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Hw32-16.7-Surface-Integrals: Problem 1 Problem Value: 1 point(s). Problem Score: 67%. Attempts Remaining: 22 attempts. Help Entering...
M MMM M M M CUurse Aelp Hw24-15.9-Triple-Integrals-in-Spherical-Coordinates: Problem 6 Problem Value: 1 point(s). Problem Score:...
M MMM M M M CUurse Aelp Hw24-15.9-Triple-Integrals-in-Spherical-Coordinates: Problem 6 Problem Value: 1 point(s). Problem Score: 75%. Attempts Remaining: 20 attempts. Help Entering Answers (1 point) Express the the average distance from a point in a ball of radius 2 to its center as a triple integral. NOTE: When typing your answers use "rh for p. "ph" for , and "th for 0. P Average Distance E dp dd de J33- PI=0 P2=2 0 2 pi Σ 0 Σ 2pi...
Problem value: 1 point(S). Problem score: 0%. Attempts Remaining: 3 atten Get help entering answe...
Problem value: 1 point(S). Problem score: 0%. Attempts Remaining: 3 atten Get help entering answers See a similar example (PDF) Given that: 15 Find the exact values of the following expressions by using the half-angle identities sin(2) cos 3) tan(을) = 2 2 Note: Enter an exact simplified answer with no decimals. Help Entering Answers Preview My Answers Submit Answers Show me another
Problem value: 1 point(S). Problem score: 0%. Attempts Remaining: 3 atten Get help entering answers See a...
Could you explain how to find the answer to this question?
Could you explain how to find the answer to this question?
Help Entering Answers (1 point) Evaluate the surtace integral- (zx2 +zy) ds. Where S is the hemisphere 2 +^ +2-1, z20 The hemisphere can be parametrized by r(s,1)-〈 sin(s) cos(t), | sin(s)sin(t) H cos(s) , ds di where 1-0 t2= 2pi Evaluate If you don't get this in 3 tries, you can see a similar example (online). However, try to use this as a last resort or after you...
Help Entering Answers (1 point) Verify that Stokes' Theorem is true for the vector field F...
Help Entering Answers (1 point) Verify that Stokes' Theorem is true for the vector field F = yzi - yj + xk and the surface S the part of the paraboloid z= 4 a2 ythat lies above the plane z = 3, oriented upwards. curl FdS To verify Stokes' Theorem we will compute the expression on each side. First compute S curl F = Σ <0,y-1,-z> curl F.dS Σ dy dπ (y-1)-2y)+z where 3 -sqrt(9-x^2) Σ 3 sqrt(9-x^2) curl F...
Hw34-16.9-The-Divergence-Theorem: Problem 5 Problem Value: 1 point(s). Problem Score: 0%. Attempts Remaining: 25 attempts. Help Entering...
Hw34-16.9-The-Divergence-Theorem: Problem 5 Problem Value: 1 point(s). Problem Score: 0%. Attempts Remaining: 25 attempts. Help Entering Answers (1 point) Use the Divergence Theorem to calculate the outward filux of F = (z3 +y%, y3+ 23, 23 + 23) across S: the surface of the sphere centered at the origin with radius 4. 22 E dz dy dz Flux of F across S= where 21 = 21 = y1 = Σ Σ Σ 12 = Y2 = 22 = Flux of...
(1 point) Math 215 Homework homework11, Problem 3 For the parametrically defined surface S given ...
(1 point) Math 215 Homework homework11, Problem 3 For the parametrically defined surface S given by r(u, v) =< uv, u, v2 >, find each of the following differentials. du dv In JJf(x,y,z) ds, ds - du dv
(1 point) Math 215 Homework homework11, Problem 3 For the parametrically defined surface S given by r(u, v) =, find each of the following differentials. du dv In JJf(x,y,z) ds, ds - du dv
MM M MM Help Entering Answers (1 point) Express the volume encloded by the torus p...
MM M MM Help Entering Answers (1 point) Express the volume encloded by the torus p = 3 sin i as a triple integral. NOTE: When typing your answers use "rh" for p, "ph" for , and "th for 0 Volume E dp dp do P JJ3 P= P2= 02 M Evaluate the integral Volume Σ If you don't get this in 3 tries, you can see a similar example (online). However, try to use this as a last resort...
Hw13-3.2-LT-IVP: Problem 3 Problem Value: 10 point(s). Problem Score: 43%. Attempts Remaining: 20 attempts. Help Entering...
Hw13-3.2-LT-IVP: Problem 3 Problem Value: 10 point(s). Problem Score: 43%. Attempts Remaining: 20 attempts. Help Entering Answers See Example 3.2.2, in Section 3.2, in the MTH 235 Lecture Notes. (10 points) Consider the initial value problem for function y given by y" - 6y + 10 y = 0, y(0) = 2, 7(0) = 5. Part 1: Finding Y() - Part 2: Rewriting Y(s) (b) The characteristic polynomial in the denominator of Y(8) above has complex roots. Therefore, complete the...
