Translation examples
Q {\displaystyle Q\,} satelliitin kulutusfunktio (yleensä vaikeast
Q {\displaystyle Q\,} is the dissipation function of the satellite.
Me kaikki tiedämme, pokeri on ovat four queens, pata Q, sydämet Q, Q luumu...
As we all know, a poker there are four queens, spades Q, hearts Q, Plum Q,...
-Q Terveyteen joka kerta kun työskentelet (Q = yrityksen laatutaso)
Working: -Q points of wellness (Q = Company quality)
Q Kaukosäädin on kätevä apuväline Q Paneelin käyttöön.
Q Remote is a useful accessory for the Q Panel.
O zi jota kukaan suosittelen q = q paineet ovat laittaa kaiken Ok kiitos q
O zi which no one I recommend is q = q of pressures have put everything Ok thank q
Kukin näistä kahdesta polygons Q ja Q 'on vertices.
Each of these two polygons Q and Q' has vertices.
Vastaoletus q ′ ≠ q {\displaystyle q'\neq q} on väärä, joten q ′ = q {\displaystyle q'=q\ } .
If q {\displaystyle q} and q ′ {\displaystyle q'} are incompatible set τ ( E i ) q , q ′ = 0 {\displaystyle \tau (E_{i})_{q,q'}=0} .
Tehdään vastaoletus: q ′ ≠ q {\displaystyle q'\neq q} .
Let N = p q {\displaystyle \ N=pq} with q < p < 2 q {\displaystyle \ q<p<2q} .
Kaiken kaikkiaan matematiikassa ja insinööritieteissä käytettyjä merkintöjä käyttäen pätevät seuraavat tulokset: p ⊕ q = ( p ∧ ¬ q ) ∨ ( ¬ p ∧ q ) = p q ¯ + p ¯ q = ( p ∨ q ) ∧ ( ¬ p ∨ ¬ q ) = ( p + q ) ( p ¯ + q ¯ ) = ( p ∨ q ) ∧ ¬ ( p ∧ q ) = ( p + q ) ( p q ¯ ) {\displaystyle {\begin{matrix}p\oplus q&=&(p\land \lnot q)&\lor &(\lnot p\land q)&=&p{\overline {q}}+{\overline {p}}q\\\\&=&(p\lor q)&\land &(\lnot p\lor \lnot q)&=&(p+q)({\overline {p}}+{\overline {q}})\\\\&=&(p\lor q)&\land &\lnot (p\land q)&=&(p+q)({\overline {pq}})\end{matrix}}} Propositiologiikassa lauseet muodostavat eräänlaisen algebrallisen struktuurin, jossa laskutoimituksina toimivat esimerkiksi ∧ {\displaystyle \wedge } (konjunktio) ja ∨ {\displaystyle \lor } .
In summary, we have, in mathematical and in engineering notation: p ⊕ q = ( p ∧ ¬ q ) ∨ ( ¬ p ∧ q ) = p q ¯ + p ¯ q = ( p ∨ q ) ∧ ( ¬ p ∨ ¬ q ) = ( p + q ) ( p ¯ + q ¯ ) = ( p ∨ q ) ∧ ¬ ( p ∧ q ) = ( p + q ) ( p q ¯ ) {\displaystyle {\begin{matrix}p\oplus q&=&(p\land \lnot q)&\lor &(\lnot p\land q)&=&p{\overline {q}}+{\overline {p}}q\\&=&(p\lor q)&\land &(\lnot p\lor \lnot q)&=&(p+q)({\overline {p}}+{\overline {q}})\\&=&(p\lor q)&\land &\lnot (p\land q)&=&(p+q)({\overline {pq}})\end{matrix}}} Although the operators ∧ {\displaystyle \wedge } (conjunction) and ∨ {\displaystyle \lor } (disjunction) are very useful in logic systems, they fail a more generalizable structure in the following way: The systems ( { T , F } , ∧ ) {\displaystyle (\{T,F\},\wedge )} and ( { T , F } , ∨ ) {\displaystyle (\{T,F\},\lor )} are monoids, but neither is a group.
Ortogonaalinen matriisi on reaalikertoiminen matriisi jonka transpoosi on sen käänteismatriisi eli Q T Q = Q Q T = I {\displaystyle Q^{T}Q=QQ^{T}=I\,} .
An orthogonal matrix is a square matrix whose columns and rows are orthogonal unit vectors (i.e., orthonormal vectors), i.e. Q T Q = Q Q T = I , {\displaystyle Q^{\mathrm {T} }Q=QQ^{\mathrm {T} }=I,} where I {\displaystyle I} is the identity matrix.
Monopoli päättää tuotannon q {\displaystyle q} määrän.
The regeneration increases the Q {\displaystyle Q} .
Se määritellään Γ ( z ; p , q ) = ∏ m = 0 ∞ ∏ n = 0 ∞ 1 − p m + 1 q n + 1 / z 1 − p m q n z . {\displaystyle \Gamma (z;p,q)=\prod _{m=0}^{\infty }\prod _{n=0}^{\infty }{\frac {1-p^{m+1}q^{n+1}/z}{1-p^{m}q^{n}z}}.} Sille pätevät seuraavat identiteetit: Γ ( z ; p , q ) = 1 Γ ( p q / z ; p , q ) {\displaystyle \Gamma (z;p,q)={\frac {1}{\Gamma (pq/z;p,q)}}\,} Γ ( p z ; p , q ) = θ ( z ; q ) Γ ( z ; p , q ) {\displaystyle \Gamma (pz;p,q)=\theta (z;q)\Gamma (z;p,q)\,} Γ ( q z ; p , q ) = θ ( z ; p ) Γ ( z ; p , q ) {\displaystyle \Gamma (qz;p,q)=\theta (z;p)\Gamma (z;p,q)\,} missä θ on q-theetafunktion.
It is given by Γ ( z ; p , q ) = ∏ m = 0 ∞ ∏ n = 0 ∞ 1 − p m + 1 q n + 1 / z 1 − p m q n z . {\displaystyle \Gamma (z;p,q)=\prod _{m=0}^{\infty }\prod _{n=0}^{\infty }{\frac {1-p^{m+1}q^{n+1}/z}{1-p^{m}q^{n}z}}.} It obeys several identities: Γ ( z ; p , q ) = 1 Γ ( p q / z ; p , q ) {\displaystyle \Gamma (z;p,q)={\frac {1}{\Gamma (pq/z;p,q)}}\,} Γ ( p z ; p , q ) = θ ( z ; q ) Γ ( z ; p , q ) {\displaystyle \Gamma (pz;p,q)=\theta (z;q)\Gamma (z;p,q)\,} and Γ ( q z ; p , q ) = θ ( z ; p ) Γ ( z ; p , q ) {\displaystyle \Gamma (qz;p,q)=\theta (z;p)\Gamma (z;p,q)\,} where θ is the q-theta function.
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