4t ESO/4.04 EQUACIONS/4.04.1 Equació 1r grau/4.04.1.6 Problemes EG1 4.04.1.6.11Q NombresConsecutius ax+b=c

Dos nombres consecutius sumen #c. Determina quin és el més petit dels dos.

Escriu l'equació ax+b=c que correspon al problema

Quin és el nombre més petit? Format: x = 3

]]> 1.0000000 0.3333333 0 0 a) =#sol1b) =#sol2]]> <question><wirisCasSession><![CDATA[<session lang="ca" version="2.0"><library closed="false"><mtext style="color:#ffc800" xml:lang="ca">variables</mtext><group><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><apply><csymbol definitionURL="http://www.wiris.com/XML/csymbol">repeat</csymbol><mtable><mtr><mtd><mi>c</mi><mo>=</mo><mo> </mo><mi>aleatori</mi><mo>(</mo><mo>-</mo><mn>20</mn><mo>,</mo><mn>20</mn><mo>)</mo></mtd></mtr><mtr><mtd><mi>sol1</mi><mo>=</mo><mn>2</mn><mi>x</mi><mo>+</mo><mn>1</mn><mo>=</mo><mi>c</mi></mtd></mtr><mtr><mtd><mi>R</mi><mo>=</mo><mi>resol</mi><mfenced><mrow><mn>2</mn><mi>x</mi><mo>+</mo><mn>1</mn><mo>=</mo><mi>c</mi></mrow></mfenced></mtd></mtr><mtr><mtd><mi>sol2</mi><mo>=</mo><msub><mi>R</mi><mrow><mn>1</mn><mo>,</mo><mn>1</mn></mrow></msub></mtd></mtr><mtr><mtd><mi>sol3</mi><mo>=</mo><msub><mi>R</mi><mrow><mn>1</mn><mo>,</mo><mn>1</mn><mo>,</mo><mn>2</mn></mrow></msub></mtd></mtr></mtable><mrow><mi>sol3</mi><mo>∈</mo><integers/></mrow></apply></math></input></command></group></library><group><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>c</mi></math></input><output><math xmlns="http://www.w3.org/1998/Math/MathML"><mn>5</mn></math></output></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>sol1</mi></math></input><output><math xmlns="http://www.w3.org/1998/Math/MathML"><mn>2</mn><mo>*</mo><mi>x</mi><mo>+</mo><mn>1</mn><mo>=</mo><mn>5</mn></math></output></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>R</mi></math></input><output><math xmlns="http://www.w3.org/1998/Math/MathML"><mfenced close="}" open="{"><mtable align="center"><mtr><mtd><mfenced close="}" open="{"><mtable align="center"><mtr><mtd><mi>x</mi><mo>=</mo><mn>2</mn></mtd></mtr></mtable></mfenced></mtd></mtr></mtable></mfenced></math></output></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>sol2</mi></math></input><output><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>x</mi><mo>=</mo><mn>2</mn></math></output></command></group><group><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"/></input></command></group></session>]]></wirisCasSession><correctAnswers><correctAnswer type="mathml"><![CDATA[<math xmlns="http://www.w3.org/1998/Math/MathML"><mi>a</mi><mo>)</mo><mo> </mo><mo>=</mo><mo>#</mo><mi>s</mi><mi>o</mi><mi>l</mi><mn>1</mn><mspace linebreak="newline"/><mi>b</mi><mo>)</mo><mo> </mo><mo>=</mo><mo>#</mo><mi>s</mi><mi>o</mi><mi>l</mi><mn>2</mn></math>]]></correctAnswer></correctAnswers><assertions><assertion name="syntax_expression"/><assertion name="equivalent_equations"/></assertions><options><option name="tolerance">10^(-4)</option><option name="relative_tolerance">false</option><option name="precision">4</option><option name="implicit_times_operator">false</option><option name="times_operator">·</option><option name="imaginary_unit">i</option></options><localData><data name="inputField">textField</data><data name="gradeCompound">and</data><data name="gradeCompoundDistribution"></data><data name="casSession"/><data name="inputCompound">true</data></localData></question> Si són consecutius i el més petit és x, l'altre és x+1.

Només cal que la seva suma sigui igual a #c

]]> Si els nombres són x i x+1, la seva suma és x + x + 1 i ha de ser igual a #c

]]> 4.04.1.6.12Q NombresConsecutiusParells ax+b=c

Tres nombres parells consecutius sumen «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mstyle mathsize=¨12px¨»«mrow»«mo mathvariant=¨bold¨ mathcolor=¨#00007F¨»#«/mo»«mi mathvariant=¨bold¨ mathcolor=¨#00007F¨»c«/mi»«/mrow»«/mstyle»«/math». Determina de quins nombres es tracten.

a) Escriu l'equació ax+b=c que correspon al problema

b) Quins són els 3 nombres? Format: {4,6,8}

c) Calcula la suma dels 3 nombres que has trobat (comprovació)

