1rBTX 07. PROBABILITAT/1.7.1 Recomptes
1.7.1.43Q PIndist Escriure nombres
Quants nombres diferents es poden escriure utilitzant #a uns, #b dosos
i #c tresos si s'utilitzen tots?
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
És una permutació amb elements indistingibles: Pna,b,c,
]]>
1.0000000
0.5000000
0
0
#r_71
<question><wirisCasSession><session lang="ca" 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"/></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>a</mi><mo>=</mo><mi>aleatori</mi><mo>(</mo><mn>2</mn><mo>,</mo><mn>4</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>b</mi><mo>=</mo><mi>aleatori</mi><mo>(</mo><mn>2</mn><mo>,</mo><mn>4</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>c</mi><mo>=</mo><mi>aleatori</mi><mo>(</mo><mn>2</mn><mo>,</mo><mn>4</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>n</mi><mo>=</mo><mi>a</mi><mo>+</mo><mi>b</mi><mo>+</mo><mi>c</mi></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>r_71</mi><mo>=</mo><apply><csymbol definitionURL="http://www.wiris.com/XML/csymbol">PR</csymbol><mi>n</mi><mrow><mi>a</mi><mo>,</mo><mi>b</mi><mo>,</mo><mi>c</mi></mrow></apply></math></input></command></group></library><group><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>n</mi></math></input><output><math xmlns="http://www.w3.org/1998/Math/MathML"><mn>10</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>4</mn></math></output></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>b</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>c</mi></math></input><output><math xmlns="http://www.w3.org/1998/Math/MathML"><mn>2</mn></math></output></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>r_71</mi></math></input><output><math xmlns="http://www.w3.org/1998/Math/MathML"><mn>3150</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">#r_71</correctAnswer></correctAnswers><localData><data name="inputField">textField</data></localData></question>