Examples of using Any positive integer in English and their translations into Slovenian
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Is divisible by for any positive integer. 3.
Je deljivo s za kakršno koli pozitivno celo število. 3.A Given any positive integer, show that there exist distint positive integers and such that divides for;
A Glede na vse pozitivno celo, Kažejo, da obstaja pozitivna cela števila distint in tako, da deli za;(ii) Prove that does not divide for any positive integer.
(ii) Dokaži, da ne razdeli za kakršno koli pozitivno celo število.Show that for any positive integer number we have. 1.
Pokaži, da za vsako pozitivno celo številko imamo. 1.Let be positive integers such that for any positive integer we have.
Prove that for any positive integer there exists such that.
Dokaži, da za vsako pozitivno celo število obstaja tako, da.The question(in each of the following cases)is if there exists a subset in the partition such that any positive integer has a multiple in this subset.
Vprašanje(v Show that for any positive integers and, cannot be a power of. 3.
Pokažite, da pri vseh pozitivnih celih števil in, ne more biti moč. 3.There are given two arithmetical progressions and, such that for any positive integer, and have the same set of exponents.
Obstajata dva dana aritmetično progressions in, Tako da za vsako pozitivno celo število, in imajo enak niz eksponenti.Show that for any positive integer we can find such that is a multiple of.
Pokaži, da za vsako pozitivno celo število najdemo tako, da je mnogokratnik.Prove that among the elements of the sequence one can find a geometric progression having any number of terms, and having the ratio bigger than,where can be any positive integer.
Dokaži, da med elementi zaporedja lahko najdete geometrično napredovanje, ki imajo katero Prove that there doesn't exist any positive integer such that and are perfect squares.
S 1 Dokaži, da ne obstaja pozitivno celo tako, da in so odlični kvadratov.For any positive integer, let be the sum of the digits of, and let be For example, How many values do not exceed 1999 6.
Za vsako pozitivno celo število Naj je vsota števk, In naj biti Na primer, Koliko vrednosti ne presegajo 1999 6.A positive integer has the property that for any positive integer which is co-prime with, we have.
For any positive integer, let denote the number of ordered pairs of positive integers for which.
Za vsako pozitivno celo število Naj označuje Consider the sequence defined recursively by(any positive integer), and For which of the following values of must?
Razmislite določeno zaporedje z rekurzivno(vsako pozitivno celo število), in Za katere izmed naslednjih vrednosti morati?For any positive integer, let denote the number of its positive divisors(including 1 and itself).
Za vsako pozitivno celo število Naj označuje Lagrange's four-square theorem[?] states that any positive integer can be written as the sum of at most 4 perfect squares.
Lagrangeev izrek štirih kvadratov pravi, da lahko vsako pozitivno celo število zapišemo kot vsoto največ 4 popolnih kvadratov.For any positive integer, let be the number of elements in the set whose base 2 representation contains exactly three 1s.
Za vsako pozitivno celo število Naj je A sequence is defined by Prove that for any positive integer we have(where[x] denotes the smallest integer x).
Zaporedje je opredeljena z Dokaži, da za vsako pozitivno celo število imamo(kjer je[x] označuje najmanjše For any positive integer, prove that there exists an-th degree polynomial with integer coefficients such that the numbers,,,….
Za vsako pozitivno celo število Dokazujejo, da obstaja th-degree polynomial s koeficienti No matter how the 1st circle tangent to the circle internally and to the circle externally is chosen, an infinite chain of tangent circles with the base circles always exists andwe can choose a finite chain for any positive integer n.
Rešitev Ne glede na to, kako 1. krog se dotika kroga notranje in krog zunaj je izbrana, neskončno verigo tangento krogov z osnovno krogi Vedno obstaja in dalahko končno izberete verige za kakršno koli pozitivno celo število n.Let and for j Prove that for any positive integer n the roots of the equation are all real and distinct.
Pustiti in za j Dokaži, da za vsako pozitivno celo število n korenine enačbe so vse resnične in različni.Any positive integer obtained by removing several(at least one) digits from the right-hand end of the decimal representation of is called a stump of.
Vsako pozitivno celo število, pridobljen z odstranjevanjem več(vsaj enega) številk, od konca desni strani decimalne zastopanostiof se imenuje štrcelj.(a) Prove that for any positive integer, there exists at least one positive integer such that.
(a) Dokaži, da za vsako pozitivno celo število, Obstaja vsaj eno S 6 Given any positive integer, show that there are two positive rational numbers and,, which are not integers and which are such that are all integers. .
Glede na to, katero koli pozitivno celo, Kažejo, da obstajata dve pozitivni racionalni števili in,, Ki niso cela števila, in ki so takšni, da so cela števila.Show that for any positive integer, there exists a positive integer so that in the decimal representations of the numbers and, the representation of ends in the representation of.
Pokaži, da za vsako pozitivno celo število, Obstaja (a) For any, is a positive integer.
Knowing, chooses any integer such that is a prime raised to a positive integer power.
Vedeli, izbere vsako celo število tako, da je glavni dvigne na pozitivno celo število moči.
