first thanks a lot for the excellent video and good description then I have a question how can you find the roots of this equation: R = ∑_(k=1)^(k=100)▒∑_(j=-100)^(j=100)▒(e^12 〖 (12)〗^k )/k! k/(2π(w^2+1/4)) √(1-〖(w/(LkR^2 ))〗^2 ) ∆w ∆k , ∆k=1,∆w=LkR^2/100
MERCI BEAUCOUP TRES INTERESSANT
this function is really usefull!
What if I'm getting the error "Result from function call is not a proper array of floats."
should we include sigma variable in our function even though it is a constant but you didn't add it .
You should zoom the content,not clearly visible.
what if the equation doesnt equal to zero? where should we define this specific value? for the heat transfer example...
first thanks a lot for the excellent video and good description then I have a question how can you find the roots of this equation: R = ∑_(k=1)^(k=100)▒∑_(j=-100)^(j=100)▒(e^12 〖 (12)〗^k )/k! k/(2π(w^2+1/4)) √(1-〖(w/(LkR^2 ))〗^2 ) ∆w ∆k , ∆k=1,∆w=LkR^2/100