331 Assignment 9: Problem 3 Previous Problem Problem List Next Problem (1 point) Evaluate the surface...
331 Assignment 9: Problem 3 Previous Problem Problem List Next Problem (1 point) Evaluate the surface integral y ds where S JJS is the surface defined parametrically by: r(u, v) = 2u cos(v)i + 2uj + 2u sin(v)k and 0 <u<1,0 <0 < 27. | | 24ds = Preview My Answers Submit Answers You have attempted this problem 2 times. Your overall recorded score is 0%. You have 1 attempt remaining.
leverents Course Help Hw20-3.7-Optimization: Problem 6 Problem Value: 1 point(s). Problem Score: 0%. Attempts Remaining: 8...
leverents Course Help Hw20-3.7-Optimization: Problem 6 Problem Value: 1 point(s). Problem Score: 0%. Attempts Remaining: 8 attempts. Help Entering Answers (1 point) Find the point on the line 3x + y + 2 = 0 which is closest to the point (2,-4). Answer: 1 Σ Note: Your answer should be a point in form (x-coordinate, y-coordinate) Important: On quizzes / exams you will be expected to use the techniques of MTH 132 to justify that you have found the point...
M MMM M M M CUurse Aelp Hw24-15.9-Triple-Integrals-in-Spherical-Coordinates: Problem 6 Problem Value: 1 point(s). Problem Score: 75%. Attempts Remaining: 20 attempts. Help Entering Answers (1 point) Express the the average distance from a point in a ball of radius 2 to its center as a triple integral. NOTE: When typing your answers use "rh for p. "ph" for , and "th for 0. P Average Distance E dp dd de J33- PI=0 P2=2 0 2 pi Σ 0 Σ 2pi...
Problem value: 1 point(S). Problem score: 0%. Attempts Remaining: 3 atten Get help entering answers See a similar example (PDF) Given that: 15 Find the exact values of the following expressions by using the half-angle identities sin(2) cos 3) tan(을) = 2 2 Note: Enter an exact simplified answer with no decimals. Help Entering Answers Preview My Answers Submit Answers Show me another
Problem value: 1 point(S). Problem score: 0%. Attempts Remaining: 3 atten Get help entering answers See a...
Could you explain how to find the answer to this question?
Help Entering Answers (1 point) Evaluate the surtace integral- (zx2 +zy) ds. Where S is the hemisphere 2 +^ +2-1, z20 The hemisphere can be parametrized by r(s,1)-〈 sin(s) cos(t), | sin(s)sin(t) H cos(s) , ds di where 1-0 t2= 2pi Evaluate If you don't get this in 3 tries, you can see a similar example (online). However, try to use this as a last resort or after you...
Help Entering Answers (1 point) Verify that Stokes' Theorem is true for the vector field F = yzi - yj + xk and the surface S the part of the paraboloid z= 4 a2 ythat lies above the plane z = 3, oriented upwards. curl FdS To verify Stokes' Theorem we will compute the expression on each side. First compute S curl F = Σ <0,y-1,-z> curl F.dS Σ dy dπ (y-1)-2y)+z where 3 -sqrt(9-x^2) Σ 3 sqrt(9-x^2) curl F...
Hw34-16.9-The-Divergence-Theorem: Problem 5 Problem Value: 1 point(s). Problem Score: 0%. Attempts Remaining: 25 attempts. Help Entering Answers (1 point) Use the Divergence Theorem to calculate the outward filux of F = (z3 +y%, y3+ 23, 23 + 23) across S: the surface of the sphere centered at the origin with radius 4. 22 E dz dy dz Flux of F across S= where 21 = 21 = y1 = Σ Σ Σ 12 = Y2 = 22 = Flux of...
(1 point) Math 215 Homework homework11, Problem 3 For the parametrically defined surface S given by r(u, v) =< uv, u, v2 >, find each of the following differentials. du dv In JJf(x,y,z) ds, ds - du dv
(1 point) Math 215 Homework homework11, Problem 3 For the parametrically defined surface S given by r(u, v) =, find each of the following differentials. du dv In JJf(x,y,z) ds, ds - du dv
MM M MM Help Entering Answers (1 point) Express the volume encloded by the torus p = 3 sin i as a triple integral. NOTE: When typing your answers use "rh" for p, "ph" for , and "th for 0 Volume E dp dp do P JJ3 P= P2= 02 M Evaluate the integral Volume Σ If you don't get this in 3 tries, you can see a similar example (online). However, try to use this as a last resort...
Hw13-3.2-LT-IVP: Problem 3 Problem Value: 10 point(s). Problem Score: 43%. Attempts Remaining: 20 attempts. Help Entering Answers See Example 3.2.2, in Section 3.2, in the MTH 235 Lecture Notes. (10 points) Consider the initial value problem for function y given by y" - 6y + 10 y = 0, y(0) = 2, 7(0) = 5. Part 1: Finding Y() - Part 2: Rewriting Y(s) (b) The characteristic polynomial in the denominator of Y(8) above has complex roots. Therefore, complete the...
331 Assignment 9: Problem 3 Previous Problem Problem List Next Problem (1 point) Evaluate the surface integral y ds where S JJS is the surface defined parametrically by: r(u, v) = 2u cos(v)i + 2uj + 2u sin(v)k and 0 <u<1,0 <0 < 27. | | 24ds = Preview My Answers Submit Answers You have attempted this problem 2 times. Your overall recorded score is 0%. You have 1 attempt remaining.
leverents Course Help Hw20-3.7-Optimization: Problem 6 Problem Value: 1 point(s). Problem Score: 0%. Attempts Remaining: 8 attempts. Help Entering Answers (1 point) Find the point on the line 3x + y + 2 = 0 which is closest to the point (2,-4). Answer: 1 Σ Note: Your answer should be a point in form (x-coordinate, y-coordinate) Important: On quizzes / exams you will be expected to use the techniques of MTH 132 to justify that you have found the point...
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