Ask a New Question
Menu

Evaluate the line integral ∫5ydx+2xdy

  1. Evaluate the line integral ∫5ydx+2xdy where C is the straight line path from (2,4) to (5,9).
    1. answers icon 1 answer
    2. ally asked by ally
    3. views icon 1,004 views
  2. Show that the given line integral is independent of path.Then, evaluate the line integral I by finding a potential function f
    1. answers icon 1 answer
    2. Donny asked by Donny
    3. views icon 1,081 views
  3. 1. Express the given integral as the limit of a Riemann sum but do not evaluate:integral[0 to 3]((x^3 - 6x)dx) 2.Use the
    1. answers icon 1 answer
    2. Ernie asked by Ernie
    3. views icon 4,228 views
  4. Evaluate the integral: 16csc(x) dx from pi/2 to pi (and determine if it is convergent or divergent).I know how to find the
    1. answers icon 2 answers
    2. Sam asked by Sam
    3. views icon 791 views
  5. Evaluate the integral: 16csc(x) dx from pi/2 to pi (and determine if it is convergent or divergent).I know how to find the
    1. answers icon 2 answers
    2. Sam asked by Sam
    3. views icon 835 views
  6. a) Let f(z) = z^2 and γ(t) = 1 + it^3, t ∈ [0,1].i) Write out the contour integral ∫γ f(z)dz as an integral with respect
    1. answers icon 2 answers
    2. jack asked by jack
    3. views icon 1,001 views
  7. Set up, but do not evaluate, the integral which gives the volume when the region bounded by the curves y = Ln(x), y = 1, and x =
    1. answers icon 1 answer
    2. Kait asked by Kait
    3. views icon 1,141 views
  8. Use Green's Theorem to evaluate the line integral along the given positively oriented curve.integral of xy2 dx + 4x2y dy C is
    1. answers icon 2 answers
    2. sara asked by sara
    3. views icon 4,434 views
  9. Perform long division on the integrand, write the proper fraction as a sum of partial fractions, and evaluate the integral:(inte
    1. answers icon 1 answer
    2. Jenna asked by Jenna
    3. views icon 1,073 views
  10. Evaluate the line integral, where C is the given curve.(Integral)C z dx + x dy + y dz, C: x = t^4, y = t^5, z = t^4, 0 ≤ t ≤
    1. answers icon 1 answer
    2. Taylor asked by Taylor
    3. views icon 615 views