Cubic Polynomial - Definition, Formula | cubic polynomial
Cubicpolynomialisatypeofpolynomialbasedonthedegreei.e.thehighestexponentofthevariable.Hence,acubicpolynomialisapolynomialwiththehighestpowerofthevariableordegreeis3.Apolynomialisanalgebraicexpressionwithvariablesandconstantswithexponentsaswholenumbers.Letuslearnmoreaboutcubicpolynomials,thedefinition,theformulas,andsolveafewexamples. DefinitionofCubicPolynomial Acubicpolynomial[1]isapolynomialwiththehighestexponentofavariablei.e.degreeofavariableas3.Basedonthedegree,apolynomialisdivi...
Cubic polynomial is a type of polynomial based on the degree i.e. the highest exponent of the variable. Hence, a cubic polynomial is a polynomial with the highest power of the variable or degree is 3. A polynomial is an algebraic expression with variables and constants with exponents as whole numbers. Let us learn more about cubic polynomials, the definition, the formulas, and solve a few examples.
Definition of Cubic Polynomial
A cubic polynomial[1] is a polynomial with the highest exponent of a variable i.e. degree of a variable as 3. Based on the degree, a polynomial is divided into 4 types namely, zero polynomial, linear polynomial, quadratic polynomial, and cubic polynomial. The general form of a cubic polynomial is p(x): ax3 + bx2 + cx + d, a ≠ 0, where a, b, and c are coefficients and d is the constant with all of them being real numbers. An equation involving a cubic polynomial is called a cubic equation. Some of the examples of a cubic polynom...