Asked by Isaac
How do I go about this?
I need details solution to study
find any given rectangle ∆ R=(xbase0,xbase0+w).(ybase0.ybase0+h) if we define function A A(R)=
∫ ∫R e^(2iπ(x+y)dxdy
Assuming the range for (x,y) are for all real positive integer ....where do we go from there?
I need details solution to study
find any given rectangle ∆ R=(xbase0,xbase0+w).(ybase0.ybase0+h) if we define function A A(R)=
∫ ∫R e^(2iπ(x+y)dxdy
Assuming the range for (x,y) are for all real positive integer ....where do we go from there?
Answers
Answered by
Lola Here To Help
what are the range of x,y. All real positive numbers?
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