D E G R E E
D = rad2deg(pi) · D = 180 ; 구면 거리 · 지구의 평균 반지름과 지구 곡면을 따라 뮌헨에서 방갈로르까지 측정된 거리를 지정합니다(단위: km). 뮌헨과 방갈로르 간 구면 거리를 도 단위로 계산합니다. dist = 7194; radEarth = 6371; R = dist/radEarth; D = rad2deg(R) · D = 64.6972
Kaprekar Born D.R. Kaprekar 17 January 1905 Dahanu , Bombay Presidency , India Died 1986... [3] He attended the University of Mumbai, receiving his bachelor's degree in 1929. Having never...
D = 64.7; radEarth = 6371; R = deg2rad(D); dist = radEarth*R · dist = 7.1943e+03
Richard Haburcak Title: Maximal Brill-Noether loci via K3 Surfaces Abstract: The Brill-Noether (BN) loci $\mathcal{M}^r_{g,d}$ parameterize BN special curves of genus g admitting a line bundle of d...
I was wondering that: Suppose that $\{P_n\}$ is a sequence of polynomials with degree $\le p$ such that for every test function $\varphi\in C^\infty_c(\mathbb{R}^d)$, the sequence of integrals $\le...
Show that if $ R $ is an integral domain then a polynomial in $ R[X] $ of degree $ d $ can have at most $ d $ roots. Thoughts so far: I feel like I might be missing something here. If $ R $ is an
Let $f(x) \in \mathbb Q[x]$ and $$f(x)= x^3 + px +q=(x-r_1)(x-r_2)(x-r_3),$$ and $r_1, r_2,r_3\in K$ for the splitting field $K$ of $f(x)$. Let the $D = (r_3 - r_1)^2(r_2- r_1)^2(r_3 - r_2)^2$, wh...
I am trying to prove that if a function $f : \mathbb{R} \to \mathbb{R}$ can be approximated arbitrarily well by polynomials of bounded degree, then $f$ itself must be a polynomial. For starters, l...
Let $f$ be a nonconstant polynomial of degree $k$ and let $g:\mathbb R\to \mathbb R$ be a bounded continuous function. Which of the following statements is or are necessarily true? $a).$ There always