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suitably

suitably, adv. (ˈs(j)uːtəblɪ) Also 6 sutetably, 7 sutably. [f. suitable a. + -ly.] † 1. Chiefly const. to: In agreement, conformity, or correspondence; agreeably, correspondingly, according. Obs.1577 Stanyhurst Descr. Irel. 1/2 in Holinshed, My course pack threede coulde not haue beene sutetably kni... Oxford English Dictionary

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suitably for an occasion Crossword Clue | Wordplays.com

The Crossword Solver found 30 answers to "suitably for an occasion", 3 letters crossword clue. The Crossword Solver finds answers to classic crosswords and cryptic crossword puzzles. Enter the length or pattern for better results. Click the answer to find similar crossword clues . Enter a Crossword Clue. Sort by Length. # of Letters or Pattern.

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suitably

suitably/-əblɪ; -əblɪ/ adv: go to a party suitably dressed 穿著得体去参加聚会. 牛津英汉双解词典

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Japan runway incursion measures not shared suitably with ...

2 days ago — Measures to prevent aircraft from making runway incursions may not have been suitably shared with the Japan Coast Guard, whose plane was ...

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Perfect number in gaussian integers We have complete description about irreducibles in the ring Z[i],of gaussian integers. Now I was trying to define suitably the notion of "perfect number" in Z[i]. But the problem is...

Well in the integers you don't mix positive and negative factors. Why not pick the/a sum of factors with the maximum modulus which would be compatible with the usual definition for integers.

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(a) Can $\sin(x+y)/(x+y)$ be made continuous by suitably defining it at (0,0)? (a) Can $\sin(x+y)/(x+y)$ be made continuous by suitably defining it at (0,0)? (b) Can $xy/(x^2 + y^2)$ be made continuous by suitably de...

(a) You forgot to notice that the function is not defined on the line $x=-y$. But your reasoning outside of this subdomain is correct. (b) Is correct (c) You were asked to prove that the function is continuous **everywhere** , not that it it's limit is defined at $(0,0)$

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Surface integral and limit values $x=ar \cos(\theta), y = br\sin(\theta)$ a and b are suitably selected constants. How do I calculate surface integral for this one: $\int\int_D\ln(1+\frac{x^2}{4}+\frac{y^2}{9})dA$ w...

The integral is over a quarter ellipse in the first quadrant. It would be easier to carry out the double integral with the variable changes $$x=2u,\>\>\>y=3v$$ Then, the ellipse becomes a unit circle $$u^2+v^2=1$$ and the integral simplifies to $$I=\int\int_D\ln(1+\frac{x^2}{4}+\frac{y^2}{9})dA=6\in...

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Question about Maximum Modulus Principle applied to $|f|+|g|$ > Let the functions $f$ and $g$ be holomorphic in $U$ and continuous in $\overline{U}$. Show that $|f(z)| + |g(z)|$ attains its maximum on $\\{|z| = 1\\}$....

As Martin R. pointed out, the result follows from a similar problem. It boils down to the following statement. **Proposition**. Assume $f,g$ are holomorphic in a domain $U \subset \mathbb C$, and $|f(z)|+|g(z)|$ achieves maximum at an interior point. Then $f$ and $g$ are constant. Proof. Suppose $|f...

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Is there a simple construction of a finite solvable group with a given derived length? Given some integer $n$, is there an easy way to construct a finite solvable group of derived length $n$? It would seem that given...

A handy example is provided by the group of $n \times n$ upper triangular unipotent matrices. If $n =2^{t-1}+1$, then its derived length is $t$.

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How to define a smooth subvariety as the vanishing of local coordinates I keep stumbling upon this fact, and would like to see or get an idea for the proof: _An ideal of a smooth subvariety at a point of a smooth var...

A variety $X$ is nonsingular at a point $p$ iff the local ring $\mathcal{O}_{X,p}$ is a regular local ring, i.e. there exists a regular system of parameters ($=$ a sequence of elements $x_1, \ldots, x_n \in \mathcal{O}_{X,p}$ such that $(x_1, \ldots, x_n) = \mathfrak{m}_p$ (the maximal ideal) and $n...

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Conditions for convergence and the multivariate central limit theorem Consider $r$ independent but not identically distributed random vectors $x_1,\dots,x_r$, each of dimension $d$. The elements of $x_i$ are integer v...

A sufficient condition, given that $x_i$ are bounded, is that $\frac{1}{n}\sum_{i=1}^n C_i \to C$, where $C_i$ are the covariance matrices. Then $\frac{1}{\sqrt{n}}( \sum x_i - \mu_i)\to N(0,C)$. See eg here.

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$p^{th}$ power harmonic series We know $a_n=\sum_1^n 1/i$ is of o$(n)$ by 'Cesaro sum'. I was wondering whether such a conclusion can be made for $a_n=\sum_1^n \frac{1}{i^p}$ for $p \in (0,1)$ i.e. $a_n=$o($n^q)$ for ...

