Examples of using Is an integer in English and their translations into Croatian
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Computer
So because is an integer.
The real numbers belong to the interval and satisfy,where is an integer and.
Stvarni Iithe area is an integer number;
Find all values of for which is an integer.
Pronađite sve vrijednosti za koji je cijeli broj.Dimension is an integer specifying the dimension of the unit matrix that you want to return.
Dimenzija je cijeli broj koji određuje dimenziju jedinične matrice koju želite vratiti.We know that is an integer.
Tražiti. Rješenje Mi znamo da je cijeli broj.If is an integer that is as large as possible, what is the value of?
Ako je cijeli broj koji Determine all such that is an integer.
Utvrditi sve takav da je cijeli broj.We know that is an integer because if we multiply out, then is the lead coefficient, so it must be an integer. .
Znamo da je cijeli broj, jer ako mi množite se, Zatim Whenever are real numbers such that is an integer, there exists some such that.
Kad god pravi Now, if is an integer such that, then, while(this is just because f(x)is a polynomial with integer coefficients), so that, and since, this yields.
Sada, ako je cijeli broj takav da, Zatim, Dok(ovo Zero or zero,as it is sometimes called, is an integer that separates negative and positive numbers.
Zero ili nula, kao štose ponekad zove, je cijeli broj koji odvaja negativne i pozitivne Let, in lowest terms,be the probability that a randomly chosen positive divisor of is an integer multiple of.
Dopustiti, U najmanjim uvjetima, Now, except for a part with area(the intersection of the given polygon with the lines with equation of, where is an integer), the area of the given polygon is the sum of the areas of the polygons, where the sum is over all the unit squares.
Sada, osim za dio područja s(presjek upisanog poligona s linije s jednadžba od, Gdje je cijeli broj), područje upisanog poligona Let f be a rational function(i.e. the quotient of two real polynomials)and suppose that is an integer for infinitely many integers n.
Let f Since their number should be an integer, rounded to the nearest value.
Let be an integer such that.
Dopustiti biti cijeli broj takav da.Let be an integer and let such that.
Dopustiti biti cijeli broj i neka tako da.Any mirror must be an integer, without cracks and chips.
Let be an integer and be real numbers such that Prove that.
Dopustiti biti cijeli broj i Let be an integer and the permutation group.
Dopustiti biti cijeli broj i s permutacijom grupe.Must be an integer greater than or equal to 0.
Mora biti cijeli broj veći od ili jednak 0.This property can be an integer value from 1 to 255.
To svojstvo može biti cijeli broj od 1 do 255.Must be an integer larger than, so we want the smallest value of such that.
Mora biti cijeli broj veći od, Tako da hochemo najmanja vrijednost tako da.Must be an integer greater than or equal to 0 and less than 2^53.
Mora biti cijeli broj veći od ili jednak 0 i manji od 2^53.Let be an integer, and let be real numbers. Prove the inequality.
Dopustiti biti cijeli broj, i neka (b) Let be an integer.
(b) Neka biti cijeli broj.All power must be an integer, with no exposed wires and poor quality of their connections;
Sva moć mora biti cijeli broj, bez izloženih žica i loše kvalitete svojih veza;Let be an integer and let be a set of positive integers such that in any subset of with elements there exist two elements such that.
Dopustiti biti cijeli broj i neka Must be an integer greater than or equal to 2 and less than or equal to 36.
Mora biti cijeli broj veći od ili jednak 2 i manji od ili jednak 36.
