Homework Answers
As shown in Fig 1, the line with equation y= 2 - x cuts the curve...
As shown in Fig 1, the line with equation y= 2 - x cuts the curve with equation y = -x2+x+6 at points A and B. y = 2-x y = -x + x + 6 4 (0,0 B Fig 1 (i) Find the coordinates of point A (ii) Calculate the shaded area bounded by the curve, the line and the x-axis as shown in Fig 1
can younplease answer all of these i need it for a review please u-x+y, V--2x+y S...
can younplease answer all of these i need it for a review
please
u-x+y, V--2x+y S S 5ydx dy R where is the parallelogram bounded by the lines y=-x+1, y=-x +4, y = 2x + 2, y = 2x + 5 o Express the area of the region bounded by the given line(s) and/or curve(s) as an iterated double integral. The coordinate axes and the line § 35 dy dx x/3 5(1 - x/3) dy dx °? I ddy of...
Please help!! Thanks 1. Consider the function f(x) e a) Find the length of the curve given by the equation y - f(x), -1 3x<1. b) Let R be the region bounded by the graph of f(x) and the lines 1,1 a...
Please help!! Thanks
1. Consider the function f(x) e a) Find the length of the curve given by the equation y - f(x), -1 3x<1. b) Let R be the region bounded by the graph of f(x) and the lines 1,1 and y-0. Find the area of R. c) Find the coordinates of the center of mass of R. d) Consider the solid obtained by rotation of R about the r-axis. Find its volume and surface area.
1. Consider the...
I would like to get answers for this homework as soon as possible . 1. a....
I would like to get answers for this homework as soon
as possible .
1. a. Find the coordinates of the vertex of the quadratic y = 2x2 + 3x – 3. b. Find the maximum and minimum values of 2x2 + 3x – 3 for-25x52. C. Find the exact coordinates of the points where y = 2x² + 3x – 3 cuts the coordinate axes. d. Find the values of k for which 2x2 + 3x - 3 =...
Find the center of mass of a thin plate of constant density δ covering the given region. The region bounded by the parabola y 2x-2x2 and the line y-2x The center of mass is (Type an ordered...
Find the center of mass of a thin plate of constant density δ covering the given region. The region bounded by the parabola y 2x-2x2 and the line y-2x The center of mass is (Type an ordered pair) Find the center of the mass of a thin plate of constant density δ covering the The center of the mass is located at (x,y): (Type an ordered pair, Round to the nearest hundredth) region bounded by the x-axis and the curve...
B Consider the shaded region bounded by y=x2 – 4 and y= 3x + 6 (see...
B Consider the shaded region bounded by y=x2 – 4 and y= 3x + 6 (see above). Note that the r-axis and y-axis are not drawn to the same scale. (a) Find the coordinates of the points A, B, and C. Remember to show all work. (b) Set up but do not evaluate an integral (or integrals) in terms of r that represent(s) the area of the region. That is, your final answer should be a definite integral (or integrals)....
B (2,4) A (-2,3) C (11,2) 0 3y+ 2x+5-0 In the diagram, the points A, Band C have coordinates (-2,3), (2,4) and (11,2) respectively. D is a point such that DA is perpendicular to AB, and Dlies on...
B (2,4) A (-2,3) C (11,2) 0 3y+ 2x+5-0 In the diagram, the points A, Band C have coordinates (-2,3), (2,4) and (11,2) respectively. D is a point such that DA is perpendicular to AB, and Dlies on the line 3y+ 2x+ 5 = 0. 141 Find the coordinates of D. Point E lies on DC and the ratio of the length of DE to the length of DCis 2:3 (i) 141 (ii) Find the area of triangle DBE. (ii)...
A is the point (-1, 5). Let (x, y) be any point on the line y = 3x.
A is the point (-1, 5). Let (x, y) be any point on the line y = 3x. a Write an equation in terms of x for the distance between (x, y) and A(-1,5). b Find the coordinates of the two points, B and C, on the line y = 3x which are a distance of √74 from (-1,5). c Find the equation of the line l1 that is perpendicular to y = 3x and goes through the point (-1,5). d Find the coordinates...
Compute the followingelementaryintegrals.(a)dxxxxx3233/2[ 5 ](b)dxxx222[5](c)dxxsin3/0 Question [15] Compute the following elementary integrals. 3x dx 3e-*-2 ex+1...