The function $x^{-p}$ is a positive decreasing function. For such functions, sums at evenly spaced points are well approximated by integrals. More precisely, $$ \int_1^n \frac{1}{x^p}dx < \sum_{i = 1}^n \frac{1}{i^p} < \int_1^n \frac{1}{x^p}dx + 1.$$ The $1$ appearing above is really the first term ...

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Show that the modified Pell equation $x^2 - 7y^2 = -1$ has no solutions in integers $x,y$. Show that the modified Pell equation $x^2 - 7y^2 = -1$ has no solutions in integers $x,y$. (Hint: reduce the equation modulo a...

Add $8y^2+4$ to both sides of the equation getting $x^2+y^2+4 = 8y^2+3$ Now read this equation modulo 4, we get $x^2+y^2\equiv3\pmod 4$. As any square leaves a remainder of 0 or 1 mod 4, adding two of them (the LHS) we cannot get 3 (the RHS).

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Universal continuous function I want to find a continuous function $g\in \mathcal{C}(\mathbb{R})$ such that for any $f\in \mathcal{C}([0,1])$ and $\epsilon>0$ there is a constant $\delta$ such that $$\sup_{[0,1]} |f(x...

The trick is that you space out the intervals on which $g$ is closed to a fixed polynomial $P_n$, then you can just make $g$ linearly interpolate from endpoint to endpoint. For instance, lets say that you have some sequence of polynomials $\\{P_n\\}_{n\in\mathbb Z}$ that is dense in $\mathcal C([0,1...

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Evaluate the limit: $\lim_{x\to 3} \frac{x^{2}+\sqrt{x+6}-12}{x^{2}-9}$ $$\lim_{x\to 3} \frac{x^{2}+\sqrt{x+6}-12}{x^{2}-9} $$ I want to know how to evaluate without using L'Hopital Rule. I'm unable to factorise or s...

$$\frac{x^{2}+\sqrt{x+6}-12}{x^{2}-9} = 1+ \frac{\sqrt{x+6}-3}{(x-3)(x+3)}=1+\frac{1}{(x+3)(\sqrt{x+6}+3)}$$

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suitably

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suitably

suitably for an occasion Crossword Clue | Wordplays.com

suitably

Japan runway incursion measures not shared suitably with ...

Perfect number in gaussian integers We have complete description about irreducibles in the ring Z[i],of gaussian integers. Now I was trying to define suitably the notion of "perfect number" in Z[i]. But the problem is...

(a) Can $\sin(x+y)/(x+y)$ be made continuous by suitably defining it at (0,0)? (a) Can $\sin(x+y)/(x+y)$ be made continuous by suitably defining it at (0,0)? (b) Can $xy/(x^2 + y^2)$ be made continuous by suitably de...

Surface integral and limit values $x=ar \cos(\theta), y = br\sin(\theta)$ a and b are suitably selected constants. How do I calculate surface integral for this one: $\int\int_D\ln(1+\frac{x^2}{4}+\frac{y^2}{9})dA$ w...

Question about Maximum Modulus Principle applied to $|f|+|g|$ > Let the functions $f$ and $g$ be holomorphic in $U$ and continuous in $\overline{U}$. Show that $|f(z)| + |g(z)|$ attains its maximum on $\\{|z| = 1\\}$....

Is there a simple construction of a finite solvable group with a given derived length? Given some integer $n$, is there an easy way to construct a finite solvable group of derived length $n$? It would seem that given...

How to define a smooth subvariety as the vanishing of local coordinates I keep stumbling upon this fact, and would like to see or get an idea for the proof: _An ideal of a smooth subvariety at a point of a smooth var...

Conditions for convergence and the multivariate central limit theorem Consider $r$ independent but not identically distributed random vectors $x_1,\dots,x_r$, each of dimension $d$. The elements of $x_i$ are integer v...

$p^{th}$ power harmonic series We know $a_n=\sum_1^n 1/i$ is of o$(n)$ by 'Cesaro sum'. I was wondering whether such a conclusion can be made for $a_n=\sum_1^n \frac{1}{i^p}$ for $p \in (0,1)$ i.e. $a_n=$o($n^q)$ for ...

Show that the modified Pell equation $x^2 - 7y^2 = -1$ has no solutions in integers $x,y$. Show that the modified Pell equation $x^2 - 7y^2 = -1$ has no solutions in integers $x,y$. (Hint: reduce the equation modulo a...

Universal continuous function I want to find a continuous function $g\in \mathcal{C}(\mathbb{R})$ such that for any $f\in \mathcal{C}([0,1])$ and $\epsilon>0$ there is a constant $\delta$ such that $$\sup_{[0,1]} |f(x...

Evaluate the limit: $\lim_{x\to 3} \frac{x^{2}+\sqrt{x+6}-12}{x^{2}-9}$ $$\lim_{x\to 3} \frac{x^{2}+\sqrt{x+6}-12}{x^{2}-9} $$ I want to know how to evaluate without using L'Hopital Rule. I'm unable to factorise or s...