SonoWorld.com uses cookies to improve your experience on the site. Your continued use of the site constitutes your acceptance of use of cookies on this site.
Find out more about how SonoWorld uses cookies. I’m OK with Cookies from SonoWorld - stop showing me this banner.
×
 
177,644 Registered Members as of 11/22/2019.
Jonathan M. Rubin, MD, PhD
3D Flow Imaging
Jonathan M. Rubin, MD, PhD
01/25/2010 | Time : 34 min
About This Lecture:

Topics mentioned in this video : Outline, Volume flow, True blood volume flow, True blood volume flow example, Volume flow formula, Volume flow, Methods C-plane –Torus surface, Flow phantom examples, Arc reconstruction, Torus surface, Results – varying flow, Pulsatile inputs – phantom, Pulsatile flow – phantom, Law of large numbers, Pulsatile flow – phantom, Results – varying Doppler angle, Femoral artery – dog, Flow in dog femorals and carotids, Conclusions Splitting the aperture for 2D flow, Spinning disk in 2D, 3D power Doppler, Splitting aperture of 2D array, Pressure gradients, Pressure gradient formula, Stenosis, Pressure gradients

To view this lecture video, Login or register for a free membership below ↓
Already a Member? Login
 
 
Forgot username or password?
Register for Your FREE Membership Now!
Sign Up In Less Than One Minute
  • UNLOCK access to SonoWorld lectures, articles, cases, and more
  • Full Access Membership is FREE
  • You will have IMMEDIATE access on submitting the Membership form
  • JOIN the world's largest community of ultrasound professionals

* *
* *
* *
*
*
*
Review the SonoWorld Privacy Policy here.
Weekly Update Newsletter :
New Products and Services :
        Terms & Conditions         Privacy Policy

Keywords : 3D flow imaging, 4D flow imaging, cavitation, c-plane, Doppler angle, flow phantom, flow velocity, four-dimensional flow imaging, mechanical transducer, Navier-Stokes equation, power Doppler, pressure drop, pressure gradients, relative curve, tardus parvus waveform, three-dimensional flow imaging, torus surface, volume flow, voxel, x plane, y plane, Z plane

IE Browser Compatibility Close