MAT136H1 Lecture Notes - Antiderivative, Radian

Based on the fundamental theorem of calculus part 2, evaluating the definite integral becomes much ( ) ( ) where ( ) is the anti-derivative of ( ). easier: ( ) Substituting the beginning and the end points of the interval into the anti-derivative function ( ) evaluates the definite integral. When trigonometric functions are involved, usually the interval is given as special angles in radian measure so that the computation becomes easier. The fundamental theorem of calculus part 2 states: ( ) ( ) ( ) where ( ) ( ) Anti-derivative of ( ), which is denoted by ( ) is then ( ) ( ), so that ( ) ( ) ( )