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प्रश्न
If `u=x^2+y^2+z^2` where `x=e^t, y=e^tsint,z=e^tcost`
Prove that `(du)/(dt)=4e^(2t)`
उत्तर
`(du)/(dt)=(delu)/(delx).(dx)/(dt)+(delu)/(dely).(dy)/(dt)+(delu)/(delz).(dz)/(dt)`
`(delu)/(delx)=2x,(delu)/(dely)=2y,(delu)/(delz)=2z`
`(dx)/(dt)=e^t, (dy)/(dt)=e^t(sint+cost) ,(dz)/(dt)=e^t(-sint+cost)`
`(du)/(dt)=(delu)/(delx).(dx)/(dt)+(delu)/(dely).(dy)/(dt)+(delu)/(delz).(dz)/(dt)`
`=2x(e^t)+2y(e^t(sint+cost))+2z(e^t(-sint+cost))`
= 2x(x)+2y(y+z)+2z(z-y)
`=2x^2+2y^2+2z^2+2xy-2xy`
`=2x^2+2y^2+2z^2`
`=2(x^2+y^2+z^2)`
=2u ………………………………………(1)
`u=x^2+y^2+z^2=(e^t)^2+(e^tsint)^2+(e^tcost)^2`
`=e^(2t)+e^(2t)(sin^2t+cos^2t)`
`=e^(2t)+e^(2t)=2e^(2t)`
Substituting value of u in equation (1)
`(du)/(dt)=2u=2(2e^(2t))=4e^(2t)`
Hence proved
`(Du)/(dt)=4e.`
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