Compute the
followingelementaryintegrals.(a)dxxxxx3233/2[ 5
](b)dxxx222[5](c)dxxsin3/0
Question [15] Compute the following elementary integrals. 3x dx 3e-*-2 ex+1 [5] x3 sec?(x4 + 2) dx [4] (b) S (0) Lix - 1dx [6] Question 2 [20] Evaluate the following indefinite integrals. x2 dx [6] (b) f(x+1) tan-+ x dx [6] 10x (c) S x + 3)(x2 + 4x + 13) dx [8] Question 3 [15] (a) Find the area of the region bounded by the parabola x = y2 – 5 and the...
Q2 Figure Q2 illustrates a graph that contains two parallel straight lines, with a shaded region...
Q2 Figure Q2 illustrates a graph that contains two parallel straight lines, with a shaded region bounded by both lines and both axes. y Line A Line B Figure Q2 (a) Find the equation of Line A and Line B respectively. (2 marks) (b) (c) Compute the area of the shaded region. (3 marks) The shaded region is revolved around y - axis. (i) Compute the volume of solid generated by revolving the bounded region between Line A and both...
As shown in Fig 1, the line with equation y= 2 - x cuts the curve with equation y = -x2+x+6 at points A and B. y = 2-x y = -x + x + 6 4 (0,0 B Fig 1 (i) Find the coordinates of point A (ii) Calculate the shaded area bounded by the curve, the line and the x-axis as shown in Fig 1
can younplease answer all of these i need it for a review
please
u-x+y, V--2x+y S S 5ydx dy R where is the parallelogram bounded by the lines y=-x+1, y=-x +4, y = 2x + 2, y = 2x + 5 o Express the area of the region bounded by the given line(s) and/or curve(s) as an iterated double integral. The coordinate axes and the line § 35 dy dx x/3 5(1 - x/3) dy dx °? I ddy of...
Please help!! Thanks
1. Consider the function f(x) e a) Find the length of the curve given by the equation y - f(x), -1 3x<1. b) Let R be the region bounded by the graph of f(x) and the lines 1,1 and y-0. Find the area of R. c) Find the coordinates of the center of mass of R. d) Consider the solid obtained by rotation of R about the r-axis. Find its volume and surface area.
1. Consider the...
I would like to get answers for this homework as soon
as possible .
1. a. Find the coordinates of the vertex of the quadratic y = 2x2 + 3x – 3. b. Find the maximum and minimum values of 2x2 + 3x – 3 for-25x52. C. Find the exact coordinates of the points where y = 2x² + 3x – 3 cuts the coordinate axes. d. Find the values of k for which 2x2 + 3x - 3 =...
Find the center of mass of a thin plate of constant density δ covering the given region. The region bounded by the parabola y 2x-2x2 and the line y-2x The center of mass is (Type an ordered pair) Find the center of the mass of a thin plate of constant density δ covering the The center of the mass is located at (x,y): (Type an ordered pair, Round to the nearest hundredth) region bounded by the x-axis and the curve...
B Consider the shaded region bounded by y=x2 – 4 and y= 3x + 6 (see above). Note that the r-axis and y-axis are not drawn to the same scale. (a) Find the coordinates of the points A, B, and C. Remember to show all work. (b) Set up but do not evaluate an integral (or integrals) in terms of r that represent(s) the area of the region. That is, your final answer should be a definite integral (or integrals)....
B (2,4) A (-2,3) C (11,2) 0 3y+ 2x+5-0 In the diagram, the points A, Band C have coordinates (-2,3), (2,4) and (11,2) respectively. D is a point such that DA is perpendicular to AB, and Dlies on the line 3y+ 2x+ 5 = 0. 141 Find the coordinates of D. Point E lies on DC and the ratio of the length of DE to the length of DCis 2:3 (i) 141 (ii) Find the area of triangle DBE. (ii)...
Compute the
followingelementaryintegrals.(a)dxxxxx3233/2[ 5
](b)dxxx222[5](c)dxxsin3/0
Question [15] Compute the following elementary integrals. 3x dx 3e-*-2 ex+1 [5] x3 sec?(x4 + 2) dx [4] (b) S (0) Lix - 1dx [6] Question 2 [20] Evaluate the following indefinite integrals. x2 dx [6] (b) f(x+1) tan-+ x dx [6] 10x (c) S x + 3)(x2 + 4x + 13) dx [8] Question 3 [15] (a) Find the area of the region bounded by the parabola x = y2 – 5 and the...
Q2 Figure Q2 illustrates a graph that contains two parallel straight lines, with a shaded region bounded by both lines and both axes. y Line A Line B Figure Q2 (a) Find the equation of Line A and Line B respectively. (2 marks) (b) (c) Compute the area of the shaded region. (3 marks) The shaded region is revolved around y - axis. (i) Compute the volume of solid generated by revolving the bounded region between Line A and both...
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