Using Integration to find the area between the curve and
Download
Report
Transcript Using Integration to find the area between the curve and
Using Integration to find the
area between the curve and
the x axis between 2 points.
Start off with an equation
e.g.
4x 6x 6x 5
3
2
And where you want to
find the area between e.g.
1 and 5
To integrate, add 1 to the power,
then divide the co-efficient by
the new power.
So you need to follow these
simple steps:
Put the integration symbol in
front of the equation, along with
the two numbers you’re
integrating between (the largest
number on the top) and add
“dx” onto the end
5
4
x
6
x
6
x
5
dx
3
1
2
Now using square brackets, do what
I previously said about adding 1 to
the power and dividing the front
number by the new power, so you
get this.
5
4x
6x
6x
5x
2
2
4
1
4
3
2
That simplifies to
x
4
5
2 x 3x 5 x 1
3
2
which is easier to deal with
The next step is to put 5 as the x
value, and 1 as the x value, then
subtract the answer from 1 being
the x value from the answer you
get when 5 is the x value.
This is what you get when 5 and
1 are subbed in:
5 2 5 3 5 5 5
1 2 1 3 1 5 1
4
4
3
3
2
2
Simplify it down:
625 250 75 25
1 2 3 5
Now you just need to do the
calculation, and you will have the
area, which is always in units2
unless stated otherwise.
975 11
964units
2
You can check your answer
using derive for windows in the
maths department
Click
this
button
to open
this
Enter the equation and the two limits
Now click simplify
and the answer will
come up on the
screen