]]> 1.0000000 0.3333333 0 0 a) =#sol1b) =#sol2c) =#sol3]]> <question><wirisCasSession><![CDATA[<session lang="ca" version="2.0"><library closed="false"><mtext style="color:#ffc800" xml:lang="ca">variables</mtext><group><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><apply><csymbol definitionURL="http://www.wiris.com/XML/csymbol">repeat</csymbol><mtable><mtr><mtd><mi>c</mi><mo>=</mo><mo> </mo><mi>aleatori</mi><mo>(</mo><mo>-</mo><mn>99</mn><mo>,</mo><mn>99</mn><mo>)</mo></mtd></mtr><mtr><mtd><mi>sol1</mi><mo>=</mo><mn>3</mn><mo>*</mo><mi>x</mi><mo>+</mo><mn>6</mn><mo>=</mo><mi>c</mi></mtd></mtr><mtr><mtd><mi>R</mi><mo>=</mo><mi>resol</mi><mfenced><mrow><mn>3</mn><mi>x</mi><mo>+</mo><mn>6</mn><mo>=</mo><mi>c</mi></mrow></mfenced></mtd></mtr><mtr><mtd><mi>r1</mi><mo>=</mo><msub><mi>R</mi><mrow><mn>1</mn><mo>,</mo><mn>1</mn></mrow></msub></mtd></mtr><mtr><mtd><mi>r2</mi><mo>=</mo><msub><mi>R</mi><mrow><mn>1</mn><mo>,</mo><mn>1</mn><mo>,</mo><mn>2</mn></mrow></msub></mtd></mtr></mtable><mrow><mfenced><mrow><mi>r2</mi><mo>∈</mo><integers/></mrow></mfenced><mo>∧</mo><mfenced><mrow><mi>residu</mi><mo>(</mo><mi>r2</mi><mo>,</mo><mn>2</mn><mo>)</mo><mo>=</mo><mn>0</mn></mrow></mfenced></mrow></apply></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>sol2</mi><mo>=</mo><mfenced close="}" open="{"><mtable align="center"><mtr><mtd><mi>r2</mi><mo>,</mo><mi>r2</mi><mo>+</mo><mn>2</mn><mo>,</mo><mi>r2</mi><mo>+</mo><mn>4</mn></mtd></mtr></mtable></mfenced></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>sol3</mi><mo>=</mo><mi>c</mi></math></input></command></group></library><group><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>c</mi></math></input><output><math xmlns="http://www.w3.org/1998/Math/MathML"><mo>-</mo><mn>30</mn></math></output></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>sol1</mi></math></input><output><math xmlns="http://www.w3.org/1998/Math/MathML"><mn>3</mn><mo>*</mo><mi>x</mi><mo>+</mo><mn>6</mn><mo>=</mo><mo>-</mo><mn>30</mn></math></output></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>R</mi></math></input><output><math xmlns="http://www.w3.org/1998/Math/MathML"><mfenced close="}" open="{"><mtable align="center"><mtr><mtd><mfenced close="}" open="{"><mtable align="center"><mtr><mtd><mi>x</mi><mo>=</mo><mo>-</mo><mn>12</mn></mtd></mtr></mtable></mfenced></mtd></mtr></mtable></mfenced></math></output></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>sol2</mi></math></input><output><math xmlns="http://www.w3.org/1998/Math/MathML"><mfenced close="}" open="{"><mtable align="center"><mtr><mtd><mo>-</mo><mn>12</mn><mo>,</mo><mo>-</mo><mn>10</mn><mo>,</mo><mo>-</mo><mn>8</mn></mtd></mtr></mtable></mfenced></math></output></command></group><group><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"/></input></command></group></session>]]></wirisCasSession><correctAnswers><correctAnswer type="mathml"><![CDATA[<math xmlns="http://www.w3.org/1998/Math/MathML"><mi>a</mi><mo>)</mo><mo> </mo><mo>=</mo><mo>#</mo><mi>s</mi><mi>o</mi><mi>l</mi><mn>1</mn><mspace linebreak="newline"/><mi>b</mi><mo>)</mo><mo> </mo><mo>=</mo><mo>#</mo><mi>s</mi><mi>o</mi><mi>l</mi><mn>2</mn><mspace linebreak="newline"/><mi>c</mi><mo>)</mo><mo> </mo><mo>=</mo><mo>#</mo><mi>s</mi><mi>o</mi><mi>l</mi><mn>3</mn></math>]]></correctAnswer></correctAnswers><assertions><assertion name="syntax_expression"/><assertion name="equivalent_equations"/></assertions><options><option name="tolerance">10^(-4)</option><option name="relative_tolerance">false</option><option name="precision">4</option><option name="implicit_times_operator">false</option><option name="times_operator">·</option><option name="imaginary_unit">i</option></options><localData><data name="inputField">popupEditor</data><data name="gradeCompound">and</data><data name="gradeCompoundDistribution"></data><data name="casSession"/><data name="inputCompound">true</data></localData></question> Si són consecutius i el més petit és x, els següents són x+2 i x+4

Només cal que la seva suma sigui igual a #c

]]> Si els nombres són x, x+2 i x+4, la seva suma és x + x + 2 + x + 4 i ha de ser igual a #c

]]> 4.04.1.6.13Q NombresMúltipleFracció ax+b=c

Quin és el nombre tal que si al seu #a li resto el seu #b, el resultat és «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mstyle mathsize=¨12px¨»«mrow»«mo mathvariant=¨bold¨ mathcolor=¨#00007F¨»#«/mo»«mi mathvariant=¨bold¨ mathcolor=¨#00007F¨»c«/mi»«/mrow»«/mstyle»«/math»

