Best wis podcasts we could find (Updated October 2017)
Related podcasts: Education Education Tech Business Guanine Cytosine Thymine Adenine Pairs Recensioni Approfondimenti Approfondimento Ninjerello Wisky Cryu K-12 Base Intermediate Indepth Action Dna  
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WIS 7th Grade Life Science
Daily+
 
Another excellent Edublogs.org weblog
 
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WISKAST: il podcast per videogiocatori gourmet
 
Caro videogiocatore, da oggi esiste un'alternativa alla tua malsana dieta audio. WISKAST soddisfera' il tuo appetito di informazione competente e umorismo croccante con un unico, goloso podcast, che fara' di te un nerd piu' in forma e dal pelo piu' lucido!
 
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Economic Update with Richard Wolff
 
Democracy at Work (d@w) is a non-profit (501C3) organization that conceives, creates, and distributes media aimed at demonstrating why, and how, democratizing the workplace is a viable solution for a new and better economic system.
 
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Kim Harron's Podcast
Daily+
 
 
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Washington International School Podcast
 
Podcast created by WIS students.
 
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Save your Retirement with Pat Strubbe
 
Patrick A. Strubbe, ChFC, CLU, RFC is the founder and owner of Preservation Specialists, LLC. He has been helping clients with their financial futures since 1997. Pat has been featured as a retirement expert in USA Today and on WIS-NBC TV with Dawndy Mercer Plank. He’s also been featured in Investors Business Daily.Pat is also the author of the Amazon.com best-selling book, “Save Your Retirement!” Featuring seven nasty villains, Pat’s down-to-earth humor and expertise shines through his Supe ...
 
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Central Church K-W Audio Messages
 
Central Church K-W is a Christian Church in Waterloo, ON, our Podcast is a collection of our weekly messages and any additional events.
 
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show series
 
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Air Mail From Dip
 
Tues. 6:00 P.M. 10/7/41 Hello Mom & Dad: It’s your buck private soldier son again. Everythings fine with me down here & I’m counting the days ‘till the 18th. It surely isn’t far away is it – just a week & about 4 days. Seems like a year since I’ve been home. ‘Tis going to be a real treat to be back in good ol’ Mpls. again. I miss those days whe ...…
 
Hello and welcome to the Bayfield County Wild podcast. This show features the year-round splendor of natural beauty and culture that Bayfield County, Wisconsin, has to offer. In this episode, host Nancy Christopher will talk with Mary Motiff, Bayfield County’s Director of Tourism, and Jeff Hamilton, of White Winter Winery, to learn about the ma ...…
 
FLASH DRIVES FLY TO NORTH KOREA A North Korean defector used 350 helium balloons to send 1,000 flash drives loaded with portions of the Bible across the border into North Korea from the South Korean side, according to a report in The Christian Post. The flash drives were donated by college and high school students in the United States. ARCHBISH ...…
 
Midknight Robin and Kerry Adderly discuss the NBA acro dunking pre-season training, American Ninja Warrior, and the USA Gymnastics men’s senior national team. 2017 Artistic World Gymnastics Championships is October 3rd-8th. They also talk about the American men best chances to win medals. U.S. World Championships Team Members The six members of ...…
 
Proof use Stokes theorem, integral of omega in terms of residue and the fact that if w is holomorphic then dw is 0
 
X: F= x^d + y^d + z^dLet pi: X to P^1 be projection to [x:y]. Apply Hurwitz formula.Deg pi is size of general fiber is d.Ramification points correspond to [x, y, z] such that x^d + y^d = 0, I.e. P= [1, w,0] where w is a d-th root of -1. Notice that the fiber over f(w) contains a single point w with multiplicity d. Thus there are d ramification ...…
 
F: X to Y.Take charts centered at p and F(p). Suppose Taylor series for F wrt these charts start with term of power m. Then F = w^m S(w) for some holomorphic S s.t. S(w) is not 0. By inverse function theorem applying to z maps to z^m, we can define m-th root on a very small neighborhood around S(w), I.e. On a nghood of S(w) we have holomorphic ...…
 
If w is a form on R2 invariant under translation by every element of the lattice (of the Torus) then define a form t on the Torus byt_p(v_i) = w_q(x_i), where pi(q) is p and x_i are pushforward of the v_i under differential of pi (isom so uniquely defined).To check well-defined, suppose q' = q + a for a in lattice, and suppose y_i are the corre ...…
 
A differential form on R^2 is invariant under translation by a by its pullback under left translation by a is itself. Note that pullback of any w under F is w_F(F_*....), I.e. F^*w_q(X_i) = w_{Fq}(F_*X_i)Suppose w is pi^* t for some for some form t on Torus. Then as pi . l_a = pi for all a in the lattice, by functoriality of pullback we havel_a ...…
 
If w is an orientation form on M ad X is an outward pointing vector field along boundary of M then the contraction of w with X is an orientation form on boundary of M. To check nowhere vanishing, suppose it vanishes at p. Then it is easy to see that so does w.
 
