Предмет: Математика,
автор: daisywheell
найти производные первого и второго порядка
Ответы
Автор ответа:
0
1)
![y=ln(x+ sqrt{48+ x^{2} } )
\
y'= frac{1}{x+ sqrt{48+ x^2}} cdot(x+ sqrt{48+ x^2})'=
\
=frac{1}{x+ sqrt{48+ x^2}} cdot(1+ frac{1}{2sqrt{48+ x^2}}cdot2x )=
frac{1}{x+ sqrt{48+ x^2}} cdot(1+ frac{x}{sqrt{48+ x^2}} )=
\
=frac{1}{x+sqrt{48+x^2}} cdotfrac{sqrt{48+x^2}+x}{sqrt{48+x^2}}=frac{1}{sqrt{48+ x^2}} =(x^2+48)^{- frac{1}{2} }
\
y''=- frac{1}{2} (x^2+48)^{-frac{1}{2} -1}cdot(x^2-48)'=
\
=-frac{1}{2}(x^2+48)^{- frac{3}{2}}cdot2x=-frac{x}{(x^2+48) sqrt{x^2+48}}](https://tex.z-dn.net/?f=y%3Dln%28x%2B+sqrt%7B48%2B+x%5E%7B2%7D+%7D+%29%0A%5C%0Ay%27%3D+frac%7B1%7D%7Bx%2B+sqrt%7B48%2B+x%5E2%7D%7D+cdot%28x%2B+sqrt%7B48%2B+x%5E2%7D%29%27%3D%0A+%5C%0A%3Dfrac%7B1%7D%7Bx%2B+sqrt%7B48%2B+x%5E2%7D%7D+cdot%281%2B++frac%7B1%7D%7B2sqrt%7B48%2B+x%5E2%7D%7Dcdot2x+%29%3D%0Afrac%7B1%7D%7Bx%2B+sqrt%7B48%2B+x%5E2%7D%7D+cdot%281%2B++frac%7Bx%7D%7Bsqrt%7B48%2B+x%5E2%7D%7D+%29%3D%0A%5C%0A%3Dfrac%7B1%7D%7Bx%2Bsqrt%7B48%2Bx%5E2%7D%7D+cdotfrac%7Bsqrt%7B48%2Bx%5E2%7D%2Bx%7D%7Bsqrt%7B48%2Bx%5E2%7D%7D%3Dfrac%7B1%7D%7Bsqrt%7B48%2B+x%5E2%7D%7D+%3D%28x%5E2%2B48%29%5E%7B-+frac%7B1%7D%7B2%7D+%7D%0A%5C%0Ay%27%27%3D-+frac%7B1%7D%7B2%7D+%28x%5E2%2B48%29%5E%7B-frac%7B1%7D%7B2%7D+-1%7Dcdot%28x%5E2-48%29%27%3D%0A%5C%0A%3D-frac%7B1%7D%7B2%7D%28x%5E2%2B48%29%5E%7B-+frac%7B3%7D%7B2%7D%7Dcdot2x%3D-frac%7Bx%7D%7B%28x%5E2%2B48%29+sqrt%7Bx%5E2%2B48%7D%7D+ "y=ln(x+ sqrt{48+ x^{2} } )
\
y'= frac{1}{x+ sqrt{48+ x^2}} cdot(x+ sqrt{48+ x^2})'=
\
=frac{1}{x+ sqrt{48+ x^2}} cdot(1+ frac{1}{2sqrt{48+ x^2}}cdot2x )=
frac{1}{x+ sqrt{48+ x^2}} cdot(1+ frac{x}{sqrt{48+ x^2}} )=
\
=frac{1}{x+sqrt{48+x^2}} cdotfrac{sqrt{48+x^2}+x}{sqrt{48+x^2}}=frac{1}{sqrt{48+ x^2}} =(x^2+48)^{- frac{1}{2} }
\
y''=- frac{1}{2} (x^2+48)^{-frac{1}{2} -1}cdot(x^2-48)'=
\
=-frac{1}{2}(x^2+48)^{- frac{3}{2}}cdot2x=-frac{x}{(x^2+48) sqrt{x^2+48}}")
2)
![y=cos x^{20}
\
y'=-sin x^{20}cdot(x^{20})'=
-sin x^{20}cdot20x^{19}=-20x^{19}sin x^{20}
\
y''=-20cdot((x^{19})'cdot sin x^{20}+x^{19}cdot (sin x^{20})')=
\
=-20cdot(19x^{18}cdot sin x^{20}+x^{19}cdot cos x^{20}cdot(x^{20})')=
\
=-20cdot(19x^{18} sin x^{20}+x^{19}cdot cos x^{20}cdot20x^{19})=
\
=-20cdot(19x^{18} sin x^{20}+20x^{38}cos x^{20})=
\
=-380x^{18} sin x^{20}-400x^{38}cos x^{20}](https://tex.z-dn.net/?f=y%3Dcos+x%5E%7B20%7D+%0A%5C%0Ay%27%3D-sin+x%5E%7B20%7Dcdot%28x%5E%7B20%7D%29%27%3D%0A-sin+x%5E%7B20%7Dcdot20x%5E%7B19%7D%3D-20x%5E%7B19%7Dsin+x%5E%7B20%7D%0A%5C%0Ay%27%27%3D-20cdot%28%28x%5E%7B19%7D%29%27cdot+sin+x%5E%7B20%7D%2Bx%5E%7B19%7Dcdot+%28sin+x%5E%7B20%7D%29%27%29%3D%0A%5C%0A%3D-20cdot%2819x%5E%7B18%7Dcdot+sin+x%5E%7B20%7D%2Bx%5E%7B19%7Dcdot+cos+x%5E%7B20%7Dcdot%28x%5E%7B20%7D%29%27%29%3D%0A%5C%0A%3D-20cdot%2819x%5E%7B18%7D+sin+x%5E%7B20%7D%2Bx%5E%7B19%7Dcdot+cos+x%5E%7B20%7Dcdot20x%5E%7B19%7D%29%3D%0A%5C%0A%3D-20cdot%2819x%5E%7B18%7D+sin+x%5E%7B20%7D%2B20x%5E%7B38%7Dcos+x%5E%7B20%7D%29%3D%0A%5C%0A%3D-380x%5E%7B18%7D+sin+x%5E%7B20%7D-400x%5E%7B38%7Dcos+x%5E%7B20%7D "y=cos x^{20}
\
y'=-sin x^{20}cdot(x^{20})'=
-sin x^{20}cdot20x^{19}=-20x^{19}sin x^{20}
\
y''=-20cdot((x^{19})'cdot sin x^{20}+x^{19}cdot (sin x^{20})')=
\
=-20cdot(19x^{18}cdot sin x^{20}+x^{19}cdot cos x^{20}cdot(x^{20})')=
\
=-20cdot(19x^{18} sin x^{20}+x^{19}cdot cos x^{20}cdot20x^{19})=
\
=-20cdot(19x^{18} sin x^{20}+20x^{38}cos x^{20})=
\
=-380x^{18} sin x^{20}-400x^{38}cos x^{20}")
2)
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