Monday, March 28, 2022

March Calculus Madness Sweet Sixteen - Day 13: Some Double Integrals

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Welcome to March Calculus Madness!


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Double Integration Time


(I) 

∫ ∫ sin(a*x + b*y) dx dy

= ∫ -1/a * cos(a*x + b*y) + C1 dy

= -1/(a*b) * sin(a*x + b*y) + C1*y + C2


(II) 

∫ ∫ sin(a*x + b*y) dy dx

= ∫ -1/b * cos(a*x + b*y)+ C1 dx

= -1/(a*b) * sin(a*x + b*y) + C1 * x + C2


For (I) and (II) to equal,  x = y


(III)

∫ ∫ e^(a*x + b*y) dx dy

= ∫ 1/a * e^(a*x + b*y)+ C1 dy

= 1/(a*b) * e^(a*x + b*y) + C1 * y + C2


(IV)

∫ ∫ e^(a*x + b*y) dy dx

= ∫ 1/b * e^(a*x + b*y) + C1  dx

= 1/(a*b) * e^(a*x + b*y) + C1 * x + C2


For (III) and (IV) to be equal, x = y


Eddie


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