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748
в)
![y=sqrt{x}(8x-10);\
y'=left(sqrt{x}right)'cdotleft(8x-10right)+sqrt{x}cdotleft(8x-10right)'=\
=frac{1}{2sqrt{x}}(8x-10)+sqrt{x}cdot8=4sqrt{x}-frac{5}{sqrt{x}}+8sqrt{x}=\
=12sqrt{x}-frac{5}{sqrt{x}}=frac{12x-5}{sqrt x}](https://tex.z-dn.net/?f=y%3Dsqrt%7Bx%7D%288x-10%29%3B%5C%0Ay%27%3Dleft%28sqrt%7Bx%7Dright%29%27cdotleft%288x-10right%29%2Bsqrt%7Bx%7Dcdotleft%288x-10right%29%27%3D%5C%0A%3Dfrac%7B1%7D%7B2sqrt%7Bx%7D%7D%288x-10%29%2Bsqrt%7Bx%7Dcdot8%3D4sqrt%7Bx%7D-frac%7B5%7D%7Bsqrt%7Bx%7D%7D%2B8sqrt%7Bx%7D%3D%5C%0A%3D12sqrt%7Bx%7D-frac%7B5%7D%7Bsqrt%7Bx%7D%7D%3Dfrac%7B12x-5%7D%7Bsqrt+x%7D "y=sqrt{x}(8x-10);\
y'=left(sqrt{x}right)'cdotleft(8x-10right)+sqrt{x}cdotleft(8x-10right)'=\
=frac{1}{2sqrt{x}}(8x-10)+sqrt{x}cdot8=4sqrt{x}-frac{5}{sqrt{x}}+8sqrt{x}=\
=12sqrt{x}-frac{5}{sqrt{x}}=frac{12x-5}{sqrt x}")
г)
![y=sqrt{x}(x^4+2);\
y'=left(sqrt{x}right)'cdotleft(x^4+2right)+sqrt{x}cdotleft(x^4+2right)'=\
=frac{1}{2sqrt{x}}(x^4+2)+sqrt{x}cdot4cdot x^3=frac{x^3sqrt{x}}{2}+frac{1}{sqrt{x}}+4x^3sqrt{x}=\
=4frac12x^3sqrt{x}+frac{1}{sqrt{x}}=frac{9x^4+2}{2sqrt{x}}](https://tex.z-dn.net/?f=y%3Dsqrt%7Bx%7D%28x%5E4%2B2%29%3B%5C%0A+y%27%3Dleft%28sqrt%7Bx%7Dright%29%27cdotleft%28x%5E4%2B2right%29%2Bsqrt%7Bx%7Dcdotleft%28x%5E4%2B2right%29%27%3D%5C%0A+%3Dfrac%7B1%7D%7B2sqrt%7Bx%7D%7D%28x%5E4%2B2%29%2Bsqrt%7Bx%7Dcdot4cdot+x%5E3%3Dfrac%7Bx%5E3sqrt%7Bx%7D%7D%7B2%7D%2Bfrac%7B1%7D%7Bsqrt%7Bx%7D%7D%2B4x%5E3sqrt%7Bx%7D%3D%5C%0A%3D4frac12x%5E3sqrt%7Bx%7D%2Bfrac%7B1%7D%7Bsqrt%7Bx%7D%7D%3Dfrac%7B9x%5E4%2B2%7D%7B2sqrt%7Bx%7D%7D "y=sqrt{x}(x^4+2);\
y'=left(sqrt{x}right)'cdotleft(x^4+2right)+sqrt{x}cdotleft(x^4+2right)'=\
=frac{1}{2sqrt{x}}(x^4+2)+sqrt{x}cdot4cdot x^3=frac{x^3sqrt{x}}{2}+frac{1}{sqrt{x}}+4x^3sqrt{x}=\
=4frac12x^3sqrt{x}+frac{1}{sqrt{x}}=frac{9x^4+2}{2sqrt{x}}")
750
а)
![y=left(frac1x+1right)left(2x-3right);\
y'=left(frac1x+1right)'cdotleft(2x-3right)+left(frac1x+1right)cdotleft(2x-3right)'=\
=-frac1{x^2}cdotleft(2x-3right)+left(frac1x+1right)cdot2=\
=-frac2x+frac3{x^2}+frac2x+2=2+frac{3}{x^2}](https://tex.z-dn.net/?f=y%3Dleft%28frac1x%2B1right%29left%282x-3right%29%3B%5C%0Ay%27%3Dleft%28frac1x%2B1right%29%27cdotleft%282x-3right%29%2Bleft%28frac1x%2B1right%29cdotleft%282x-3right%29%27%3D%5C%0A%3D-frac1%7Bx%5E2%7Dcdotleft%282x-3right%29%2Bleft%28frac1x%2B1right%29cdot2%3D%5C%0A%3D-frac2x%2Bfrac3%7Bx%5E2%7D%2Bfrac2x%2B2%3D2%2Bfrac%7B3%7D%7Bx%5E2%7D "y=left(frac1x+1right)left(2x-3right);\
y'=left(frac1x+1right)'cdotleft(2x-3right)+left(frac1x+1right)cdotleft(2x-3right)'=\
=-frac1{x^2}cdotleft(2x-3right)+left(frac1x+1right)cdot2=\
=-frac2x+frac3{x^2}+frac2x+2=2+frac{3}{x^2}")
б)
![y=left(6-frac1xright)left(6x+1right);\
y'=left(6-frac1xright)'cdotleft(6x+1right)+left(6-frac1xright)cdotleft(6x+1right)'=\
=frac1{x^2}cdotleft(6x+1right)+left(6-frac1xright)cdot6=\
=frac6x+frac1{x^2}+36-frac6x=frac{1}{x^2}+36](https://tex.z-dn.net/?f=y%3Dleft%286-frac1xright%29left%286x%2B1right%29%3B%5C%0Ay%27%3Dleft%286-frac1xright%29%27cdotleft%286x%2B1right%29%2Bleft%286-frac1xright%29cdotleft%286x%2B1right%29%27%3D%5C%0A%3Dfrac1%7Bx%5E2%7Dcdotleft%286x%2B1right%29%2Bleft%286-frac1xright%29cdot6%3D%5C%0A%3Dfrac6x%2Bfrac1%7Bx%5E2%7D%2B36-frac6x%3Dfrac%7B1%7D%7Bx%5E2%7D%2B36 "y=left(6-frac1xright)left(6x+1right);\
y'=left(6-frac1xright)'cdotleft(6x+1right)+left(6-frac1xright)cdotleft(6x+1right)'=\
=frac1{x^2}cdotleft(6x+1right)+left(6-frac1xright)cdot6=\
=frac6x+frac1{x^2}+36-frac6x=frac{1}{x^2}+36")
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750
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