","rendered":"
      \n
    1. [latex]\\dfrac{8x^2}{9}\\cdot \\dfrac{9}{2}\\Rightarrow \\dfrac{\\cancel{2}\\cdot 4\\cdot x^2}{\\cancel{9}}\\cdot \\dfrac{\\cancel{9}}{\\cancel{2}}\\Rightarrow 4x^2[\/latex]<\/li>\n
    2. [latex]\\dfrac{8x}{3}\\div \\dfrac{4x}{7}\\Rightarrow \\dfrac{8x}{3}\\cdot \\dfrac{7}{4x} \\Rightarrow \\dfrac{2\\cdot \\cancel{4}\\cdot \\cancel{x}}{3}\\cdot \\dfrac{7}{\\cancel{4}\\cdot \\cancel{x}}\\Rightarrow \\dfrac{14}{3}[\/latex]<\/li>\n
    3. [latex]\\dfrac{5x^2}{4}\\cdot \\dfrac{6}{5}\\Rightarrow \\dfrac{\\cancel{5}\\cdot x^2}{2\\cdot \\cancel{2}}\\cdot \\dfrac{\\cancel{2}\\cdot 3}{\\cancel{5}}\\Rightarrow \\dfrac{3x^2}{2}[\/latex]<\/li>\n
    4. [latex]\\dfrac{10p}{5}\\div \\dfrac{8}{10}\\Rightarrow \\dfrac{10p}{5}\\cdot \\dfrac{10}{8}\\Rightarrow \\dfrac{\\cancel{2}\\cdot 5\\cdot p}{\\cancel{5}}\\cdot \\dfrac{\\cancel{2} \\cdot \\cancel{5}}{2\\cdot \\cancel{2} \\cdot \\cancel{2}}\\Rightarrow \\dfrac{5p}{2}[\/latex]<\/li>\n
    5. [latex]\\dfrac{\\cancel{(m-6)}}{7\\cancel{(7m-5)}}\\cdot \\dfrac{5m\\cancel{(7m-5)}}{\\cancel{m-6}}\\Rightarrow \\dfrac{5m}{7}[\/latex]<\/li>\n
    6. [latex]\\dfrac{7(n-2)}{10(n+3)}\\div \\dfrac{n-2}{(n+3)}\\Rightarrow \\dfrac{7\\cancel{(n-2)}}{10\\cancel{(n+3)}}\\cdot \\dfrac{\\cancel{(n+3)}}{\\cancel{n-2}}\\Rightarrow \\dfrac{7}{10}[\/latex]<\/li>\n
    7. [latex]\\dfrac{7r}{7r(r+10)}\\div \\dfrac{r-6}{(r-6)^2}\\Rightarrow \\dfrac{7r}{7r(r+10)}\\cdot \\dfrac{(r-6)^2}{r-6}\\Rightarrow \\dfrac{\\cancel{7r}}{\\cancel{7r}(r+10)}\\cdot \\dfrac{(r-6)\\cancel{(r-6)}}{\\cancel{r-6}}\\Rightarrow \\dfrac{r-6}{r+10}[\/latex]<\/li>\n
    8. [latex]\\dfrac{6x(x+4)}{(x-3)}\\cdot \\dfrac{(x-3)(x-6)}{6x(x-6)}\\Rightarrow \\dfrac{\\cancel{6x}(x+4)}{\\cancel{(x-3)}}\\cdot \\dfrac{\\cancel{(x-3)}\\cancel{(x-6)}}{\\cancel{6x}\\cancel{(x-6)}}\\Rightarrow x+4[\/latex]<\/li>\n
    9. [latex]\\dfrac{x-10}{35x+21}\\div \\dfrac{7}{35x+21}\\Rightarrow \\dfrac{x-10}{7\\cancel{(5x+3)}}\\cdot \\dfrac{\\cancel{7}\\cancel{(5x+3)}}{\\cancel{7}}\\Rightarrow \\dfrac{x-10}{7}[\/latex]<\/li>\n
    10. [latex]\\dfrac{v-1}{4}\\cdot \\dfrac{4}{v^2-11v+10}\\Rightarrow \\dfrac{\\cancel{v-1}}{\\cancel{4}}\\Rightarrow \\dfrac{\\cancel{4}}{\\cancel{(v-1)}(v-10)}\\Rightarrow \\dfrac{1}{v-10}[\/latex]<\/li>\n
    11. [latex]\\dfrac{x^2-6x-7}{x+5}\\cdot \\dfrac{x+5}{x-7}\\Rightarrow \\dfrac{\\cancel{(x-7)}(x+1)}{\\cancel{(x+5)}}\\cdot \\dfrac{\\cancel{(x+5)}}{\\cancel{(x-7)}}\\Rightarrow x+1[\/latex]<\/li>\n
    12. [latex]\\dfrac{1}{a-6}\\cdot \\dfrac{8a+80}{8}\\Rightarrow \\dfrac{1}{a-6}\\cdot \\dfrac{\\cancel{8}(a+10)}{\\cancel{8}}\\Rightarrow \\dfrac{a+10}{a-6}[\/latex]<\/li>\n
