Solving one of the oldest algebra problems isn't a bad claim to fame, and it's a claim Norman Wildberger can now make: The mathematician has solved what are known as higher-degree polynomial equations ...

University of New South Wales Honorary Professor Norman Wildberger has unveiled a potentially game-changing mathematical ...

Abstract: It should not be surprising that in solving cubic equations, sooner or later you are going to have to take the cube root of something. But it's not immediately obvious what cubic equations ...

In the 19th century, Russian mathematician Pafnuty Chebyshev introduced a version that used cubic equations (with an exponent of 3) to approximate functions, but it didn’t work for functions ...

Given any cubic or quartic equation with real coefficients, it can be transformed by a change of variable into a standard form, and thus solved by means of a double-sided scale (Fig. 1 ...

For higher-degree polynomials, other methods, such as the rational root theorem, synthetic division, or numerical approximation techniques, are typically employed. However, some cubic equations can be ...

Can catadioptric systems overcome lens-based camera limitations? The study highlights their advantages in panoramic imaging and other advanced applications. The Academic’s mission is simple: Explain ...

A cubic equation is an algebraic expression that involves the variable of the highest degree as a cube. It has the general form ax^3 + bx^2 + cx + d = 0, where a, b, c, and d are constants and x ...