**1.** The** Discriminant** can be positive, zero, or negative, and this determines how many solutions there are to the given quadratic equation

Discriminant, Determines

**2.** A positive** Discriminant** indicates that the quadratic has two distinct real number solutions

Discriminant, Distinct

**3.** A** Discriminant** of zero indicates that the …

Discriminant

**4.** ** Discriminant**, in mathematics, a parameter of an object or system calculated as an aid to its classification or solution

Discriminant

**5.** In the case of a quadratic equation ax2 + bx + c = 0, the** Discriminant** is b2 − 4 ac; for a cubic equation x3 + ax2 + bx + c = 0, the

Discriminant

**6.** : a mathematical expression providing a criterion for the behavior of another more complicated expression, relation, or set of relations Examples of** Discriminant** in a Sentence Recent Examples on the Web If multiple antenna inputs are available, a very powerful

Discriminant, Direction

**7.** Definition Of** Discriminant** The

Definition, Discriminant

**8.** If ax 2 + bx + c = 0 is a quadratic equation, then the** Discriminant** of the equation, i.e

Discriminant

**9.** The** Discriminant** is a number that can be calculated from any quadratic equation

Discriminant

**10.** The** Discriminant** is a number that can be calculated from any quadratic equation

Discriminant

**11.** In algebra, the** Discriminant** of a polynomial is a polynomial function of its coefficients, which allows deducing some properties of the roots without computing them

Discriminant, Deducing

**12.** 1 You are probably aware of the well-known formula of the** Discriminant** for the quadratic polynomial, which is, and use this formula to compute the roots.

Discriminant

**13.** A *Discriminant* is a function of the coefficients of a polynomial equation that expresses the nature of the roots of the given quadratic equation

Discriminant

**14.** The equations can discriminate between the possible types of answer, such as: When the *Discriminant* value is positive, we get two real solutions

Discriminate, Discriminant

**15.** Maddrey *Discriminant* function is a formula created by Maddrey and colleagues in 1978

Discriminant

**16.** Maddrey's *Discriminant* function calculator …

Discriminant

**17.** Dĭ-skrĭm'ə-nənt The definition of a *Discriminant* is some distinguishing characteristic or feature that allows someone or something to be separated from others

Di, Definition, Discriminant, Distinguishing

**18.** Whether a plant is an annual or a perennial is an example of a *Discriminant*.

Discriminant

**19.** The *Discriminant* is \ ({b^2} - 4ac\), which comes from the quadratic formula and we can use this to find the nature of the roots

Discriminant

**20.** *Discriminant* of a quadratic equation The *Discriminant* of the quadratic equation following a x 2 + b x + c = 0 is equal to b 2 - 4 a c

Discriminant

**21.** The notation used for the *Discriminant* is Δ (delta), so we have Δ = b 2 - 4 a c

Discriminant, Delta

**22.** The calculator has a feature which allows the calculation of the *Discriminant* online of quadratic equations.

Discriminant

**23.** The Maddrey’s ** Discriminant** Function suggests which patients with alcoholic hepatitis may have a poor prognosis and benefit from steroid administration

Discriminant

**24.** ** Discriminant** definition, a relatively simple expression that determines some of the properties, as the nature of the roots, of a given equation or function

Discriminant, Definition, Determines

**25.** The ** Discriminant** can be either positive or negative or zero

Discriminant

**26.** Find the ** Discriminant** of \(2x^2+3x+3=0\) Solution

Discriminant

**27.** Compare the given expression with \(ax^2+bx+c=0\), \[a=2\\b=3\\c=3\] The ** Discriminant** of the given equation is:

Discriminant

**28.** Determine the value of the ** Discriminant** and name the nature of the roots for the following: x 2 + 7x + 13 Remember: b 2 - 4ac

Determine, Discriminant

**29.** Synonyms (Other Words) for ** Discriminant** & Antonyms (Opposite Meaning) for

Discriminant

**30.** When we consider the ** Discriminant**, or the expression under the radical, [latex]{b}^{2}-4ac[/latex], it tells us whether the solutions are real numbers or complex numbers, and how many solutions of each type to expect.

Discriminant

**31.** The ** Discriminant** of an equation gives an idea of the number of roots and the nature of roots of the equation

Discriminant

**32.** Formula : If ax 2 + bx + c = 0 is a quadratic equation, ** Discriminant** (D) = b2 – 4ac

Discriminant

**33.** The ** Discriminant** indicated normally by #Delta#, is a part of the quadratic formula used to solve second degree equations

Discriminant, Delta, Degree

**34.** Given a second degree equation in the general form: #ax^2+bx+c=0# the ** Discriminant** is: #Delta=b^2-4ac# The

Degree, Discriminant, Delta

**35.** ** Discriminant** synonyms,

Discriminant, Dictionary, Definition

**36.** The ** Discriminant** function coefficients denote the unique contribution of each variable to the

Discriminant, Denote

**37.** Summary To summarize, when interpreting multiple ** Discriminant** …

Discriminant

**38.** ** Discriminant** analysis is a technique for classifying a set of observations into pre-defined classes

Discriminant, Defined

**39.** ** Discriminant**[poly, var] computes the

Discriminant

**40.** ** Discriminant**[poly, var, Modulus -> p] computes the

Discriminant

**41.** In other words, a ** Discriminant** (that is, the expression b 2 – 4ac) with a value of zero means that you'll get one "repeated" solution value

