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Výpočet určitého integrálu
Urči hodnoty určitého integrálu:
\large{\displaystyle\int\limits_2^3\Large\frac{2}{x}{d}x}
\large 2 \ln{3}-2 \ln{2} = \ln{3^2}-\ln{2^2} = \ln{\left( \Large \frac{10}{4}\large \right) }
\large 2 \ln{3}-2 \ln{2} = \ln{3^2}-\ln{2^2} = \ln{\left( \Large \frac{8}{4}\large \right) }
\large 2 \ln{3}-2 \ln{2} = \ln{3^2}-\ln{2^2} = \ln{\left( \Large \frac{9}{5}\large \right) }
\large 2 \ln{3}-2 \ln{2} = \ln{3^2}-\ln{2^2} = \ln{\left( \Large \frac{9}{4}\large \right) }