Using a path integral, compute the area of the region D bounded by the curves x...
Directions: Use the graph to find approximate x-coordinates of the points of intersection of the given curves. Then find (approximately- three decimal places) the area of the region bounded by the curves. Also, make a rough sketch of the region sought. You must write the definite integral using proper notation to receive full credit 1) y = χ sin(x*) , y = x6 Directions: Use the graph to find approximate x-coordinates of the points of intersection of the given curves....
Use a triple integral to compute the volume of the region bounded by curves y = 2-2x, x = 0,, and y=0 in the xy plane and the surface defined above by z = x^2
Sketch the region enclosed by the curves and compute its area as an integral along the x- or y- axis. Sketch the region enclosed by the curves and compute its area as an integral along the e- or y-axis. (a) 1 = \y, r = 1 - \yl. (b) 1 = 2y, 2 + 1 = (y - 1)2 21 c) y = cos.r, y = cos 2.c, I=0,2 = 3
Use a double integral to compute the area of the region bounded by y= 8 + 8 sin x and y=8-8 sin x on the interval [0, n]. Make a sketch of the region. Choose the correct sketch of the region below. O A. B. OC. D. лу AY Ay 16- 16- 16- 8- -16 -84 The area of the region is (Simplify your answer.)
By using a double integral, find the area of the region bounded by the lines x = 0, y = 13 and the parabola y=x*+2. (Enter at least three digits after the decimal separation, use comma for decimal separation - not point!!) Yanit:
The region Bounded by the curves y=x2 is revolved about the x-axis. Give an integral for the volume of the solid that is generated. The region bounded by the curves y = 3x and y = x' is revolved about the x-axis. Give an integral for the volume of the solid that is generated. va | ndx (Type an exact answer using a as needed.)
how do I answer part (c)? I. Consider the finite region bounded by the functions y-x and y x ) We want to compute the area of this region by slicing it in two different ways: using horizontal strips and using vertical strips. For each slicing direction, draw a representative slice and write a definite integral that gives the area of the region. Vertical strips Aorizontal strips 15 05 05 05 05 1.0 1.5 05 15 05 -05 Integral: Integral...
The following integral was used to compute the area of a region D using the horizontal slicing 4 - ) - 3] du (a) Sketch and shade the region D. Label all the intersection points. (b) Set up the definite integral to evaluate the area of the same region D using the vertical slicing. Do not evaluate the integral. (c) Draw a typical washer or a cylindrical shell and set up the definite integral to evaluate the volume of the...
(i) Find the area of the region bounded by the curves x = y 5y+6 and x =-y +y+6 Q.2 A. (1) Find the area of the region bounded by the curves x = y2 - 5y +6 and x=-y+y+6 (2 Marks) In(tan x) (ii) Evaluate lim (3 Marks) sinx-cosx B. (1) Evaluate |fxsin(xy dydx (3 Marks) X- (1) Evaluate lim * (11) Evaluate tan lim- (2 Marks) 2 Marks) - tan
The following integral was used to compute the area of a region D using the horizontal slicing ( [~-)) - (a) Sketch and shade the region D. Label all the intersection points. (b) Set up the definite integral to evaluate the area of the same region D using the vertical slicing. Do not evaluate the integral. (c) Draw a typical washer or a cylindrical shell and set up the definite integral to evaluate the volume of the solid by rotating...