a) Escriu l'equació ax+b=c que correspon al problema

b) Quin és el nombre? Format: x=2

]]> 1.0000000 0.5000000 0 0 a) =#sol1b) =#sol2]]> <question><wirisCasSession><![CDATA[<session lang="ca" version="2.0"><library closed="false"><mtext style="color:#ffc800" xml:lang="ca">variables</mtext><group><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mtable><mtr><mtd><mi>c</mi><mo>=</mo><mo> </mo><mi>aleatori</mi><mo>(</mo><mo>-</mo><mn>99</mn><mo>,</mo><mn>99</mn><mo>)</mo></mtd></mtr><mtr><mtd><mi>a</mi><mo>=</mo><mi>aleatori</mi><mfenced><mfenced close="}" open="{"><mtable align="center"><mtr><mtd><mi>doble</mi><mo>,</mo><mi>triple</mi><mo>,</mo><mi>quadruple</mi></mtd></mtr></mtable></mfenced></mfenced></mtd></mtr></mtable></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>b</mi><mo>=</mo><mi>aleatori</mi><mfenced><mfenced close="}" open="{"><mtable align="center"><mtr><mtd><mi>terç</mi><mo>,</mo><mi>quart</mi><mo>,</mo><mi>cinquè</mi></mtd></mtr></mtable></mfenced></mfenced></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><apply><csymbol definitionURL="http://www.wiris.com/XML/csymbol">if</csymbol><mrow><mi>a</mi><mo>=</mo><mi>doble</mi></mrow><apply><csymbol definitionURL="http://www.wiris.com/XML/csymbol">if</csymbol><mrow><mi>b</mi><mo>=</mo><mi>terç</mi></mrow><mtable><mtr><mtd><mi>sol1</mi><mo>=</mo><mn>2</mn><mi>x</mi><mo>-</mo><mfrac><mi>x</mi><mn>3</mn></mfrac><mo>=</mo><mi>c</mi></mtd></mtr><mtr><mtd><mi>R</mi><mo>=</mo><mi>resol</mi><mfenced><mi>sol1</mi></mfenced></mtd></mtr><mtr><mtd><mi>sol2</mi><mo>=</mo><msub><mi>R</mi><mrow><mn>1</mn><mo>,</mo><mn>1</mn></mrow></msub></mtd></mtr><mtr><mtd><mi>a1</mi><mo>=</mo><mn>2</mn></mtd></mtr><mtr><mtd><mi>b1</mi><mo>=</mo><mn>3</mn></mtd></mtr></mtable><apply><csymbol definitionURL="http://www.wiris.com/XML/csymbol">if</csymbol><mrow><mi>b</mi><mo>=</mo><mi>quart</mi></mrow><mtable><mtr><mtd><mi>sol1</mi><mo>=</mo><mn>2</mn><mi>x</mi><mo>-</mo><mfrac><mi>x</mi><mn>4</mn></mfrac><mo>=</mo><mi>c</mi></mtd></mtr><mtr><mtd><mi>R</mi><mo>=</mo><mi>resol</mi><mfenced><mi>sol1</mi></mfenced></mtd></mtr><mtr><mtd><mi>sol2</mi><mo>=</mo><msub><mi>R</mi><mrow><mn>1</mn><mo>,</mo><mn>1</mn></mrow></msub></mtd></mtr><mtr><mtd><mi>a1</mi><mo>=</mo><mn>2</mn></mtd></mtr><mtr><mtd><mi>b1</mi><mo>=</mo><mn>4</mn></mtd></mtr></mtable><mtable><mtr><mtd><mi>sol1</mi><mo>=</mo><mn>2</mn><mi>x</mi><mo>-</mo><mfrac><mi>x</mi><mn>5</mn></mfrac><mo>=</mo><mi>c</mi></mtd></mtr><mtr><mtd><mi>R</mi><mo>=</mo><mi>resol</mi><mfenced><mi>sol1</mi></mfenced></mtd></mtr><mtr><mtd><mi>sol2</mi><mo>=</mo><msub><mi>R</mi><mrow><mn>1</mn><mo>,</mo><mn>1</mn></mrow></msub></mtd></mtr><mtr><mtd><mi>a1</mi><mo>=</mo><mn>2</mn></mtd></mtr><mtr><mtd><mi>b1</mi><mo>=</mo><mn>5</mn></mtd></mtr></mtable></apply></apply><apply><csymbol definitionURL="http://www.wiris.com/XML/csymbol">if</csymbol><mrow><mi>a</mi><mo>=</mo><mi>triple</mi></mrow><apply><csymbol definitionURL="http://www.wiris.com/XML/csymbol">if</csymbol><mrow><mi>b</mi><mo>=</mo><mi>terç</mi></mrow><mtable><mtr><mtd><mi>sol1</mi><mo>=</mo><mn>3</mn><mi>x</mi><mo>-</mo><mfrac><mi>x</mi><mn>3</mn></mfrac><mo>=</mo><mi>c</mi></mtd></mtr><mtr><mtd><mi>R</mi><mo>=</mo><mi>resol</mi><mfenced><mi>sol1</mi></mfenced></mtd></mtr><mtr><mtd><mi>sol2</mi><mo>=</mo><msub><mi>R</mi><mrow><mn>1</mn><mo>,</mo><mn>1</mn></mrow></msub></mtd></mtr><mtr><mtd><mi>a1</mi><mo>=</mo><mn>3</mn></mtd></mtr><mtr><mtd><mi>b1</mi><mo>=</mo><mn>3</mn></mtd></mtr></mtable><apply><csymbol definitionURL="http://www.wiris.com/XML/csymbol">if</csymbol><mrow><mi>b</mi><mo>=</mo><mi>quart</mi></mrow><mtable><mtr><mtd><mi>sol1</mi><mo>=</mo><mn>3</mn><mi>x</mi><mo>-</mo><mfrac><mi>x</mi><mn>4</mn></mfrac><mo>=</mo><mi>c</mi></mtd></mtr><mtr><mtd><mi>R</mi><mo>=</mo><mi>resol</mi><mfenced><mi>sol1</mi></mfenced></mtd></mtr><mtr><mtd><mi>sol2</mi><mo>=</mo><msub><mi>R</mi><mrow><mn>1</mn><mo>,</mo><mn>1</mn></mrow></msub></mtd></mtr><mtr><mtd><mi>a1</mi><mo>=</mo><mn>3</mn></mtd></mtr><mtr><mtd><mi>b1</mi><mo>=</mo><mn>4</mn></mtd></mtr></mtable><mtable><mtr><mtd><mi>sol1</mi><mo>=</mo><mn>3</mn><mi>x</mi><mo>-</mo><mfrac><mi>x</mi><mn>5</mn></mfrac><mo>=</mo><mi>c</mi></mtd></mtr><mtr><mtd><mi>R</mi><mo>=</mo><mi>resol</mi><mfenced><mi>sol1</mi></mfenced></mtd></mtr><mtr><mtd><mi>sol2</mi><mo>=</mo><msub><mi>R</mi><mrow><mn>1</mn><mo>,</mo><mn>1</mn></mrow></msub></mtd></mtr><mtr><mtd><mi>a1</mi><mo>=</mo><mn>3</mn></mtd></mtr><mtr><mtd><mi>b1</mi><mo>=</mo><mn>5</mn></mtd></mtr></mtable></apply></apply><apply><csymbol definitionURL="http://www.wiris.com/XML/csymbol">if</csymbol><mrow><mi>b</mi><mo>=</mo><mi>terç</mi></mrow><mtable><mtr><mtd><mi>sol1</mi><mo>=</mo><mn>4</mn><mi>x</mi><mo>-</mo><mfrac><mi>x</mi><mn>3</mn></mfrac><mo>=</mo><mi>c</mi></mtd></mtr><mtr><mtd><mi>R</mi><mo>=</mo><mi>resol</mi><mfenced><mi>sol1</mi></mfenced></mtd></mtr><mtr><mtd><mi>sol2</mi><mo>=</mo><msub><mi>R</mi><mrow><mn>1</mn><mo>,</mo><mn>1</mn></mrow></msub></mtd></mtr><mtr><mtd><mi>a1</mi><mo>=</mo><mn>4</mn></mtd></mtr><mtr><mtd><mi>b1</mi><mo>=</mo><mn>3</mn></mtd></mtr></mtable><apply><csymbol definitionURL="http://www.wiris.com/XML/csymbol">if</csymbol><mrow><mi>b</mi><mo>=</mo><mi>quart</mi></mrow><mtable><mtr><mtd><mi>sol1</mi><mo>=</mo><mn>4</mn><mi>x</mi><mo>-</mo><mfrac><mi>x</mi><mn>4</mn></mfrac><mo>=</mo><mi>c</mi></mtd></mtr><mtr><mtd><mi>R</mi><mo>=</mo><mi>resol</mi><mfenced><mi>sol1</mi></mfenced></mtd></mtr><mtr><mtd><mi>sol2</mi><mo>=</mo><msub><mi>R</mi><mrow><mn>1</mn><mo>,</mo><mn>1</mn></mrow></msub></mtd></mtr><mtr><mtd><mi>a1</mi><mo>=</mo><mn>4</mn></mtd></mtr><mtr><mtd><mi>b1</mi><mo>=</mo><mn>4</mn></mtd></mtr></mtable><mtable><mtr><mtd><mi>sol1</mi><mo>=</mo><mn>4</mn><mi>x</mi><mo>-</mo><mfrac><mi>x</mi><mn>5</mn></mfrac><mo>=</mo><mi>c</mi></mtd></mtr><mtr><mtd><mi>R</mi><mo>=</mo><mi>resol</mi><mfenced><mi>sol1</mi></mfenced></mtd></mtr><mtr><mtd><mi>sol2</mi><mo>=</mo><msub><mi>R</mi><mrow><mn>1</mn><mo>,</mo><mn>1</mn></mrow></msub></mtd></mtr><mtr><mtd><mi>a1</mi><mo>=</mo><mn>4</mn></mtd></mtr><mtr><mtd><mi>b1</mi><mo>=</mo><mn>5</mn></mtd></mtr></mtable></apply></apply></apply></apply></math></input></command></group></library><group><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>c</mi></math></input><output><math xmlns="http://www.w3.org/1998/Math/MathML"><mo>-</mo><mn>49</mn></math></output></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>a</mi><mo>,</mo><mi>a1</mi></math></input><output><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>quadruple</mi><mo>,</mo><mn>4</mn></math></output></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>b</mi><mo>,</mo><mi>b1</mi></math></input><output><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>quart</mi><mo>,</mo><mn>4</mn></math></output></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>sol1</mi></math></input><output><math xmlns="http://www.w3.org/1998/Math/MathML"><mfrac><mn>15</mn><mn>4</mn></mfrac><mo>*</mo><mi>x</mi><mo>=</mo><mo>-</mo><mn>49</mn></math></output></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>R</mi></math></input><output><math xmlns="http://www.w3.org/1998/Math/MathML"><mfenced close="}" open="{"><mtable align="center"><mtr><mtd><mfenced close="}" open="{"><mtable align="center"><mtr><mtd><mi>x</mi><mo>=</mo><mo>-</mo><mfrac><mn>196</mn><mn>15</mn></mfrac></mtd></mtr></mtable></mfenced></mtd></mtr></mtable></mfenced></math></output></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>sol2</mi></math></input><output><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>x</mi><mo>=</mo><mo>-</mo><mfrac><mn>196</mn><mn>15</mn></mfrac></math></output></command></group><group><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"/></input></command></group></session>]]></wirisCasSession><correctAnswers><correctAnswer type="mathml"><![CDATA[<math xmlns="http://www.w3.org/1998/Math/MathML"><mi>a</mi><mo>)</mo><mo> </mo><mo>=</mo><mo>#</mo><mi>s</mi><mi>o</mi><mi>l</mi><mn>1</mn><mspace linebreak="newline"/><mi>b</mi><mo>)</mo><mo> </mo><mo>=</mo><mo>#</mo><mi>s</mi><mi>o</mi><mi>l</mi><mn>2</mn></math>]]></correctAnswer></correctAnswers><assertions><assertion name="syntax_expression"/><assertion name="equivalent_equations"/></assertions><options><option name="tolerance">10^(-4)</option><option name="relative_tolerance">false</option><option name="precision">4</option><option name="implicit_times_operator">false</option><option name="times_operator">·</option><option name="imaginary_unit">i</option></options><localData><data name="inputField">popupEditor</data><data name="gradeCompound">and</data><data name="gradeCompoundDistribution"></data><data name="casSession"/><data name="inputCompound">true</data></localData></question> Ja que és el #a i el #b, la resta és «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mstyle mathsize=¨12px¨»«mo mathvariant=¨bold¨ mathcolor=¨#00007F¨»#«/mo»«mi mathvariant=¨bold¨ mathcolor=¨#00007F¨»a«/mi»«mn mathvariant=¨bold¨ mathcolor=¨#00007F¨»1«/mn»«mo mathvariant=¨bold¨ mathcolor=¨#00007F¨»§#160;«/mo»«mi mathvariant=¨bold¨ mathcolor=¨#00007F¨»x«/mi»«mo mathvariant=¨bold¨ mathcolor=¨#00007F¨»§#160;«/mo»«mo mathvariant=¨bold¨ mathcolor=¨#00007F¨»-«/mo»«mo mathvariant=¨bold¨ mathcolor=¨#00007F¨»§#160;«/mo»«mfrac mathcolor=¨#00007F¨»«mi mathvariant=¨bold¨»x«/mi»«mrow»«mo mathvariant=¨bold¨»#«/mo»«mi mathvariant=¨bold¨»b«/mi»«mn mathvariant=¨bold¨»1«/mn»«/mrow»«/mfrac»«/mstyle»«/math»

