If we bring all the terms over to the RHS (right hand side) and the LHS (left hand side) is equal to 0 we get: 3x² - 4x + 1 = 0 

which is the form we should always use to express quadratic equations to be able to solve them. 

In many cases once the equation has this form it can be simplified which is very useful. For example:

Exercise 1.- Express the following equation in the simplest form possible:

3x² - 3x/2 = x/2 - x + 2 + x²

First, we have to find a common denominator to get rid of any existing denominators in the equation. We then get:

6x² - 3x = x - 2x + 4 + 2x²

 If we bring all the terms over to the  RHS we get: 4x² - 2x - 4 = 0

Later we are going to see how to solve quadratic equations numerically but first we are going to see how to do so graphically:

Once the RHS of the equation has been simplified, it becomes a quadratic function which, in the first example gives us:

f(x) = 3x²- 4x + 1
or
y = 3x²- 4x + 1.

As you can see, the graph takes the form of a curve which is called a "parabola". 

In this example the parabola crosses the x-axis at two points. These values for x are the solutions for the equation as y=0 (i.e.) 3x² - 4x + 1 = 0 which is what we were looking for.

Therefore:The solution of a quadratic equation are the two values given for "x" where the graph of the quadratic function (parabola) cuts the x-axis. 

You should have found the solutions: x = 1 and  x = 0.33 (which is actually x = 1/3).

As we saw earlier in the explanation, any quadratic equation can be expressed with the following form:

ax² +bx + c = 0

where  a, b and c are any positive or negative whole numbers. We just need to find a common denominator (if there are any denominators in the original equation) to get rid of existing denominators and then bring all the terms over to the RHS.

Once the equation has this form, we know that the two "possible" solutions for the equation are: 

So for the first equation we used as an example: 3x² - 4x + 1 = 0 would give the solutions:

a) x²/2 = x/2 + 3

In example a) of the exercise you should find that: "a = 1" , "b = -1" and "c = -6" which give the following solutions to the  equations: 

x = -2 ; x = 3.

In example b) the solutions should be x = 2 and x = -2 (careful as b = 0 here!) You can probably solve this equation without using the formula (we could call it an incomplete quadratic equation).

If we realize that 3x² = 12 is the same as x² = 4 then x = the square root of 4, (i.e.) 2 or -2.

Problem 1.

Work out the hypotenuse of a right-angle triangle given the fact that the length of the sides are three consecutive numbers.

Solution: 

We can draw the following diagram to help. The hypotenuse is the longest side and the shortest side is "x".

If we apply Pythagoras' theorem we get: (x+2)² = (x+ 1)² + x².

We expand the brackets to get: x² + 4x + 4 = x ² + 2x + 1+ x².

If we take all the terms over to the LHS and simplify the equation we get: x² - 2x - 3 = 0.

You already know how to solve this equation numerically and graphically to get the following solutions: x = 3 and x = -1. Use the following window to solve the equation.

The solution x = -1 is obviously impossible because a side cannot have a negative measurement. Therefore, we get:

Hypotenuse: x + 2 = 5 ; longest other side: x + 1 = 4 ; shortest other side: x = 3.

(Suggestion: make a sketch of the problem).