Tính tích phân 2 lớp: ∫∫(1+3x+2y)dxdy

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asked Jan 18, 2022 113k views

2 votes

Tính tích phân 2 lớp:
∫∫(1+3x+2y)dxdy

Mathematics
college

Sateesh asked

by Sateesh

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2 Answers

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Answer:

$\\\int _(\:)^(\:)\int _(\:)^(\:)\:1+3x+2y\:dxdy=Cy+(3x^2)/(2)y+xy+xy^2+C$

Explanation:

$\\\int _(\:)^(\:)\int _(\:)^(\:)\:1+3x+2y\:dxdy$

$\int _(\:)^(\:)\left(1+3x+2y\right)\:dx\:=x+2yx\:+(3x^2)/(2)+C$

$=\int \left(x+2yx+(3x^2)/(2)+C\right)dy$

=Cy+(3x^2)/(2)y+xy+xy^2+C

Ofri Raviv answered Jan 21, 2022

by Ofri Raviv

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We know the formula

$\boxed{\displaystyle\int x^ndx=(x^(n+1))/(n+1)+c}$

c is constant
Here c=1

$\\ \displaystyle\longmapsto \int (1+3x+2y)dx$

$\\ \displaystyle\longmapsto (3x^(1+1))/(1+1)+(2y^(1+1))/(1+1)+1$

$\\ \sf\longmapsto (3x^2)/(2)+(2y^2)/(2)+1$

$\\ \sf\longmapsto (3x^2)/(2)+y^2+1$

$\\ \sf\longmapsto (3x^2+2y^2+2)/(2)$

Marc Liyanage answered Jan 24, 2022

by Marc Liyanage

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