Types of Evaluation of Double Integral

The double integral can be evaluated in three different ways

Topic

Types of Evaluation of Double Integral

Problems

  1. Evaluate double integral of xy dx dy over the specified region R, where R is the region bounded by the coordinate axes and the line x+y=1
  2. Evaluate double integral of [xy(x+y) dy dx ] taken over the area between y=x^2 and y=x
  3. Evaluate double integral of xy dx dy over the positive quadrant of the circle x^2+y^2=a^2
  4. Evaluate double integral of xy dy dx over the limits x=(0 to 1) and y=(x to sqrt(x)) by changing the order of integration
  5. Change the order of integration and hence evaluate integral of dx dy over the limits x=(sqrt(y) to 1) and y=(0 to 1)
  6. Change the order of integration and hence evaluate double integral of xy dy dx over the limits y= (x^2/4a to 2xsqrt(ax)) and x = (o to 4a)
  7. Evaluate double integral of e^(x^2+y^2) over the limits x=(0 to infinity) and y=(0 to infinity) by changing into polar coordinates
  8. Evaluate e^-y / y dy dx over the limits y = (x to infinity) and x = (0 to infinity) by changing order of integration
  9. Evaluate x/(x^2+y^2) over the limits x=(y to a) and y=(0 to a) by changing the order of integration
  10. Change the integral sqrt (x^2+y^2) over the limits y=(0 to sqrt(a^2-x^2) ans x=(-a to a) into polars and hence evaluate its value

 

 

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