    13. [latex]\\dfrac{4m+36}{m+9}\\cdot \\dfrac{m-5}{5m^2}\\Rightarrow \\dfrac{4\\cancel{(m+9)}}{\\cancel{m+9}}\\cdot \\dfrac{m-5}{5m^2}\\Rightarrow \\dfrac{4(m-5)}{5m^2}[\/latex]<\/li>\n
    14. [latex]\\dfrac{2r}{r+6}\\div \\dfrac{2r}{74+42}\\Rightarrow \\dfrac{\\cancel{2r}}{\\cancel{r+6}}\\cdot \\dfrac{7\\cancel{(r+6)}}{\\cancel{2r}}\\Rightarrow 7[\/latex]<\/li>\n
    15. [latex]\\dfrac{n-7}{6n-12}\\cdot \\dfrac{12-6n}{n^2-13n+42}\\Rightarrow \\dfrac{\\cancel{(n-7)}}{\\cancel{6}(n-2)}\\cdot \\dfrac{\\cancel{6}(2-n)}{(n-6)\\cancel{(n-7)}}\\Rightarrow \\dfrac{-1\\cancel{(n-2)}}{\\cancel{(n-2)}(n-6)}\\Rightarrow \\dfrac{-1}{n-6}[\/latex]<\/li>\n
    16. [latex]\\dfrac{x^2+11x+24}{6x^3+18x^2}\\cdot \\dfrac{6x^3+6x^2}{x^2+5x-24}\\Rightarrow \\dfrac{\\cancel{(x+3)}\\cancel{(x+8)}}{\\cancel{6x^2}\\cancel{(x+3)}}\\cdot \\dfrac{\\cancel{6x^2}(x+1)}{\\cancel{(x+8)}(x-3)}\\Rightarrow \\dfrac{x+1}{x-3}[\/latex]<\/li>\n
    17. [latex]\\dfrac{27a+36}{9a+63}\\div \\dfrac{6a+8}{2}\\Rightarrow \\dfrac{\\cancel{9}\\cancel{(3a+4)}}{\\cancel{9}(a+7)}\\cdot \\dfrac{\\cancel{2}}{\\cancel{2}\\cancel{(3a+4)}}\\Rightarrow[\/latex]
      \n[latex]\\dfrac{1}{a+7}[\/latex]<\/li>\n
    18. [latex]\\dfrac{k-7}{k^2-k-12}\\cdot \\dfrac{7k^2-28k}{8k^2-56k}\\Rightarrow \\dfrac{\\cancel{k-7}}{\\cancel{(k-4)}(k+3)}\\cdot \\dfrac{7\\cdot \\cancel{k}\\cancel{(k-4)}}{8\\cdot \\cancel{k}\\cancel{(k-7)}}\\Rightarrow \\dfrac{7}{8(k+3)}[\/latex]<\/li>\n
    19. [latex]\\dfrac{x^2-12x+32}{x^2-6x-16}\\cdot \\dfrac{7x^2+14x}{7x^2+21x}\\Rightarrow \\dfrac{\\cancel{(x-8)}(x-4)}{\\cancel{(x-8)}\\cancel{(x+2)}}\\cdot \\dfrac{\\cancel{7x}\\cancel{(x+2)}}{\\cancel{7x}(x+3)}\\Rightarrow \\dfrac{x-4}{x+3}[\/latex]<\/li>\n
    20. [latex]\\dfrac{9x^3+54x^2}{x^2+5x-14}\\cdot \\dfrac{x^2+5x-14}{10x^2}\\Rightarrow \\dfrac{9\\cancel{x^2}(x+6)}{10\\cancel{x^2}}\\Rightarrow \\dfrac{9(x+6)}{10}[\/latex]<\/li>\n
    21. [latex](10m^2+100m)\\cdot \\dfrac{18m^3-36m^2}{20m^2-40m}\\Rightarrow \\cancel{10m}(m+10)\\cdot \\dfrac{\\cancel{2}\\cdot 9m^2\\cancel{(m-2)}}{\\cancel{2}\\cdot \\cancel{10m}\\cancel{(m-2)}}\\Rightarrow[\/latex]
      \n[latex]9m^2(m+10)[\/latex]<\/li>\n
    22. [latex]\\dfrac{n-7}{n^2-2n-35}\\div \\dfrac{9n+54}{10n+50}\\Rightarrow \\dfrac{\\cancel{n-7}}{\\cancel{(n-7)}\\cancel{(n+5)}}\\cdot \\dfrac{10\\cancel{(n+5)}}{9(n+6)}\\Rightarrow \\dfrac{10}{9(n+6)}[\/latex]<\/li>\n
    23. [latex]\\\\ \\dfrac{x^2-1}{2x-4}\\cdot \\dfrac{x^2-4}{x^2-x-2}\\div \\dfrac{x^2+x-2}{3x-6}\\Rightarrow[\/latex]
