Math232 2 Consider the region in first quadrant area bounded by y x,x=6, and the x-axis....
Math23 2 Consider the region in first quadrant area bounded by y x, x 6, and the x-axis. Revolve this bounded region about the x-axis a) Sketch this region and find the volume of the solid of revolution; use the disk method and show an element of the volume. (15 marks) b) Find the coordinates of the centroid of the solid of revolution. c) Find the coordinates of the centroid of the plate; on the sketch above, show the vertical...
1. A region in the first quadrant is bounded by the curves y 6x and y 6x2 (15 marks) a) Sketch the region and find the area of the region using vertical elements; find the intersection points first. b) Find the moment of Inertia of the plate with respect to y-axis. 1. A region in the first quadrant is bounded by the curves y 6x and y 6x2 (15 marks) a) Sketch the region and find the area of the...
Q) Sketch the triangular region in the first quadrant bounded on the left by y-axis and the right by the curves:y-sinx and y-cosx, then find: 1)The area of the region? 2)The volume of the solid generated by revolving this region about the y-axis Q) Sketch the triangular region in the first quadrant bounded on the left by y-axis and the right by the curves:y-sinx and y-cosx, then find: 1)The area of the region? 2)The volume of the solid generated by...
2) The region R in the first quadrant of the xy-plane is bounded by the curves y=−3x^2+21x+54, x=0 and y=0. A solid S is formed by rotating R about the y-axis: the (exact) volume of S is = 3) The region R in the first quadrant of the xy-plane is bounded by the curves y=−2sin(x), x=π, x=2π and y=0. A solid S is formed by rotating R about the y-axis: the volume of S is = 4) The region bounded...
The region R in the first quadrant bounded by the curve y = x2 + 1 and the line y = 3x + 1 is revolved about the line y = 1. SKETCH the solid of revolution and find its VOLUME by i) The Washer Method ii) The Shell Method
Please help !! and explain !! Thank you so much 1. Consider the region R bounded by the graph of y 0, 7Tand the x-axis sin() on a) Find the area of R b) Find the volume of the solid of revolution obtained by rotation of R about the x-axis c) Find the volume of the solid of revolution obtained by rotation of R about the y-axis d) Find the coordinates of the center of mass of R 1. Consider...
6. (20 points) Find the centroid of the region in the first quadrant bounded by the z-axis. 1-y2, and the line x + y 2. 6. (20 points) Find the centroid of the region in the first quadrant bounded by the z-axis. 1-y2, and the line x + y 2.
1. y = -x/6 + 1, y = x/2 + 1, x = 6 Axis of revolution: y = 0. a) Sketch of the region bounded by the given functions and sketch the axis of revolution (1 point). b) Set up (but do not evaluate) an integral to determine the volume of the solid obtained by rotating the region bounded by the functions around the axis of revolution. Use the disk method or the cylindrical shells method (3 points). c)...
3. Consider the first-quadrant region S which is above the x-axis, below the curve y +1, and bounded by the lines 1=1, and x 3, as shown below. Use any method(s) (mix & match) to find the volume of the solid formed by revolving this region... (a) about the x-axis. (b) about the line x-3.
1) Find the volume of the solid obtained by rotating the region in the first quadrant bounded by the curves x=0, y=1, x=y^7, about the line y=1. 2) Find the surface area of revolution about the x-axis of y=7x+4 over the interval 1≤x≤4. 3)The region bounded by f(x)=−1x^2+5x+14 x=0, and y=0 is rotated about the y-axis. Find the volume of the solid of revolution. Find the exact value; write answer without decimals.