Polar Coordinates – Finding integration limits in polar coordinates – Exercise 3980 Post category:Polar Coordinates Post comments:0 Comments Exercise Given the double integral ∫∫Df(x,y)dxdy\int\int_D f(x,y) dxdy∫∫Df(x,y)dxdy Calculate the integration limits in polar coordinates where D is the domain x2+y2≤a2,a>0x^2+y^2\leq a^2, a>0x2+y2≤a2,a>0 Final Answer Show final answer ∫02πdθ∫0af(rcosθ,rsinθ)dr\int_0^{2\pi}d\theta\int_0^a f(r\cos\theta,r\sin\theta) dr∫02πdθ∫0af(rcosθ,rsinθ)dr Solution Coming soon… Share with Friends Read more articles Previous PostPolar Coordinates – Finding integration limits in polar coordinates – Exercise 3986 Next PostPolar Coordinates – Fixed integration limits – Exercise 3976 You Might Also Like Polar Coordinates – Fixed integration limits – Exercise 3976 March 10, 2019 Polar Coordinates – Finding integration limits in polar coordinates – Exercise 3986 March 10, 2019 Polar Coordinates – Finding integration limits in polar coordinates – Exercise 3992 March 10, 2019 Polar Coordinates – Finding integration limits in polar coordinates – Exercise 3994 March 10, 2019 Polar Coordinates – Finding integration limits in polar coordinates – Exercise 3997 March 10, 2019 Polar Coordinates – Finding integration limits in polar coordinates – Exercise 4002 March 10, 2019 Leave a Reply Cancel replyCommentEnter your name or username to comment Enter your email address to comment Enter your website URL (optional) Δ