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Integration by substitution Integral of tansqrtxsqrtx dx
Integral of cos^3x dx x = 0 to Pi2
Integration by Parts Integral of x^2*coshx dx
Integration by Parts Integral of x^2*cos3x dx
Integration by Parts Integral of x*tanxsecx dx
Integral of sin^8x - cos^8x1 - 2sin^2xcos^2x dx
Integral of 1x-1^2*x-2^3 dx without partial fractions method
Charge density at xy is σxy = 2x + 4y. Find the total charge on the rectangle.
Find the critical points of the function fxy = x^3 + 3xy + y^3
Integration by parts Integral of x ln4 + x^4 dx
Polar coordinates to find volume inside both the cylinder x^2+y^2=4 and ellipsoid 4x^2+4y^2+z^2=64
Change integral to polar coordinates x dA where D is the region in first quadrant that lies between
Change integral to polar coordinates e^-x^2 - y^2 dA where R is region bounded by semicircle
Use Symmetry to evaluate the Double Integral xy1 + x^4 dy dx y = 0 to 1 x = -1 to 1
Integration by u Substitution Integral of cot^5x*sin^4x dx
Integration by u Substitution Integral of cos^2x*tan^3x dx
Integration by Parts Integral of x*sin^3x dx
Evaluate the double integral x + 2y dA where D is region bounded by parabolas y=2x^2 and y=1+x^2
Determine the absolute extrema of the function fx = 2x^3 -3x^2 - 12x + 1 on the interval -23
Graph the solid that lies between z = 2xyx^2+1 and the plane z = x + 2y. Find the volume.
Find the volume of the solid enclosed by the paraboloid z = 2 + x^2 + y - 2^2
Find the volume of solid in first octant bounded by the cylinder z = 16 - x^2 and the plane y = 5
Find the volume of the solid enclosed by the surface z = 1 + e^xsiny
Find the volume of the solid lying under the elliptic paraboloid x^24 + y^29 + z = 1
Find the volume of the solid that lies under the hyperbolic paraboloid z = 3y^2 - x^2 + 2
Find the volume of the solid that lies under the plane 4x + 6y - 2z + 15 = 0
Double Integral 11 + x + y dy dx y = 1 to 2 x = 1 to 3
Double Integral ye^-xy dx dy x = 0 to 3 y = 0 to 3
Double Integral x1 + xy dy dx y = 0 to 1 x = 0 to 1
Double Integral 1 + x^21 + y^2 dy dx y = 0 to 1 x = 0 to 1
Double Integral xy^2x^2 + 1 dy dx y = -3 to 3 x = 0 to 1
Double Integral y + xy^-2 dx dy x = 0 to 2 y = 0 to 2
Double Integral sinx - y dy dx y = 0 to pi2 x = 0 to pi2
Double Integral y + y^2cosx dx dy x = 0 to pi2 y = -3 to 3
Double Integral y^3*e^2x dy dx y= 0 to 4 x = 0 to 2
Double Integral 6x^2y - 2x dy dx y = 0 to 2 x = 1 to 4
Volume of Solid bounded by x^2 + 2y^2 + z = 16 x = 2 y = 2 and the three coordinate planes
Double Riemann Sum Volume of Solid fxy = sqrt52 - x^2 - y^2
Double Riemann Sum z = 1+x^2+3y R = 12x03 Use the midpoint rule to estimate the volume.
Double Integral xsinx + y dy dx y = 0 to pi3 x = 0 to pi6
Double Riemann Sum xe^-xy dA R = 02 x 01 Sample points Upper right Corners
Double Riemann Sum 1 - xy^2 dA R=04x-12
Volume of solid that lies below surface z=xy and above rectangle R=06x04 using midpoint rule
Estimate the volume of solid that lies below the surface z = xy and above rectangle R=06x04
Integral of cos^2xsin2x dx
Determine the absolute extrema of the function fx = 3x^2 -12x + 5 on the interval 03
Implicit Differentiation xy^3 = 1
Double Integral sin^2xcos^2y dy dx y = 0 to Pi2 x = 0 to Pi
Find the equation of tangent line of fx = 16x -4sqrtx at x = 4
Inverse Laplace Transform of 2s^2 - 4s + 1s - 2s - 3