13. Integration Flashcards
Indefinite Integration
The reverse of differentiation
- Add one to each power
- Divide the coefficient by the new power
- When you have done that for each put a +c
Integration notation
∫ equation d variable
e.g. ∫ 10x dx
How to find c when given a point the curve passes through
Substitute x and y to see what c must be to make both sides equal
Definite Integration Uses
Finding the area under a graph
Definite integration
Notation the same as indefinite but with the upper limit at the top right of the ∫ and lower at the bottom right
Integrate as normal without a c and rite in square brackets and put the limits at the right of that
Substitute each limit and find the difference between
Area between a curve, the x-axis, x = a and x = b
Integrate the equation of the curve definitely between x = a and x = b
If you want the area above the x-axis but it is in two regions
It doesn’t matter, integrate between max and min roots still
How to find an area under the x-axis
Find the area normally by integrating and then take the positive value
When some is over and some is under the x-axis
Integrate separately between each neighbouring roots and sum the positive values of each
Area above a line but below a curve
Integrate the curve up to the point of intersection and subtract the area under the line (don’t need to integrate for that)
Shortcut for areas between lines and curves
Subtract the lower function from the higher one and take the integral of that
If one part of a definite integral is negative
Keep it as negative and do the subtraction
