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प्रश्न
Let u = x cos y + y cos x. Verify `(del^2"u")/(delxdely) = (del^"u")/(del"y"del"x")`
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उत्तर
u = x cos y + y cos x
Differentiating partially with respect to y, we get,
`(delu)/(dely) = del/(dely) (x cos y) + del/(dely) (y cos x)`
`= x del/(del y) (cos y) + cos x ddel/(del y) (y)`
= x(-sin y) + cos x
Again differentiating partially with respect to x, we get
`del/(delx) ((delu)/(dely)) = del/(delx) (- x sin y) + del/(delx) (cos x)`
`= del/(delx) (- x sin y) + del/(delx) (cos x)`
`= - sin y del/(delx) (x) + (- sin x)`
= -sin y (1) + (-sin x)
= -sin y – sin x ……… (1)
Now u = x cos y + y cos x
Differentiating partially with respect to x we get
`(delu)/(delx) = cos y del/(delx) (x) + y del/(delx) (cos x)`
= cos y (1) + y(-sin x)
= cos y – y sin x
Again differentiating partially with respect to y we get,
`del/(dely) ((delu)/(dely)) = del/(dely) (cos y - y sin x)`
`= del/(dely) (cos y) - del/(dely) (y sin x)`
= -sin y – sin x `del/(dely)`(y)
= -sin y – sin x (1)
= -sin y – sin x ………(2)
From (1) and (2),
`(del^2"u")/(delxdely) = (del^"u")/(del"y"del"x")`
Hence verified.
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