]]> 4.04.1.6.15Q Nombres Parèntesis

Dos nombres sumen #c.

Si al triple del primer li resto el doble del segon em dona el mateix que si al doble del primer li sumo el triple del segon.

Quins són els dos nombres?

Format {9/20,21/20}

]]> 1.0000000 0.3333333 0 0 #sol <question><wirisCasSession><![CDATA[<session lang="ca" version="2.0"><library closed="false"><mtext style="color:#ffc800" xml:lang="ca">variables</mtext><group><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>c</mi><mo>=</mo><mi>aleatori</mi><mo>(</mo><mn>10</mn><mo>,</mo><mn>90</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>R</mi><mo>=</mo><mi>resol</mi><mfenced><mrow><mn>3</mn><mi>x</mi><mo>-</mo><mn>2</mn><mo>*</mo><mo>(</mo><mi>c</mi><mo>-</mo><mi>x</mi><mo>)</mo><mo>=</mo><mn>2</mn><mi>x</mi><mo>+</mo><mn>3</mn><mo>*</mo><mfenced><mrow><mi>c</mi><mo>-</mo><mi>x</mi></mrow></mfenced></mrow></mfenced></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>e1</mi><mo>=</mo><mn>3</mn><mi>x</mi><mo>-</mo><mn>2</mn><mo>*</mo><mo>(</mo><mi>c</mi><mo>-</mo><mi>x</mi><mo>)</mo><mo>=</mo><mn>2</mn><mi>x</mi><mo>+</mo><mn>3</mn><mo>*</mo><mfenced><mrow><mi>c</mi><mo>-</mo><mi>x</mi></mrow></mfenced></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>x1</mi><mo>=</mo><msub><mi>R</mi><mrow><mn>1</mn><mo>,</mo><mn>1</mn><mo>,</mo><mn>2</mn></mrow></msub></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>y1</mi><mo>=</mo><mi>c</mi><mo>-</mo><mi>x1</mi></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>sol</mi><mo>=</mo><mfenced close="}" open="{"><mtable align="center"><mtr><mtd><mi>x1</mi><mo>,</mo><mi>y1</mi></mtd></mtr></mtable></mfenced></math></input></command></group></library><group><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>c</mi></math></input><output><math xmlns="http://www.w3.org/1998/Math/MathML"><mn>55</mn></math></output></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>R</mi></math></input><output><math xmlns="http://www.w3.org/1998/Math/MathML"><mfenced close="}" open="{"><mtable align="center"><mtr><mtd><mfenced close="}" open="{"><mtable align="center"><mtr><mtd><mi>x</mi><mo>=</mo><mfrac><mn>275</mn><mn>6</mn></mfrac></mtd></mtr></mtable></mfenced></mtd></mtr></mtable></mfenced></math></output></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>sol</mi></math></input><output><math xmlns="http://www.w3.org/1998/Math/MathML"><mfenced close="}" open="{"><mtable align="center"><mtr><mtd><mfrac><mn>275</mn><mn>6</mn></mfrac><mo>,</mo><mfrac><mn>55</mn><mn>6</mn></mfrac></mtd></mtr></mtable></mfenced></math></output></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>e1</mi></math></input><output><math xmlns="http://www.w3.org/1998/Math/MathML"><mn>5</mn><mo>*</mo><mi>x</mi><mo>-</mo><mn>110</mn><mo>=</mo><mo>-</mo><mi>x</mi><mo>+</mo><mn>165</mn></math></output></command></group><group><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"/></input></command></group></session>]]></wirisCasSession><correctAnswers><correctAnswer>#sol</correctAnswer></correctAnswers><assertions><assertion name="syntax_expression"/><assertion name="equivalent_symbolic"/></assertions><options><option name="tolerance">10^(-4)</option><option name="relative_tolerance">false</option><option name="precision">4</option><option name="implicit_times_operator">false</option><option name="times_operator">·</option><option name="imaginary_unit">i</option></options><localData><data name="inputField">popupEditor</data><data name="gradeCompound">and</data><data name="gradeCompoundDistribution"></data><data name="casSession"/></localData></question> Com que els nombres sumen #c, si un nombre és x, l'altre és «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mstyle mathsize=¨12px¨»«mrow»«mo mathvariant=¨bold¨ mathcolor=¨#003300¨»#«/mo»«mi mathvariant=¨bold¨ mathcolor=¨#003300¨»c«/mi»«mo mathvariant=¨bold¨ mathcolor=¨#003300¨»-«/mo»«mi mathvariant=¨bold¨ mathcolor=¨#003300¨»x«/mi»«/mrow»«/mstyle»«/math»