      \n[latex]\\dfrac{\\cancel{(x-1)}\\cancel{(x+1)}}{2\\cancel{(x-2)}}\\cdot \\dfrac{\\cancel{(x+2)}\\cancel{(x-2)}}{\\cancel{(x-2)}\\cancel{(x+1)}}\\cdot \\dfrac{3\\cancel{(x-2)}}{\\cancel{(x+2)}\\cancel{(x-1)}}\\Rightarrow \\dfrac{3}{2}[\/latex]<\/li>\n
    24. [latex]\\dfrac{a^3+b^3}{a^2+3ab+2b^2}\\cdot \\dfrac{3a-6b}{3a^2-3ab+3b^2}\\div \\dfrac{a^2-4b^2}{a+2b}\\Rightarrow[\/latex]
      \n[latex]\\dfrac{\\cancel{(a+b)}\\cancel{(a^2-ab+b^2)}}{(a+2b)\\cancel{(a+b)}}\\cdot \\dfrac{\\cancel{3}\\cancel{(a-2b)}}{\\cancel{3}\\cancel{(a^2-ab+b^2)}}\\cdot \\dfrac{\\cancel{a+2b}}{\\cancel{(a-2b)}\\cancel{(a+2b)}}\\Rightarrow \\dfrac{1}{a+2b}[\/latex]<\/li>\n<\/ol>\n","protected":false},"author":90,"menu_order":75,"template":"","meta":{"pb_show_title":"on","pb_short_title":"","pb_subtitle":"","pb_authors":[],"pb_section_license":"cc-by-nc-sa"},"back-matter-type":[],"contributor":[],"license":[56],"class_list":["post-1940","back-matter","type-back-matter","status-publish","hentry","license-cc-by-nc-sa"],"_links":{"self":[{"href":"https:\/\/opentextbc.ca\/intermediatealgebraberg\/wp-json\/pressbooks\/v2\/back-matter\/1940","targetHints":{"allow":["GET"]}}],"collection":[{"href":"https:\/\/opentextbc.ca\/intermediatealgebraberg\/wp-json\/pressbooks\/v2\/back-matter"}],"about":[{"href":"https:\/\/opentextbc.ca\/intermediatealgebraberg\/wp-json\/wp\/v2\/types\/back-matter"}],"author":[{"embeddable":true,"href":"https:\/\/opentextbc.ca\/intermediatealgebraberg\/wp-json\/wp\/v2\/users\/90"}],"version-history":[{"count":1,"href":"https:\/\/opentextbc.ca\/intermediatealgebraberg\/wp-json\/pressbooks\/v2\/back-matter\/1940\/revisions"}],"predecessor-version":[{"id":1941,"href":"https:\/\/opentextbc.ca\/intermediatealgebraberg\/wp-json\/pressbooks\/v2\/back-matter\/1940\/revisions\/1941"}],"metadata":[{"href":"https:\/\/opentextbc.ca\/intermediatealgebraberg\/wp-json\/pressbooks\/v2\/back-matter\/1940\/metadata\/"}],"wp:attachment":[{"href":"https:\/\/opentextbc.ca\/intermediatealgebraberg\/wp-json\/wp\/v2\/media?parent=1940"}],"wp:term":[{"taxonomy":"back-matter-type","embeddable":true,"href":"https:\/\/opentextbc.ca\/intermediatealgebraberg\/wp-json\/pressbooks\/v2\/back-matter-type?post=1940"},{"taxonomy":"contributor","embeddable":true,"href":"https:\/\/opentextbc.ca\/intermediatealgebraberg\/wp-json\/wp\/v2\/contributor?post=1940"},{"taxonomy":"license","embeddable":true,"href":"https:\/\/opentextbc.ca\/intermediatealgebraberg\/wp-json\/wp\/v2\/license?post=1940"}],"curies":[{"name":"wp","href":"https:\/\/api.w.org\/{rel}","templated":true}]}}