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- https://math.libretexts.org/Courses/Mission_College/Math_4A%3A_Multivariable_Calculus_v2_(Reed)/15%3A_Multiple_Integration/15.04%3A_Triple_Integrals/15.4E%3A_Exercises_for_Section_15.4If the charge density at an arbitrary point (x,y,z) of a solid E is given by the function ρ(x,y,z), then the total charge inside the solid is defined as the triple integral \(\displays...If the charge density at an arbitrary point (x,y,z) of a solid E is given by the function ρ(x,y,z), then the total charge inside the solid is defined as the triple integral ∭ Assume that the charge density of the solid E enclosed by the paraboloids x = 5 - y^2 - z^2 and x = y^2 + z^2 - 5 is equal to the distance from an arbitrary point of E to the origin.
- https://math.libretexts.org/Courses/SUNY_Geneseo/Math_223_Calculus_3/04%3A_Multiple_Integration/4.04%3A_Triple_Integrals/4.4E%3A_Exercises_for_Section_4.4If the charge density at an arbitrary point (x,y,z) of a solid E is given by the function \rho (x,y,z), then the total charge inside the solid is defined as the triple integral \(\displays...If the charge density at an arbitrary point (x,y,z) of a solid E is given by the function \rho (x,y,z), then the total charge inside the solid is defined as the triple integral \displaystyle \iiint_E \rho (x,y,z) \,dV. Assume that the charge density of the solid E enclosed by the paraboloids x = 5 - y^2 - z^2 and x = y^2 + z^2 - 5 is equal to the distance from an arbitrary point of E to the origin.
- https://math.libretexts.org/Courses/De_Anza_College/Calculus_IV%3A_Multivariable_Calculus/02%3A_Multiple_Integration/2.04%3A_Triple_Integrals/2.4E%3A_ExercisesIf the charge density at an arbitrary point (x,y,z) of a solid E is given by the function \rho (x,y,z), then the total charge inside the solid is defined as the triple integral \(\displays...If the charge density at an arbitrary point (x,y,z) of a solid E is given by the function \rho (x,y,z), then the total charge inside the solid is defined as the triple integral \displaystyle \iiint_E \rho (x,y,z) \,dV. Assume that the charge density of the solid E enclosed by the paraboloids x = 5 - y^2 - z^2 and x = y^2 + z^2 - 5 is equal to the distance from an arbitrary point of E to the origin.
- https://math.libretexts.org/Courses/Lake_Tahoe_Community_College/Interactive_Calculus_Q4/02%3A_Multiple_Integration/2.05%3A_Triple_Integrals/2.5E%3A_ExercisesIf the charge density at an arbitrary point (x,y,z) of a solid E is given by the function \rho (x,y,z), then the total charge inside the solid is defined as the triple integral \(\displays...If the charge density at an arbitrary point (x,y,z) of a solid E is given by the function \rho (x,y,z), then the total charge inside the solid is defined as the triple integral \displaystyle \iiint_E \rho (x,y,z) \,dV. Assume that the charge density of the solid E enclosed by the paraboloids x = 5 - y^2 - z^2 and x = y^2 + z^2 - 5 is equal to the distance from an arbitrary point of E to the origin.
- https://math.libretexts.org/Courses/City_College_of_San_Francisco/CCSF_Calculus/15%3A_Multiple_Integration/15.05%3A_Triple_Integrals/15.5E%3A_Exercises_for_Section_15.4If the charge density at an arbitrary point (x,y,z) of a solid E is given by the function \rho (x,y,z), then the total charge inside the solid is defined as the triple integral \(\displays...If the charge density at an arbitrary point (x,y,z) of a solid E is given by the function \rho (x,y,z), then the total charge inside the solid is defined as the triple integral \displaystyle \iiint_E \rho (x,y,z) \,dV. Assume that the charge density of the solid E enclosed by the paraboloids x = 5 - y^2 - z^2 and x = y^2 + z^2 - 5 is equal to the distance from an arbitrary point of E to the origin.
