If V(x, y) = ex (x cosy – y siny), then Prove that VV∂2V∂x2+∂2V∂y2 = 0

प्रश्न

If V(x, y) = e^x (x cosy – y siny), then Prove that `(del^2"V")/(delx^2) + (del^2"V")/(dely^2)` = 0

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उत्तर

V(x, y) = e^x (x cosy – y siny)

`(del"V")/(delx)` = e^x (x cosy – y siny) + e^x cosy

`(del^2"V")/(delx^2)` = e^x (x cosy – y siny) + e^x cosy + e^x cosy

`(del"V")/(dely)` = – xe^x (– siny) – e^x (y cosy + siny)

`(del^2"V")/(dely^2)` = – xe^x cosy – e^x (y(– siny) + cosy + cosy)

= – e^x (x cosy – y siny) – 2e^x cosy

`(del^2"V")/(delx^2) + (del^2"V")/(dely^2)` = e^x [x cosy – y siny] + 2e^x cosy

– e^x (x cosy – y siny) – 2e^x cosy

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Partial Derivatives

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Q 7 Q 6 Q 8

अध्याय 8: Differentials and Partial Derivatives - Exercise 8.4 [पृष्ठ ७९]

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सामाचीर कलवी Mathematics - Volume 1 and 2 [English] Class 12 TN Board

अध्याय 8 Differentials and Partial Derivatives
Exercise 8.4 | Q 7 | पृष्ठ ७९

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If V(x, y) = ex (x cosy – y siny), then Prove that VV∂2V∂x2+∂2V∂y2 = 0

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