Proporciones, reglas de tres y fórmulas de interés Procentajes 1 ¿cuáles son los porcentajes, con aproximación a un decimal, de color verde y azul? Escribe la coma decimal como un punto para que te corrija bien.

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1.0000000 0.3333333 0 0 verde=#aazul=#b]]> <question><wirisCasSession><![CDATA[<session lang="es" version="2.0"><library closed="false"><mtext style="color:#ffc800" xml:lang="es">variables</mtext><group><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>a</mi><mo>=</mo><mn>33</mn><mo>.</mo><mn>3</mn></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>b</mi><mo>=</mo><mn>66</mn><mo>.</mo><mn>7</mn></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>33.3</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>v</mi><mi mathvariant="normal">e</mi><mi>r</mi><mi mathvariant="normal">d</mi><mi mathvariant="normal">e</mi><mo>=</mo><mo>#</mo><mi>a</mi><mspace linebreak="newline"/><mi>a</mi><mi>z</mi><mi>u</mi><mi>l</mi><mo>=</mo><mo>#</mo><mi>b</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="inputCompound">true</data><data name="gradeCompound">and</data><data name="gradeCompoundDistribution"></data><data name="casSession"/></localData></question>