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  • https://math.libretexts.org/Courses/Georgia_State_University_-_Perimeter_College/MATH_2215%3A_Calculus_III/15%3A_Multiple_Integration/Double_Integrals_Part_2_(Exercises)
    Show that DxdA=10yyx dx dy+21yy2x dx dy by dividing the region D into two regions o...Show that DxdA=10yyx dx dy+21yy2x dx dy by dividing the region D into two regions of Type II, where D={(x,y)|yx2, yx, yx+2}. 39) Find the volume of the solid under the surface z=x3 and above the plane region bounded by x=sin y, x=sin y, and x=1.
  • https://math.libretexts.org/Courses/Misericordia_University/MTH_226%3A_Calculus_III/Chapter_15%3A_Multiple_Integration/4.06%3A_Double_Integrals_Part_2_(Exercises)
    Show that DxdA=10yyx dx dy+21yy2x dx dy by dividing the region D into two regions o...Show that DxdA=10yyx dx dy+21yy2x dx dy by dividing the region D into two regions of Type II, where D={(x,y)|yx2, yx, yx+2}. 39) Find the volume of the solid under the surface z=x3 and above the plane region bounded by x=sin y, x=sin y, and x=1.
  • https://math.libretexts.org/Courses/Montana_State_University/M273%3A_Multivariable_Calculus/15%3A_Multiple_Integration/Double_Integrals_Over_General_Regions/Double_Integrals_Part_2_(Exercises)
    Show that DxdA=10yyx dx dy+21yy2x dx dy by dividing the region D into two regions o...Show that DxdA=10yyx dx dy+21yy2x dx dy by dividing the region D into two regions of Type II, where D={(x,y)|yx2, yx, yx+2}. 39) Find the volume of the solid under the surface z=x3 and above the plane region bounded by x=sin y, x=sin y, and x=1.

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