Примери коришћења Equation has на Енглеском и њихови преводи на Српски
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Colloquial
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Ecclesiastic
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Computer
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Latin
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Cyrillic
This equation has four factors.
The discriminant is 0, so the equation has a double root.
The equation has solution of the form.
If b2 4ac> 0, the equation has two real roots.
The equation has two complex solutions.
The function should determine whether or not the equation has real roots.
Thus, the equation has two solutions.
Since the discriminant is positive, the equation has two solutions.
Which equation has the greatest solution?
The discriminant is negative, so the equation has two non-real solutions.
The equation has two real solutions.
While there he proved that every algebraic equation has at least one solution.
Thus the equation has two pair of solutions, and.
The discriminant Δ is negative and therefore the equation has two complex solutions.
This equation has 4 factors, a little bit of multiplication.
The discriminant is positive, so the equation has two distinct real solutions.
This equation has four factors, a little bit of multiplication.
The discriminant is negative and therefore the equation has two complex solutions.
If b2- 4ac= 0, the equation has one real solution, a double root.
While there he submitted a proof that every algebraic equation has at least one root or solution.
If b2- 4ac< 0, the equation has only non-real solutions.
Since the discriminant is positive, the equation has two distinct real number solutions.
B2- 4ac> 0: The equation has two distinct real roots.
If b2- 4ac=0, the equation has only one root.
If b2- 4ac> 0, the equation has two separate real solutions.
In 1812, he published a paper purporting to show that every equation has an algebraic solution, directly contradicting results which had been recently published by Paolo Ruffini; Ruffini turned out to be correct.
Polynomial equations have the form P(X)= 0, where P is a polynomial.
Linear equations have the form ax+ b= 0, where a and b are parameters.
Differen- tial equations have a prominent role in modelling virtually each physical, technical and/or biological processes, from celestial motion, to bridge design, to interactions between neurons.
The conjecture is that there is a simple way to tell whether such equations have a finite or infinite number of rational solutions.