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Decoding Millennials Podcast
 
My guest is Eleazar Lopez. He is a Regional Manager and Financial Advisor at Catholic Financial Life. We talk about: *If term or permanent life insurance makes more sense *How to save for your child/ren education. *And much more!!! 15-0096-8/17 Headquartered in Milwaukee, Wis. Products and services not available in all states. Headquartered in ...…
 
We’re digging in with Kriss Marion of Circle M Farm in Blanchardville, Wis. as she inspires all of us to take the time to get involved with issues we care about. From running for and winning a seat on County Board to serving as her Wisconsin Farmers Union chapter president, Kriss shares how being a woman from outside the conventional agricultur ...…
 
If n is orientable then let Xi be an orientation. Locally on each U_a, we can find coordinate r_a^i such that dr_1 wedge ... dr_n (X1, ..., Xn) is positive, by previous lemma. Let w_a = dr_1 wedge ... wedge dr_n.Using partition of unity, we glue together w_a to get a nowhere vanishing smooth n-form w on M.Conversely suppose w is a nowhere vanis ...…
 
Before, we show that w= -ydx + x dy is a nowhere vanishing 1-form on S1 by showing that w(X) = 1 on S1 where X is -y d/dx + x d/dy. Now we construct another w by taking Exterior Derivative of X^2 + y^2 = 1 to get 2 x dx + 2y dy = 0. So on U_x cap U_y, the forms dy/x and -dx/y agree. Thus we can glue them to get w.To check that w is smooth and n ...…
 
F:N to M, w is a form on NOnly need to check that locally.Around p and F(p) pick coordinate charts. Then write w in coordinate y. From that compute pullback of w in coordinate x. Since the coordinate of the pullback are smooth functions, the pullback is smooth.
 
E.g. If f:R to R and g:R to R agree on an open set U, then so do their derivatives.An operator on a vector space is an endomorphism. An operator D on differential forms of M is local if whenever w1= w2 on U then Dw1 = Dw2 on U. E.g. Integration is not a local operator on smooth functions on [a,b].Antiderivation and derivation on diff forms are ...…
 
w is left-invariant if it's pullback under left multiplication by g is itself, I.e the pullback of the k-covector w_gx is w_x.Thus w_g = pullback of w_e under left multiplication by g^{-1}, is completely determined by w_eEvery left invariant k-form is smooth. To check that, it suffices to show that w(X1,..,Xn) is smooth for smooth vector fields ...…
 
If L: V to W is linear then it induces a pullback map on k-covector A_k(W) to A_k(V) sending every k covector O to the k covector O ( L, .., L)If F:N to M is a manifold map then at every p we have a differential F_*, p which is a linear map on vector spaces. It then induces a pullback map on k-covectors. Pullback is R-linear and preserves wedge ...…
 
A k-form is called smooth if it is smooth as a section of the k-th exterior power of the cotangent bundle.Smoothness of k-form can be characterized by local coefficients.W is a smooth k-form iff for all smooth vector fields X1,...,Xk, w(X1, ..., Xk) is smooth.We can extend smooth w form on a nghood U of p to a smooth form on M agreeing with w o ...…
 
Let X= (-y, x) be the velocity vector field of the unit circle (I.e. At every p, The push forward of X under inclusion is (-y, x)). Find w = adx + b dy such that w(X) = 1. (I.e w is the restriction of a dx + b dy to circle)
 
If i: S to M is inclusion then it's differential is injective so we can identify each TpS as a subspace of TpM. If w is a 1 form on M then at each p in S, can define w|_S at p as restriction of w to TpS.It turns out that w|_S is just the pullback of w under i
 
A one form w is defined to be smooth if it is smooth as a section of the cotangent bundle. Locally on a coordinate patch, w is smooth if it's coordinates are smooth. Globally, it is smooth if there is an atlas on all of whose patches, w has smooth coordinates. This is equivalent to saying w has smooth coordinates wrt any chart.W is smooth iff f ...…
 
Today's show features an in-depth interview with Kirstin Beswick and Ben Knight of NorthPod Law UK, often referred to (by us) as the "Opening Arguments of England." Join all four of us as we discuss media, politics, Brexit, and maybe -- just maybe -- reasons for optimism about the future of politics. Due to the length of the interview, we don't ...…
 
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The Adventuring Party
 
This week, Liam, Ian, Eoin and Sean discus Gamesmanship, what are you willing to do to win. We had show notes, but the dog ate them.They are being redone as we speak and will be up as soon as possible :)
 
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The Adventuring Party
 
This week, Liam, Ian, Eoin and Sean discus Gamesmanship, what are you willing to do to win. We had show notes, but the dog ate them.They are being redone as we speak and will be up as soon as possible :)By shane@theadventuringparty.net (The Adventuring Party).
 
Is the Bible good for women? If you’ve read the Bible, you’ve likely encountered some strange and confusing passages. The accounts tell us of terrible atrocities and injustices, often with little commentary condemning the behaviors our hearts and minds rail against. And many times, women are the ones suffering the fall out. All this raises conc ...…
 
THIS EPISODE: The infamous Jonnie W. Lots of comedy talk that's interesting to us and probably pretty dull for Pkarlgh but that's what happens when we don't operate with a script, or goals or even common sense. It's a phone call so Jonnie sounds very much like a Cylon (which isn't a bad thing, really.) It all started with 8 minutes of hell. And ...…
 
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The Art Of Adventure | World Travel | Digital Nomads | Lifestyle Design | Entrepreneurship | Adventure Sports | Human Performance
 
“Just write your book, put it out there, and let nature take its course.” – Guy Vincent Today’s guest on the Art of Adventure podcast is someone who left everything at home – his job, his friends and his girlfriend to embark on a quest to find what makes his life more meaningful and complete. Luckily, he was able to find everything he was looki ...…
 
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