]]> L'equació es pot escriure:

«math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mstyle mathsize=¨12px¨»«mrow»«mn mathvariant=¨bold¨ mathcolor=¨#003300¨»3«/mn»«mi mathvariant=¨bold¨ mathcolor=¨#003300¨»x«/mi»«mo mathvariant=¨bold¨ mathcolor=¨#003300¨»§#160;«/mo»«mo mathvariant=¨bold¨ mathcolor=¨#003300¨»-«/mo»«mo mathvariant=¨bold¨ mathcolor=¨#003300¨»§#160;«/mo»«mn mathvariant=¨bold¨ mathcolor=¨#003300¨»2«/mn»«mfenced mathcolor=¨#003300¨»«mrow»«mo mathvariant=¨bold¨»#«/mo»«mi mathvariant=¨bold¨»c«/mi»«mo mathvariant=¨bold¨»-«/mo»«mi mathvariant=¨bold¨»x«/mi»«/mrow»«/mfenced»«mo mathvariant=¨bold¨ mathcolor=¨#003300¨»=«/mo»«mn mathvariant=¨bold¨ mathcolor=¨#003300¨»2«/mn»«mi mathvariant=¨bold¨ mathcolor=¨#003300¨»x«/mi»«mo mathvariant=¨bold¨ mathcolor=¨#003300¨»+«/mo»«mn mathvariant=¨bold¨ mathcolor=¨#003300¨»3«/mn»«mfenced mathcolor=¨#003300¨»«mrow»«mo mathvariant=¨bold¨»#«/mo»«mi mathvariant=¨bold¨»c«/mi»«mo mathvariant=¨bold¨»-«/mo»«mi mathvariant=¨bold¨»x«/mi»«/mrow»«/mfenced»«/mrow»«/mstyle»«/math»

]]> 4.04.1.6.21Q Edats

Si l'Ibrahim tingués #a anys més que la Judith, tindria #b anys.

Escriu l'equació ax+b=c que correspon al problema

Quants anys té la Judith?

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 1.0000000 0.5000000 0 0 Equació=#cAnys= #d]]> <question><wirisCasSession><![CDATA[<session lang="ca" version="2.0"><library closed="false"><mtext style="color:#ffc800" xml:lang="ca">variables</mtext><group><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>a</mi><mo>=</mo><mi>aleatori</mi><mo>(</mo><mn>4</mn><mo>,</mo><mn>9</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>d</mi><mo>=</mo><mi>aleatori</mi><mo>(</mo><mn>12</mn><mo>,</mo><mn>25</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>b</mi><mo>=</mo><mi>a</mi><mo>+</mo><mi>d</mi></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>c</mi><mo>=</mo><mi>x</mi><mo>+</mo><mi>a</mi><mo>=</mo><mi>b</mi></math></input></command></group></library><group><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>a</mi></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>b</mi></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>s1</mi></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>e1</mi></math></input></command></group></session>]]></wirisCasSession><correctAnswers><correctAnswer type="mathml"><![CDATA[<math xmlns="http://www.w3.org/1998/Math/MathML"><mi>E</mi><mi>q</mi><mi>u</mi><mi>a</mi><mi>c</mi><mi mathvariant="normal">i</mi><mi>ó</mi><mo>=</mo><mo>#</mo><mi>c</mi><mspace linebreak="newline"/><mi>A</mi><mi>n</mi><mi>y</mi><mi>s</mi><mo>=</mo><mo> </mo><mo>#</mo><mi mathvariant="normal">d</mi></math>]]></correctAnswer></correctAnswers><assertions><assertion name="syntax_expression"/><assertion name="equivalent_symbolic"/></assertions><options><option name="tolerance">10^(-4)</option><option name="relative_tolerance">false</option><option name="precision">4</option><option name="implicit_times_operator">false</option><option name="times_operator">·</option><option name="imaginary_unit">i</option></options><localData><data name="inputField">popupEditor</data><data name="gradeCompound">and</data><data name="gradeCompoundDistribution"></data><data name="casSession"/><data name="inputCompound">true</data></localData></question>

x és l'edat de la Judith. Si l'Ibrahim en tingués #a de més, l'Ibrahim tindria x+#a anys, i haurien de ser iguals a #b anys.

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 4.04.1.6.22Q Edats (Pare doble filla)

Un pare té #a anys més que la seva filla de 4 anys.

D' aquí a quants anys l'edat del pare serà el doble de l'edat de la filla?

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 1.0000000 0.3333333 0 0 = #sol]]> <question><wirisCasSession><![CDATA[<session lang="ca" version="2.0"><library closed="false"><mtext style="color:#ffc800" xml:lang="ca">variables</mtext><group><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>a</mi><mo>=</mo><mi>aleatori</mi><mo>(</mo><mn>18</mn><mo>,</mo><mn>25</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>p1</mi><mo>=</mo><mn>4</mn><mo>+</mo><mi>a</mi></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>f1</mi><mo>=</mo><mn>4</mn></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>sol</mi><mo>=</mo><mn>4</mn><mo>-</mo><mn>8</mn><mo>+</mo><mi>a</mi></math></input></command></group></library><group><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>a</mi></math></input><output><math xmlns="http://www.w3.org/1998/Math/MathML"><mn>21</mn></math></output></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>p1</mi></math></input><output><math xmlns="http://www.w3.org/1998/Math/MathML"><mn>25</mn></math></output></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>f1</mi></math></input><output><math xmlns="http://www.w3.org/1998/Math/MathML"><mn>4</mn></math></output></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>sol</mi></math></input><output><math xmlns="http://www.w3.org/1998/Math/MathML"><mn>17</mn></math></output></command></group><group><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"/></input></command></group></session>]]></wirisCasSession><correctAnswers><correctAnswer type="mathml"><![CDATA[<math xmlns="http://www.w3.org/1998/Math/MathML"><mo>=</mo><mo> </mo><mo>#</mo><mi>s</mi><mi>o</mi><mi>l</mi></math>]]></correctAnswer></correctAnswers><assertions><assertion name="syntax_expression"/><assertion name="equivalent_symbolic"/></assertions><options><option name="tolerance">10^(-4)</option><option name="relative_tolerance">false</option><option name="precision">4</option><option name="implicit_times_operator">false</option><option name="times_operator">·</option><option name="imaginary_unit">i</option></options><localData><data name="inputField">textField</data><data name="gradeCompound">and</data><data name="gradeCompoundDistribution"></data><data name="casSession"/></localData></question>

