Define Continuity of a function f(x,y) at a point (a,b) ?

1383

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State and prove the sufficient condition for the maximum value of the function f (x,y)

1014

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State Taylor's theorem and hence obtain Macluarin's expansion in simplified form

1511

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State and prove sufficient condition for differentiability of the function f(x,y).

1040

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Find the rectangle of perimeter 12cm which has maximum area.

1056

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Define simultaneous limit of a function f(x,y) as (x,y) → (a,b)

1781

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State and prove mean value theorem for the function f(x,y).

1212

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Write the condition for critical point (a,b) to become function f(x,y) minimum.

1117

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State sufficient condition for differentiability of a function f(x,y) at a point (a,b)

1224

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find 842.8 +602=

1035

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find 15% of 86.04=

1120

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find 5.72% of 418=

1107

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find 55/1000=___

1074

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find 665+22.9=

1207

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find 200/7*5.04=

1502

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