S:E21.313: Difference between revisions

Latest revision as of 13:31, 11 December 2023

S:E21.313 (Cristina Vijdeluc & Mihai Vijdeluc)

Rezolvați în mulțimea numerelor reale ecuația

{\frac {x-5}{1013}}+{\frac {x-7}{1014}}+{\frac {x-9}{1015}}={\frac {x+2009}{6}}+{\frac {x+2005}{8}}+{\frac {x+2001}{10}}.

Soluție.

Avem

${\frac {x-5}{1013}}={\frac {x+2021-2021-5}{1013}}={\frac {x+2021}{1013}}-{\frac {2026}{1013}}={\frac {x+2021}{1013}}-2$

${\frac {x-7}{1014}}={\frac {x+2021-2021-7}{1014}}={\frac {x+2021}{1014}}-{\frac {2028}{1014}}={\frac {x+2021}{1014}}-2$

${\frac {x-9}{1015}}={\frac {x+2021-2021-9}{1015}}={\frac {x+2021}{1015}}-{\frac {2030}{1015}}={\frac {x+2021}{1015}}-2$

Prin adunarea celor trei relații, membrul stâng al egalității devine

{\frac {x-5}{1013}}+{\frac {x-7}{1014}}+{\frac {x-9}{1015}}=\left(x+2021\right)\left({\frac {1}{1013}}+{\frac {1}{1014}}+{\frac {1}{1015}}\right)-6

Avem

${\frac {x+2009}{6}}={\frac {x+2021-2021+2009}{6}}={\frac {x+2021}{6}}-{\frac {12}{6}}={\frac {x+2021}{6}}-2$

${\frac {x+2005}{8}}={\frac {x+2021-2021+2005}{8}}={\frac {x+2021}{8}}-{\frac {16}{8}}={\frac {x+2021}{8}}-2$

${\frac {x+2001}{10}}={\frac {x+2021-2021+2001}{10}}={\frac {x+2021}{10}}-{\frac {20}{10}}={\frac {x+2021}{10}}-2$

Prin adunarea celor trei relații, membrul drept la egalității devine

{\frac {x+2009}{6}}+{\frac {x+2005}{8}}+{\frac {x+2001}{10}}=\left(x+2021\right)\left({\frac {1}{6}}+{\frac {1}{8}}+{\frac {1}{10}}\right)-6

Ecuația inițiale revine la

\left(x+2021\right)\left({\frac {1}{1003}}+{\frac {1}{1014}}+{\frac {1}{1015}}\right)-6=\left(x+2021\right)\left({\frac {1}{6}}+{\frac {1}{8}}+{\frac {1}{10}}\right)-6

Cum

{\frac {1}{1003}}+{\frac {1}{1014}}+{\frac {1}{1015}}\neq {\frac {1}{6}}+{\frac {1}{8}}+{\frac {1}{10}}

se obține

x+2021=0

, de unde se obține unica soluție a ecuației

x=-2021.

@@ Line 2: / Line 2: @@
 ''Rezolvați în mulțimea numerelor reale ecuația'' <math display="block">\frac{x-5}{1013} + \frac{x-7}{1014} + \frac{x-9}{1015} = \frac{x+2009}{6} + \frac{x+2005}{8} + \frac{x+2001}{10}.</math>'''Soluție.'''
+Avem
+<math>\frac{x-5}{1013} = \frac{x+2021-2021-5}{1013} = \frac{x+2021}{1013} - \frac{2026}{1013} = \frac{x+2021}{1013} -2 </math>
+<math>\frac{x-7}{1014} = \frac{x+2021-2021-7}{1014} = \frac{x+2021}{1014} - \frac{2028}{1014} = \frac{x+2021}{1014} -2 </math>
+<math>\frac{x-9}{1015} = \frac{x+2021-2021-9}{1015} = \frac{x+2021}{1015} - \frac{2030}{1015} = \frac{x+2021}{1015} -2 </math>
+Prin adunarea celor trei relații, membrul stâng al egalității devine<math display="block">\frac{x-5}{1013} + \frac{x-7}{1014} + \frac{x-9}{1015} = \left( x+2021 \right) \left( \frac{1}{1013} + \frac{1}{1014} + \frac{1}{1015} \right) - 6 </math>Avem
+<math>\frac{x+2009}{6} = \frac{x+2021-2021+2009}{6} = \frac{x+2021}{6} - \frac{12}{6} = \frac{x+2021}{6} -2 </math>
+<math>\frac{x+2005}{8} = \frac{x+2021-2021+2005}{8} = \frac{x+2021}{8} - \frac{16}{8} = \frac{x+2021}{8} -2 </math>
+<math>\frac{x+2001}{10} = \frac{x+2021-2021+2001}{10} = \frac{x+2021}{10} - \frac{20}{10} = \frac{x+2021}{10} -2 </math>
+Prin adunarea celor trei relații, membrul drept la egalității devine<math display="block">\frac{x+2009}{6}+\frac{x+2005}{8}+\frac{x+2001}{10}=\left( x+2021\right) \left(\frac{1}{6}+\frac{1}{8}+\frac{1}{10}\right) - 6 </math>
+Ecuația inițiale revine la <math display="block">\left(x+2021\right) \left( \frac{1}{1003}+\frac{1}{1014}+\frac{1}{1015} \right) - 6 = \left(x+2021\right) \left( \frac{1}{6}+\frac{1}{8}+\frac{1}{10} \right) - 6  </math>Cum <math> \frac{1}{1003}+\frac{1}{1014}+\frac{1}{1015}  \ne  \frac{1}{6} + \frac{1}{8} + \frac{1}{10}  </math> se obține <math>x+2021=0 </math>, de unde se obține unica soluție a ecuației <math display="block">x=-2021. </math>