Solve for the volume generated by solids of revolution using integration. Using Circular Disk Method 1. Find the volume generated by revolving the first quadrant area bounded by the parabola y2 = \"8M5\" and its lotus rectum (x=2} about the xoxis. 2. Find the volume generated by revolving the area bounded by the parabola y2 = x and its latus rectum x = .2... about the lotus rectum. Using Washer Method 3. Find the volume generated by revolving the area bounded by the parabola y2 = Q"); and its lotus rectum (x=2} about the yaxis. 4. Find the volume generated by revolving the area cut oft from the parabola YZ x2 by the xaxis about the line y = 6 Using Cylindrical Shell Method 5. Find the volume generated by revolving the area bounded by the parabola y2 = \"Su and its lotus rectum about the lotus rectum. 2. Find the volume when the plane area bounded by y = x2 g + 6 and x + y 3 = 0 is revolved [a] aboutx = 3, lb} about y = 0