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13.解: 由题意:x=1+t^2,y=cost
dx=2tdt,dy=-sintdt。dy/dx=-sint/(2t)
[d^2(y)/dx^2]=(dy/dx)'/(dx/dt)
={[-2tcost+2sint]/(4t^2)}/2t
=(sint-tcost)/(4t^3)
dx=2tdt,dy=-sintdt。dy/dx=-sint/(2t)
[d^2(y)/dx^2]=(dy/dx)'/(dx/dt)
={[-2tcost+2sint]/(4t^2)}/2t
=(sint-tcost)/(4t^3)
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一下明白了真好
d^2(y)/dx^2=(dy/dx)'/(dx/dt)
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(12)
y=e^[tan(1/x)]. sin(1/x)
y'
=e^[tan(1/x)]. (sin(1/x))' + sin(1/x). { e^[tan(1/x)] } '
=e^[tan(1/x)]. cos(1/x) .(1/x)' + sin(1/x). e^[tan(1/x)] . (tan(1/x))'
=e^[tan(1/x)]. cos(1/x) .(-1/x^2) + sin(1/x). e^[tan(1/x)] . [sec(1/x)]^2 .(1/x)'
=e^[tan(1/x)]. cos(1/x) .(-1/x^2) + sin(1/x). e^[tan(1/x)] . [sec(1/x)]^2 .(-1/x^2)
=-(1/x^2). e^[tan(1/x)] . { cos(1/x) + sin(1/x).[sec(1/x)]^2 }
(13)
x=1+t^2
dx/dt = 2t
y=cost
dy/dt = -sint
dy/dx = (dy/dt)/(dx/dt) = -sint/(2t)
d/dt (dy/dx )
=-(1/2) [(t.cost - sint)/t^2]
d^2y/dx^2
=d/dt (dy/dx )/ (dx/dt)
=-(1/2) [(t.cost - sint)/t^2] / 2t
=(sint-tcost)/4t^3
y=e^[tan(1/x)]. sin(1/x)
y'
=e^[tan(1/x)]. (sin(1/x))' + sin(1/x). { e^[tan(1/x)] } '
=e^[tan(1/x)]. cos(1/x) .(1/x)' + sin(1/x). e^[tan(1/x)] . (tan(1/x))'
=e^[tan(1/x)]. cos(1/x) .(-1/x^2) + sin(1/x). e^[tan(1/x)] . [sec(1/x)]^2 .(1/x)'
=e^[tan(1/x)]. cos(1/x) .(-1/x^2) + sin(1/x). e^[tan(1/x)] . [sec(1/x)]^2 .(-1/x^2)
=-(1/x^2). e^[tan(1/x)] . { cos(1/x) + sin(1/x).[sec(1/x)]^2 }
(13)
x=1+t^2
dx/dt = 2t
y=cost
dy/dt = -sint
dy/dx = (dy/dt)/(dx/dt) = -sint/(2t)
d/dt (dy/dx )
=-(1/2) [(t.cost - sint)/t^2]
d^2y/dx^2
=d/dt (dy/dx )/ (dx/dt)
=-(1/2) [(t.cost - sint)/t^2] / 2t
=(sint-tcost)/4t^3
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十三题,dy比dx等于 负sint除以2t 我明白
之后没看懂
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