a) Draw the region of integration for the following integral. Label everything. Make sure to include...
The following integral was used to compute the area of a region D using the horizontal slicing dy (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 the region...
1. 14 points] For the integral below you are to (a) sketch and shade the domain/region over which you are integrating in the zy-plane, (b) rewrite the integral with the order of integration reversed; and (c) evaluate the integral in whichever version/order of integration is easiest. P sure to show all of your steps sin(a)V1 +sin() dr dy Jo Jo
1. 14 points] For the integral below you are to (a) sketch and shade the domain/region over which you are...
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...
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...
. Show all of your work. o Label the axes and scale on your graph. The sketch should include at least three to five points including the points of intersection and at least one point in between • The integration techniques used should be clear and easy to follow step by step with all techniques shown in detail, including the substitution method. o All steps must be shown in your own writing to receive any credit. Circle or box your...
Show all of your work. Label the axes and scale on your graph. The sketch should include at least three . to five points including the points of intersection and at least one point in between The integration techniques used should be clear and easy to follow step by step with all techniques shown in detail, including the substitution method. . . All steps must be shown in your own writing to receive any credit. Circle or box your final...
Find the volume generated by revolving about the x-axis, the region enclosed by y=x^2+1 and 3x−2y=−4 Be sure to draw the region in the x-y plane, label the axis of revolution, state your method (disc or shell), draw a rectangle to be rotated, label the thickness (dx or dy), state the integral, and sketch the resulting 3D shape. State the volume exactly. show all work please.
please help me and show all the steps and make sure it's
correct
[10pts.) 5. Find dy and the equation of the tangent line at the point (x,y)=(-2, 0) on the curve r = 21-sin(@)). Include a graph of the polar curve with the orienation indicated. dx [10 pts.) 6. Graph the polar equations r = 5 cos(30) and r = 3cos() for --/2S15 /2. Label any key points needed to find the area that lies in the common interior...
. . Show all of your work. Label the axes and scale on your graph. The sketch should include at least three to five points including the points of intersection and at least one point in between. . The integration techniques used should be clear and easy to follow step by step with all techniques shown in detail, including the substitution method. . . All steps must be shown in your own writing to receive any credit. Circle or box...
Provide the Big‐O notation for the following lines of Java code, make sure you include all the necessary steps to reach your answer to receive any credit: a. for (i = 10; i < n – 8; i++) { for( j = 1; j < m; j *= 2) x = i + j; } b. for(k = 0; k <= m; k += 2) { l = 0; while(l < n/2) { y = l * 4 – x;...