Discriminant

**42.** The *Discriminant* is the term underneath the square root in the quadratic formula and tells us the number of solutions to a quadratic equation

Discriminant

**43.** If the *Discriminant* is positive, we know that we have 2 solutions

Discriminant

**44.** If it is negative, there are no solutions and if the *Discriminant* is equal to zero, we have one solution.

Discriminant

**45.** The Quadratic Equation, Formula, & ** Discriminant** : If ax² + bx + c = 0 then x =

Discriminant

**46.** The ** Discriminant** is the expression b 2 - 4ac, which is defined for any quadratic equation ax 2 + bx + c = 0

Discriminant, Defined

**47.** *Discriminant* analyses were used to examine which measures separated the groups best

Discriminant

**48.** Since the ** Discriminant** is symmetric in the roots of the polynomial, we can express it as elementary symmetric polynomials, i.e

Discriminant

**49.** Although there is a general method to derive the ** Discriminant** of any polynomial, this is an elementary and …

Derive, Discriminant

**50.** The ** Discriminant** is one of the most basic invariants of a number field, and occurs in several important analytic formulas such as the functional equation of the Dedekind zeta function of K, and the analytic class number formula for K

Discriminant, Dedekind

**51.** A theorem of Hermite states that there are only finitely many number fields of bounded ** Discriminant**, however determining this quantity is still an open problem

Discriminant, Determining

**52.** So you probably know that the *Discriminant* is the b^2 - 4ac part of the quadratic equation, or the part that's found under the square root symbol

Discriminant

**53.** Also remember that the numerator (or top part) of the quadratic equation is -b plus or minus the square root of the *Discriminant*.

Discriminant

**54.** ** Discriminant** function definition is - a function of a set of variables that is evaluated for samples of events or objects and used as an aid in discriminating between or classifying them.

Discriminant, Definition, Discriminating

**55.** What is the ** Discriminant**? The

Discriminant

**56.** The value of the ** Discriminant** can be used to determine the number and type of roots of a quadratic equation

Discriminant, Determine

**57.** How have we previously used the ** Discriminant**? We used the

Discriminant, Determine

**58.** ** Discriminant** Analysis

Discriminant, Da, Dimensional, Distinct

**59.** The ** Discriminant** of a quadratic is the expression inside the radical of the quadratic formula

Discriminant

**60.** Evaluate the result to find the ** Discriminant** .

Discriminant

**61.** Sklearn.** Discriminant**_analysis.Linear

Discriminant

**62.** ** Discriminant** analysis is a technique that is used by the researcher to analyze the research data when the criterion or the dependent variable is categorical and the predictor or the independent variable is interval in nature

Discriminant, Data, Dependent

**63.** The ** Discriminant** of a quadratic polynomial, denoted Δ, \Delta, Δ, is a function of the coefficients of the polynomial, which provides information about the properties of the roots of the polynomial

Discriminant, Denoted, Delta

**64.** By computing the ** Discriminant**, it is possible to distinguish whether the quadratic polynomial has two distinct real roots, one repeated real root

Discriminant, Distinguish, Distinct

**65.** The above function is called the ** Discriminant** function

Discriminant

**66.** In another word, the ** Discriminant** function tells us how likely data x is from each class

Discriminant, Data

**67.** The decision boundary separating any two classes, k and l, therefore, is the set of x where two ** Discriminant** functions have the same value

Decision, Discriminant

**68.** What is the ** Discriminant**? In a quadratic equation, the

Discriminant

**69.** The expression used to find the ** Discriminant** is the expression located under the radical in the quadratic formula! In this tutorial, get introduced to the

Discriminant

**DISCRIMINANT** [dəˈskrimənənt]

NOUN

**discriminant** (noun) · **discriminants** (plural noun)

Discriminant, in mathematics, a parameter of an object or system calculated as an aid to its classification or solution . In the case of a quadratic equation, ax^2 + bx + c = 0, the discriminant is b^2 - 4ac. Discriminants also are defined for elliptic curves and other mathematical entities.

Discriminant , in mathematics, a parameter of an object or system calculated as an aid to its classification or solution. In the case of a quadratic equation ax2 + bx + c = 0, the discriminant is b2 − 4 ac; for a cubic equation x3 + ax2 + bx + c = 0, the discriminant is a2b2 + 18 abc − 4 b3 − 4 a3c − 27 c2.

Discriminant analysis is a versatile statistical method often used by market researchers to **classify observations into two or more groups or categories**. In other words, discriminant analysis is used to **assign objects to one group among a number of known groups**.

More generally, the discriminant of a polynomial is a polynomial function of its coefficients, which **allows deducing some properties of the roots without computing them**.