A cubic equation is always in one variable is an equation of the form or a Third- degree, and the equation is this one.

ax3 + bx2 + cx + d= 0 (Where a is nonzero)

A cubic equation is always in one variable is an equation of the form or a Third- degree, and the equation is this one.

ax3 + bx2 + cx + d= 0 (Where a is nonzero)

The solutions of this equation are called roots of the cubic function defined by the left-hand side of the equation. If all of the coefficients a, b, c, and d of the cubic equation are real numbers, then it's a minimum of one real root (this is true for all odd-degree polynomial functions). All of the roots of the cubic equation are often found by the subsequent means:

Algebraically, that is, they will be expressed by a cubic formula involving the four coefficients, the four basic arithmetic operations, and nth roots (radicals). (This is additionally true of quadratic (second-degree) and quartic (fourth-degree) equations, but not of higher-degree equations, it is based on the Abel–Ruffing theorem.)

Trigonometrically numerical approximations of the roots are often found using root-finding algorithms like Newton's method.

The traditional way of solving a cubic equation is to scale back it to a quadratic then solve it either by factoring or the quadratic formula.

Like a quadratic has two real roots, a cubic equation may have possibly three real roots. But unlike quadratic which can have any real solution, a cubic equation has a minimum of one real root.

The other two roots could be real or imaginary.

Whenever you're given a cubic equation or any equation, you usually need to arrange it during a standard form first.

For example, if you're given something like this, 3x2 + x – 3 = 2/x, you'll re-arrange into the quality form and write it like, 3x3 + x2 – 3x – 2 = 0. Then you'll solve this by any suitable method.

Examples of a cubic equation that will help you understand it well so that you will be able to do it manually. Suppose if you don’t have our tool or any tool that will help you solve your problem. So, in that case, this will help you a lot.

Now Determine the roots of the cubic equation here like this, 2x3 + 3x2 – 11x – 6 = 0

Now here is the solution to read it carefully so that you will understand it properly.

So if d = 6, then the possible factors are 1, 2, 3, and 6.

Now apply the Factor Theorem so that you will be able to see the possible values by trial and error.

f (1) = 2 + 3 – 11 – 6 ≠ 0

f (–1) = –2 + 3 + 11 – 6 ≠ 0

f (2) = 16 + 12 – 22 – 6 = 0

Hence, x = 2 is that the first root.

Now here we are going to target we can get the opposite roots of the equation using synthetic division method.

= (x – 2) (ax2 + bx + c)

= (x – 2) (2x2 + bx + 3)

= (x – 2) (2x2 + 7x + 3)

= (x – 2) (2x + 1) (x +3)

Therefore, the solutions are x = 2, x = -1/2 and x = -3.

Cubic Equation tool by taskvio is really great and very useful full that will help you solve your problems. Even though this tool is totally free web-based tool and you can use it from anywhere, even on your phone. You don’t have to carry any calculator with you and even you don’t have to worry about the formula.

If you know mathematics or not, you will be able to use this tool all around the world so you don’t need to worry about anything.

Now see how to use our tool;

So as you can see on your screen we have provided all the boxes related to it such as what is the value of a, b, c, d.

You have to enter the specified value in each of the boxes.

After you will enter the value you just have to click on the solve button and then you will get the answer.

So this is what you have to do.

A.