Integral Maths - Definite Integrals

What is a definite integral?

So far we have just considered integration as the reverse of differentiation.

However, integration does have uses other than just reversing differentiation.

The integral of a function between two points represents the area enclosed by the x axis, the curve described by the function and the two chosen points.

For example, consider the function drawn below.

Integrating f(x) between a and b will give us the value of the shaded area.

Negative answers

Sometimes when calculating a definite integral, you may end up with an answer that is a negative number. 

A negative area represents an area below the x axis, as illustrated in the diagram shown below.

If a question specifically asks you to calculate the area, make sure to find the absolute value of the area rather than the sum total of the positive and negative areas.

Example 3

Example:

Find the area enclosed by the function $f(x) = 4x^3$ between $x=-2 \text{ and } x=2$\\

Answer:

If we integrate this as usual, we will get answer that doesn't make sense. $$\int ^2_{-2} 4x^3dx=\Big[x^4 \Big]^2_{-2}=2^4-(-2)^4=0$$ Clearly , as you can see in the graph below, the area enclosed by the function isn't zero. The integration has given us an answer of zero because it counts area below the x-axis as negative area. To find the absolute value of the area, we must calculate the area enclosed by the function from $x=-2 \text{ to } x=0$ and $x=0 \text{ to } x=-2$ separately. 

$$\int ^2_{0} 4x^3dx=\Big[x^4 \Big]^2_{0}=2^4-(0)^4=16$$

$$\int ^0_{-2} 4x^3dx=\Big[x^4 \Big]^0_{-2}=0-(-2)^4=-16$$

Now, to find the area, we sum the absolute value of these two integrands. $$Area = 16+\lvert -16\rvert =32$$