karush said:$\displaystyle
\int_{0}^{1}
\int_{0}^{\sqrt{1-x^2}}
\sqrt{x^2+y^2}
\, dydx=\frac{\pi}{6}$
this was the W|A answer
but how ?
also supposed to graph this
but didn't know the input for desmos
A double integral is a type of integration where the function being integrated is a two-dimensional function, and the integration is performed over a two-dimensional region. In other words, it is the integration of a function of two variables over a specific area in the xy-plane.
To calculate a double integral, you first need to determine the limits of integration for both variables. Then, you can use one of the integration methods, such as rectangular, polar, or cylindrical coordinates, to evaluate the integral. Finally, you integrate the inner integral first and then the outer integral.
The purpose of a double integral is to calculate the volume under a surface in a two-dimensional space. It is also used to calculate the area of a region bounded by a curve or curves in the xy-plane. Double integrals have many applications in physics, engineering, and economics.
A double integral can be used to find the area of a region bounded by a circle and a graph in the xy-plane. This is because a circle can be represented by a function, and the double integral can be used to find the area under this function within the boundaries of the circle. This is a common application of double integrals in mathematics.
Double integrals have many real-life applications, such as calculating the center of mass of an object, finding the moment of inertia of a solid, determining the volume of a three-dimensional shape, and analyzing the flow of fluids. They are also used in optimization problems, such as finding the maximum or minimum value of a function.