Ara la filla té 4 anys i el pare «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mstyle mathsize=¨12px¨»«mrow»«mo mathvariant=¨bold¨ mathcolor=¨#003300¨»#«/mo»«mi mathvariant=¨bold¨ mathcolor=¨#003300¨»p«/mi»«mn mathvariant=¨bold¨ mathcolor=¨#003300¨»1«/mn»«/mrow»«/mstyle»«/math»

D'aquí als x anys que han de passar fins que l'edat del pare sigui el doble de la de la filla:

l'edat del pare serà «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mstyle mathsize=¨12px¨»«mrow»«mo mathvariant=¨bold¨ mathcolor=¨#003300¨»#«/mo»«mi mathvariant=¨bold¨ mathcolor=¨#003300¨»p«/mi»«mn mathvariant=¨bold¨ mathcolor=¨#003300¨»1«/mn»«mo mathvariant=¨bold¨ mathcolor=¨#003300¨»§#160;«/mo»«mo mathvariant=¨bold¨ mathcolor=¨#003300¨»+«/mo»«mo mathvariant=¨bold¨ mathcolor=¨#003300¨»§#160;«/mo»«mi mathvariant=¨bold¨ mathcolor=¨#003300¨»x«/mi»«/mrow»«/mstyle»«/math»
l'edat de la filla serà «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mstyle mathsize=¨12px¨»«mrow»«mn mathvariant=¨bold¨ mathcolor=¨#003300¨»4«/mn»«mo mathvariant=¨bold¨ mathcolor=¨#003300¨»§#160;«/mo»«mo mathvariant=¨bold¨ mathcolor=¨#003300¨»+«/mo»«mo mathvariant=¨bold¨ mathcolor=¨#003300¨»§#160;«/mo»«mi mathvariant=¨bold¨ mathcolor=¨#003300¨»x«/mi»«/mrow»«/mstyle»«/math»

Com que la del pare és el doble, es pot escriure l'equació

]]> 4.04.1.6.31Q Compres (llibre i pantalons)

La Sara es compra un llibre.

La seva germana es gasta el #m i #b € més per comprar-se uns pantalons.

Quant valia el llibre si la germana ha gastat #c €?

a) Escriu l'equació ax+b=c que correspon al problema

b) Quants euros valia el llibre?

]]> 1.0000000 0.5000000 0 0 Equació=#e1Preu (€)=#s1]]> <question><wirisCasSession><![CDATA[<session lang="ca" version="2.0"><library closed="false"><mtext style="color:#ffc800" xml:lang="ca">variables</mtext><group><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>b</mi><mo>=</mo><mi>aleatori</mi><mo>(</mo><mn>4</mn><mo>,</mo><mn>15</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>s1</mi><mo>=</mo><mi>aleatori</mi><mo>(</mo><mn>8</mn><mo>,</mo><mn>15</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>m</mi><mo>=</mo><mi>aleatori</mi><mfenced><mfenced close="}" open="{"><mtable align="center"><mtr><mtd><mi>doble</mi><mo>,</mo><mi>triple</mi><mo>,</mo><mi>quadruple</mi></mtd></mtr></mtable></mfenced></mfenced></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><apply><csymbol definitionURL="http://www.wiris.com/XML/csymbol">if</csymbol><mrow><mi>m</mi><mo>=</mo><mi>doble</mi></mrow><mrow><mi>a</mi><mo>=</mo><mn>2</mn></mrow><apply><csymbol definitionURL="http://www.wiris.com/XML/csymbol">if</csymbol><mrow><mi>m</mi><mo>=</mo><mi>triple</mi></mrow><mrow><mi>a</mi><mo>=</mo><mn>3</mn></mrow><mrow><mi>a</mi><mo>=</mo><mn>4</mn></mrow></apply></apply></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"/></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>c</mi><mo>=</mo><mi>a</mi><mo>*</mo><mi>s1</mi><mo>+</mo><mi>b</mi></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>e1</mi><mo>=</mo><mi>a</mi><mo>*</mo><mi>x</mi><mo>+</mo><mi>b</mi><mo>=</mo><mi>c</mi></math></input></command></group></library></session>]]></wirisCasSession><correctAnswers><correctAnswer type="mathml"><![CDATA[<math xmlns="http://www.w3.org/1998/Math/MathML"><mi>E</mi><mi>q</mi><mi>u</mi><mi>a</mi><mi>c</mi><mi mathvariant="normal">i</mi><mi>ó</mi><mo>=</mo><mo>#</mo><mi mathvariant="normal">e</mi><mn>1</mn><mspace linebreak="newline"/><mi>P</mi><mi>r</mi><mi mathvariant="normal">e</mi><mi>u</mi><mo> </mo><mo>(</mo><mo>€</mo><mo>)</mo><mo>=</mo><mo>#</mo><mi>s</mi><mn>1</mn></math>]]></correctAnswer></correctAnswers><assertions><assertion name="syntax_expression"/><assertion name="equivalent_symbolic"/></assertions><options><option name="tolerance">10^(-4)</option><option name="relative_tolerance">false</option><option name="precision">4</option><option name="implicit_times_operator">false</option><option name="times_operator">·</option><option name="imaginary_unit">i</option></options><localData><data name="inputField">popupEditor</data><data name="inputCompound">true</data><data name="gradeCompound">and</data><data name="gradeCompoundDistribution"></data><data name="casSession"/></localData></question>

x és el preu del llibre.

Si la germana es gasta el #m del seu preu, es gasta #a·x, i a més, es gasta #b euros.

La suma de les despeses ha de ser igual a #c €.

Tinc una certa quantitat de diners dins la cartera.

En gasto la meitat.

Un amic em torna #a euros que em devia i després compro un llibre per #l euros.

Ara tinc #f euros.

Quants euros tenia al principi?

