Math is fun when you have to learn about a special type of equation that shows the relationship between various variables. Understanding Mathematics is like Understanding an Alien Language. Formulas are resources and not lessons. The purpose of learning math is to understand the logic behind a problem and how to solve it with a set of rules and steps. We somehow may not come across most of it in our day to day lives; however, we learn to round ourselves and understand the world. Formulas were prepared in order to put numbers and get an answer, rather than having to find it by other means.

An Equation talk about two things being equal. Example: x + 3 = 7
A Formula is a type of equation that displays the association between various variables.

Learning Math is for mere understanding, not for the purpose of a challenge. Educating everyone is because knowledge is good and not to make lives harder. When it comes to Math it requires you to learn new language rules writing equations in a logical and consistent method, new symbols and new words. Recognize that math is written in different ways, but with the same meaning. Learn the conditions for each formula, it might be something like “if x > 0″.

The important rules below will definitely help you in understanding Math Formulas better.
  • Note the formulas that are generally used to solve questions.
  • Never memorize the math formulas, but apply and practice them instead.
  • Make a list of formulas that can be referred to at any given time.
  • Work on practice problems, which will help learn common formulas that may apply in the examination.
  • Draw relevant diagrams or graph for each time you write the formula, it can be a parabola, or possibly a circle.
  • Some convened questions are solved through mere logic instead of using formulas to hence gauge whether the question requires a formula in the first place.

Rule: Order Of Operations: PEMDAS (Parentheses / Exponents / Multiply / Divide / Add / Subtract)

When creating a summary list of formulas, include conditions and appropriate pictures, graphs and diagrams.

1. C
ircle: Its circumference is = 3.14 $\times$ diameter, The area of a circle = 3.14 $\times$ (radius)$^2$
2. Area of triangle = $\frac{1}{2}$ $\times$ base $\times$ height

3. Rectangle: Its perimeter = 2(length + width), Its area = length $\times$ width

4. Volume of a cuboid = length $\times$ width $\times$ height
5. Average = $\frac{total}{number \ of \ parts \ of \ the \ total}$

6. Cube: Volume = (length of side)$^3$

7. Pythagoras theorem: where a and b are sides that consist the right angle and c is the hypotenuse of a right-triangle.
8.Quadratic equation when ax$^2$+bx+c =0 then x=$\frac{-b \pm \sqrt{b^{2}-4ac}}{2a}$
(a+b)$^2$= a$^2$+2ab+b$^2$

Repetition is the basis of math. The concept has to be not only memorizing, but put to work in order to remember it! Arithmetic, algebra, geometry, differential equations, calculus, probability, complex analysis, fractions, ratios, proportions, percentages, graphs, exponents, and statistics Math is definitely vast fortunately, you'll get to learn many tricks for solving and substituting problems. Write out the symbol in words, for example: $\sum$ is “sum”; $\int$ is the “integration” symbol and $\Phi$ is “capital phi” Math teaches you many practical ways to calculate considering a career with a high involvement of math. As much as possible solve the problems by hand so that you recognize the step-by-step process.