1 of 18
Definition
How to find the area of the under the curve:
(1) determining the width of the interval for each rectangle
(2) Use left endpoint and plug it into equation / find the point on the
graph to get height of each rectangle
(3) Find area by adding the area of each individual rectangle (width x
height)
concave up = under approx. , concave down = over approx.
Give this one a try later!
Midpoint Rectangular How to find MRAM, LRAM, and
Approximation Method (MRAM) RRAM on the calculator
Left Rectanglular
Right Rectangular Approximation
Approximation Method
Method (RRAM)
(LRAM)
, Don't know?
2 of 18
Term
Simple Definition of Integral
Give this one a try later!
Table Area under the curve
Simple/single split Distance from mean
Don't know?
3 of 18
Definition
Let f be a continous function on [a,b]
if there exists a number I such that (equation) then f is integrable on
[a,b] and I is the definite integral of f
all continous functions are integrable
Give this one a try later!
Definition of the definite
Property of Continuous Functions
integral
Definition
How to find the area of the under the curve:
(1) determining the width of the interval for each rectangle
(2) Use left endpoint and plug it into equation / find the point on the
graph to get height of each rectangle
(3) Find area by adding the area of each individual rectangle (width x
height)
concave up = under approx. , concave down = over approx.
Give this one a try later!
Midpoint Rectangular How to find MRAM, LRAM, and
Approximation Method (MRAM) RRAM on the calculator
Left Rectanglular
Right Rectangular Approximation
Approximation Method
Method (RRAM)
(LRAM)
, Don't know?
2 of 18
Term
Simple Definition of Integral
Give this one a try later!
Table Area under the curve
Simple/single split Distance from mean
Don't know?
3 of 18
Definition
Let f be a continous function on [a,b]
if there exists a number I such that (equation) then f is integrable on
[a,b] and I is the definite integral of f
all continous functions are integrable
Give this one a try later!
Definition of the definite
Property of Continuous Functions
integral