]]> 1.0000000 0.5000000 0 0 #sol <question><wirisCasSession><![CDATA[<session lang="ca" version="2.0"><library closed="false"><mtext style="color:#ffc800" xml:lang="ca">variables</mtext><group><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><apply><csymbol definitionURL="http://www.wiris.com/XML/csymbol">repeat</csymbol><mtable><mtr><mtd><mi>l</mi><mo>=</mo><mi>aleatori</mi><mo>(</mo><mn>11</mn><mo>,</mo><mn>45</mn><mo>)</mo></mtd></mtr><mtr><mtd><mi>a</mi><mo>=</mo><mi>aleatori</mi><mo>(</mo><mn>50</mn><mo>,</mo><mn>100</mn><mo>)</mo></mtd></mtr><mtr><mtd><mi>f</mi><mo>=</mo><mi>aleatori</mi><mo>(</mo><mn>20</mn><mo>,</mo><mn>50</mn><mo>)</mo></mtd></mtr><mtr><mtd/></mtr></mtable><mrow><mi>f</mi><mo>+</mo><mi>l</mi><mo>></mo><mi>a</mi></mrow></apply></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>sol</mi><mo>=</mo><mn>2</mn><mo>*</mo><mo>(</mo><mi>f</mi><mo>+</mo><mi>l</mi><mo>-</mo><mi>a</mi><mo>)</mo></math></input></command></group></library><group><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>l</mi></math></input><output><math xmlns="http://www.w3.org/1998/Math/MathML"><mn>23</mn></math></output></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>a</mi></math></input><output><math xmlns="http://www.w3.org/1998/Math/MathML"><mn>71</mn></math></output></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>f</mi></math></input><output><math xmlns="http://www.w3.org/1998/Math/MathML"><mn>50</mn></math></output></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>sol</mi></math></input><output><math xmlns="http://www.w3.org/1998/Math/MathML"><mn>4</mn></math></output></command></group><group><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"/></input></command></group></session>]]></wirisCasSession><correctAnswers><correctAnswer>#sol</correctAnswer></correctAnswers><assertions><assertion name="syntax_expression"/><assertion name="equivalent_symbolic"/></assertions><options><option name="tolerance">10^(-4)</option><option name="relative_tolerance">false</option><option name="precision">4</option><option name="implicit_times_operator">false</option><option name="times_operator">·</option><option name="imaginary_unit">i</option></options><localData><data name="inputField">inlineEditor</data><data name="gradeCompound">and</data><data name="gradeCompoundDistribution"></data><data name="casSession"/></localData></question> Si fem la traducció de l'enunciat i x eren els diners que tenia:

«math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mstyle mathsize=¨12px¨»«mi mathvariant=¨bold¨ mathcolor=¨#003300¨»x«/mi»«mo mathvariant=¨bold¨ mathcolor=¨#003300¨»-«/mo»«mfrac mathcolor=¨#003300¨»«mi mathvariant=¨bold¨»x«/mi»«mn mathvariant=¨bold¨»2«/mn»«/mfrac»«mo mathvariant=¨bold¨ mathcolor=¨#003300¨»+«/mo»«mo mathvariant=¨bold¨ mathcolor=¨#003300¨»#«/mo»«mi mathvariant=¨bold¨ mathcolor=¨#003300¨»a«/mi»«mo mathvariant=¨bold¨ mathcolor=¨#003300¨»§#160;«/mo»«mo mathvariant=¨bold¨ mathcolor=¨#003300¨»-«/mo»«mo mathvariant=¨bold¨ mathcolor=¨#003300¨»#«/mo»«mi mathvariant=¨bold¨ mathcolor=¨#003300¨»l«/mi»«mo mathvariant=¨bold¨ mathcolor=¨#003300¨»§#160;«/mo»«mo mathvariant=¨bold¨ mathcolor=¨#003300¨»=«/mo»«mo mathvariant=¨bold¨ mathcolor=¨#003300¨»§#8201;«/mo»«mo mathvariant=¨bold¨ mathcolor=¨#003300¨»#«/mo»«mi mathvariant=¨bold¨ mathcolor=¨#003300¨»f«/mi»«/mstyle»«/math»

]]> 4.04.1.6.33Q Compres (bat. Rebaixes)

El 15 de juny, varem veure un bat de beisbol i un guant que valien el mateix preu.

L'1 de juliol, han rebaixat el bat un #b1 % i el guant un #g1 % i els venen junts per #s euros.

Quin preu tenia el bat el 15 de juliol?

Si x era el preu del bat, el guant també valia x..

Amb les rebaixes, el bat i el guant valen:

«math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mstyle mathsize=¨12px¨»«mrow»«mfrac mathcolor=¨#003300¨»«mrow»«mo mathvariant=¨bold¨»#«/mo»«mi mathvariant=¨bold¨»b«/mi»«mn mathvariant=¨bold¨»2«/mn»«/mrow»«mn mathvariant=¨bold¨»100«/mn»«/mfrac»«mo mathvariant=¨bold¨ mathcolor=¨#003300¨»§#183;«/mo»«mi mathvariant=¨bold¨ mathcolor=¨#003300¨»x«/mi»«mo mathvariant=¨bold¨ mathcolor=¨#003300¨»§#160;«/mo»«mo mathvariant=¨bold¨ mathcolor=¨#003300¨»+«/mo»«mfrac mathcolor=¨#003300¨»«mrow»«mo mathvariant=¨bold¨»#«/mo»«mi mathvariant=¨bold¨»g«/mi»«mn mathvariant=¨bold¨»2«/mn»«/mrow»«mn mathvariant=¨bold¨»100«/mn»«/mfrac»«mo mathvariant=¨bold¨ mathcolor=¨#003300¨»§#183;«/mo»«mi mathvariant=¨bold¨ mathcolor=¨#003300¨»x«/mi»«/mrow»«/mstyle»«/math»

]]> 4.04.1.6.35Q Comptes (repartiment)

Es reparteixen #s € entre 3 persones de manera que en Joan rep #a euros més que la Maria, i la Marta rep la suma del que han rebut en Joan i la Maria.

a) Quants euros ha rebut en Joan?

b) Quants euros ha rebut la Maria?

c) Quants euros ha rebut la Marta?

]]> 1.0000000 0.3333333 0 0 a) Joan=#sol1b) Maria =#sol2c) Marta =#sol3]]> <question><wirisCasSession><![CDATA[<session lang="ca" version="2.0"><library closed="false"><mtext style="color:#ffc800" xml:lang="ca">variables</mtext><group><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>a</mi><mo>=</mo><mi>aleatori</mi><mo>(</mo><mn>111</mn><mo>,</mo><mn>333</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>sol2</mi><mo>=</mo><mi>aleatori</mi><mo>(</mo><mn>555</mn><mo>,</mo><mn>999</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>sol1</mi><mo>=</mo><mi>sol2</mi><mo>+</mo><mi>a</mi></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>sol3</mi><mo>=</mo><mi>sol2</mi><mo>+</mo><mi>sol1</mi></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>s</mi><mo>=</mo><mi>sol1</mi><mo>+</mo><mi>sol2</mi><mo>+</mo><mi>sol3</mi></math></input></command></group></library></session>]]></wirisCasSession><correctAnswers><correctAnswer type="mathml"><![CDATA[<math xmlns="http://www.w3.org/1998/Math/MathML"><mi>a</mi><mo>)</mo><mo> </mo><mi>J</mi><mi>o</mi><mi>a</mi><mi>n</mi><mo>=</mo><mo>#</mo><mi>s</mi><mi>o</mi><mi>l</mi><mn>1</mn><mspace linebreak="newline"/><mi>b</mi><mo>)</mo><mo> </mo><mi>M</mi><mi>a</mi><mi>r</mi><mi mathvariant="normal">i</mi><mi>a</mi><mo> </mo><mo>=</mo><mo>#</mo><mi>s</mi><mi>o</mi><mi>l</mi><mn>2</mn><mspace linebreak="newline"/><mi>c</mi><mo>)</mo><mo> </mo><mi>M</mi><mi>a</mi><mi>r</mi><mi>t</mi><mi>a</mi><mo> </mo><mo>=</mo><mo>#</mo><mi>s</mi><mi>o</mi><mi>l</mi><mn>3</mn></math>]]></correctAnswer></correctAnswers><assertions><assertion name="syntax_expression"/><assertion name="equivalent_symbolic"/></assertions><options><option name="tolerance">10^(-4)</option><option name="relative_tolerance">false</option><option name="precision">4</option><option name="implicit_times_operator">false</option><option name="times_operator">·</option><option name="imaginary_unit">i</option></options><localData><data name="inputField">popupEditor</data><data name="gradeCompound">and</data><data name="gradeCompoundDistribution"></data><data name="casSession"/><data name="inputCompound">true</data></localData></question> Si la Maria rep x euros, en Joan en rep x + #a i la Marta x + x + #a.

