Examples of Stokely Carmichael in the following topics:
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- One of the most famous users of the term was Stokely Carmichael, the chairman of the Student Nonviolent Coordinating Committee (SNCC), who later changed his name to Kwame Ture.
- In keeping with this philosophy, Carmichael expelled SNCC’s white members.
- Long before Carmichael began to call for separatism, the Nation of Islam, founded in 1930, had advocated the same thing.
- Stokely Carmichael later recalled that Malcolm X had provided an intellectual basis for Black Nationalism and given legitimacy to the use of violence in achieving the goals of Black Power.
- When King was murdered in 1968, Stokely Carmichael stated that whites murdered the one person who would prevent rampant rioting, and that blacks would burn every major city to the ground.
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- In Mississippi, Stokely Carmichael, one of SNCC's leaders, declared, "I'm not going to beg the white man for anything that I deserve, I'm going to take it.
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- She worked alongside some of the most famous civil rights leaders and mentored many emerging activists of the time, such as Diane Nash, Stokely Carmichael, Rosa Parks, and Bob Moses.
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- Stokes' theorem relates the integral of the curl of a vector field over a surface to the line integral of the field around the boundary.
- The Kelvin–Stokes theorem, also known as the curl theorem, is a theorem in vector calculus on $R^3$.
- The Kelvin–Stokes theorem is a special case of the "generalized Stokes' theorem."
- Applying the Kelvin-Stokes theorem and substituting in $\oint_{\Gamma} \mathbf{F}\, d\Gamma = \iint_{S} \nabla\times\mathbf{F}\, dS$, we get:
- An illustration of the Kelvin–Stokes theorem, with surface $\Sigma$, its boundary $\partial$, and the "normal" vector $\mathbf{n}$.
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- This result shows that the Stoke's parameters live on a sphere of radius $r\leq s_0$ where the extent of polarization $\Pi=r/s_0$.
- which relates Stoke's parameters to the orientation and shape of the polarization ellipse.
- An interesting and useful relationship is that the Stokes parameters are additive for waves whose phases are not correlated.
- Let's take two waves of frequencies $\omega_a$ and $\omega_b$ and calculate the value of the first Stokes parameter as an example.
- When we measure the Stokes parameters in practice we measure for example
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- The four Stokes parameters satisfy the following relationship for a truly monochromatic wave
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- Surfaces that occur in two of the main theorems of vector calculus, Stokes' theorem and the divergence theorem, are frequently given in a parametric form.
- An illustration of the Kelvin–Stokes theorem, with surface $\Sigma$, its boundary $\partial$, and the "normal" vector $\mathbf{n}$.
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- The theorems we learned are gradient theorem, Stokes' theorem, divergence theorem, and Green's theorem.
- In a more advanced study of multivariable calculus, it is seen that these four theorems are specific incarnations of a more general theorem, the generalized Stokes' theorem, which applies to the integration of differential forms over manifolds.
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- Green's theorem is a special case of the Kelvin–Stokes theorem, when applied to a region in the $xy$-plane.
- Explain the relationship between the Green's theorem, the Kelvin–Stokes theorem, and the divergence theorem
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- An illustration of the Kelvin–Stokes theorem, with surface $\Sigma$, its boundary $\partial$, and the "normal" vector $n$.