L'equació s'escriu igualant la suma dels 3 a #s

]]> Entre els tres han rebut doncs: 4x + 2·#a

]]> 4.04.1.6.41Q Tradicions (calçots)

En una calçotada, la Berenguera ha menjat el #m1 de calçots que l'Arnau. L'Arnau ha menjat tants calçots com la Sibil·la i la Morlana juntes. La Sibil·la i la Morlana han menjat els mateixos calçots, i entre tots s'han cruspit #c calçots.

a) Escriu l'equació que correspon al problema

b) Quants calçots ha menjat la Morlana?

c) Quants calçots ha menjat la Berenguera?

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1.0000000 0.5000000 0 0 Equació=#sol1Morlana= #sol2Berenguera=#sol3]]> <question><wirisCasSession><![CDATA[<session lang="ca" version="2.0"><library closed="false"><mtext style="color:#ffc800" xml:lang="ca">variables</mtext><group><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>a1</mi><mo>=</mo><mi>aleatori</mi><mo>(</mo><mn>11</mn><mo>,</mo><mn>19</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>m1</mi><mo>=</mo><mi>aleatori</mi><mfenced><mfenced close="}" open="{"><mtable align="center"><mtr><mtd><mi>doble</mi><mo>,</mo><mo> </mo><mi>triple</mi><mo>,</mo><mo> </mo><mi>quadruple</mi></mtd></mtr></mtable></mfenced></mfenced></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><apply><csymbol 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mathvariant="normal">e</mi><mi>n</mi><mi>g</mi><mi>u</mi><mi mathvariant="normal">e</mi><mi>r</mi><mi>a</mi><mo>=</mo><mo>#</mo><mi>s</mi><mi>o</mi><mi>l</mi><mn>3</mn></math>]]></correctAnswer></correctAnswers><assertions><assertion name="syntax_expression"/><assertion name="equivalent_equations"/></assertions><options><option name="tolerance">10^(-4)</option><option name="relative_tolerance">false</option><option name="precision">4</option><option name="implicit_times_operator">false</option><option name="times_operator">·</option><option name="imaginary_unit">i</option></options><localData><data name="inputField">popupEditor</data><data name="gradeCompound">and</data><data name="gradeCompoundDistribution"></data><data name="casSession"/><data name="inputCompound">true</data></localData></question>

La Morlana en menja x, i la Sibil·la també. Per tant l'Arnau en menja 4x i la Berenguera #k·x.

La colla de castellers de Vilafranca té el triple de castellers que els Minyons de l'Arboç.

En una actuació a la Bisbal, #a1 castellers de Vilafranca van a ajudar els Minyons, de manera que en aquell moment, les dues colles tenen el mateix nombre de castellers.

a) Quants castellers té la colla de Vilafranca?

b) Quants castellers tenen els Minyons?

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 1.0000000 0.3333333 0 0 a) Castellers=#sol1b) Minyons= #sol2]]> <question><wirisCasSession><![CDATA[<session lang="ca" version="2.0"><library closed="false"><mtext style="color:#ffc800" xml:lang="ca">variables</mtext><group><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>a1</mi><mo>=</mo><mi>aleatori</mi><mo>(</mo><mn>110</mn><mo>,</mo><mn>150</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>R</mi><mo>=</mo><mi>resol</mi><mfenced><mrow><mn>3</mn><mi>x</mi><mo>-</mo><mi>a1</mi><mo>=</mo><mi>x</mi><mo>+</mo><mi>a1</mi></mrow></mfenced></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>sol2</mi><mo>=</mo><msub><mi>R</mi><mrow><mn>1</mn><mo>,</mo><mn>1</mn><mo>,</mo><mn>2</mn></mrow></msub></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>sol1</mi><mo>=</mo><mn>3</mn><mo>*</mo><mi>sol2</mi></math></input></command></group></library><group><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>a1</mi></math></input><output><math xmlns="http://www.w3.org/1998/Math/MathML"><mn>124</mn></math></output></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>R</mi></math></input><output><math xmlns="http://www.w3.org/1998/Math/MathML"><mfenced close="}" open="{"><mtable align="center"><mtr><mtd><mfenced close="}" open="{"><mtable align="center"><mtr><mtd><mi>x</mi><mo>=</mo><mn>124</mn></mtd></mtr></mtable></mfenced></mtd></mtr></mtable></mfenced></math></output></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>sol1</mi></math></input><output><math xmlns="http://www.w3.org/1998/Math/MathML"><mn>372</mn></math></output></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>sol2</mi></math></input><output><math xmlns="http://www.w3.org/1998/Math/MathML"><mn>124</mn></math></output></command></group><group><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"/></input></command></group></session>]]></wirisCasSession><correctAnswers><correctAnswer type="mathml"><![CDATA[<math xmlns="http://www.w3.org/1998/Math/MathML"><mi>a</mi><mo>)</mo><mo> </mo><mi>C</mi><mi>a</mi><mi>s</mi><mi>t</mi><mi mathvariant="normal">e</mi><mi>l</mi><mi>l</mi><mi mathvariant="normal">e</mi><mi>r</mi><mi>s</mi><mo>=</mo><mo>#</mo><mi>s</mi><mi>o</mi><mi>l</mi><mn>1</mn><mspace linebreak="newline"/><mi>b</mi><mo>)</mo><mo> </mo><mi>M</mi><mi mathvariant="normal">i</mi><mi>n</mi><mi>y</mi><mi>o</mi><mi>n</mi><mi>s</mi><mo>=</mo><mo> </mo><mo>#</mo><mi>s</mi><mi>o</mi><mi>l</mi><mn>2</mn><mspace linebreak="newline"/></math>]]></correctAnswer></correctAnswers><assertions><assertion name="syntax_expression"/><assertion name="equivalent_equations"/></assertions><options><option name="tolerance">10^(-4)</option><option name="relative_tolerance">false</option><option name="precision">4</option><option name="implicit_times_operator">false</option><option name="times_operator">·</option><option name="imaginary_unit">i</option></options><localData><data name="inputField">popupEditor</data><data name="gradeCompound">and</data><data name="gradeCompoundDistribution"></data><data name="casSession"/><data name="inputCompound">true</data></localData></question>

Si els Minyons són x, i els castellers són 3x, en el moment en què s'ajuden

els Minyons són x + #a1
els castellers són 3x - #a1

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